THE SOVIET JOURNAL OF ATOMIC ENERGY NO. 4

Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 AT0NHa5I p.rHM. Number 4, 1956 The Soviet Journal of ATOMIC ENERGY IN ENGLISH TRANSLATION CONSULTANTS BUREAU, INC. Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 ATOMNAYA ENERGIYA Academy of Sciences of the USSR Number 4, 1956 A. 1. Alikhanov, A. A. Bochvar, V. S. Fursov, V. F. Kalinin, G. V..Kurdyumov, A. V. Lebedinsky, 1. 1. Novikov (Editor in Chief), V. V. Semenov (Executive Secretary), V. 1. Veksler, A. P. Vinogradov, N . A . V l a s o v (Acting Editor in Chief) The Soviet Journal of ATOMIC ENERGY IN ENGLISH TRANSLATION CONSULTANTS BUREAU, INC. 227 West 17th Street New York 11, N. Y. Printed in the United States Annual Subscription $ 75.00 Single Issue 20.00 Note: The sale of photostatic copies of any portion of this copyright translation is expressly prohibited by the copyright owners. A complete copy of any article in the issue may be purchased from the publisher for $12.50. Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 THE SIX-METER SYNCHROCYCLOTRON OF THE INSTITUTE OF NUCLEAR PROBLEMS, ACADEMY OF SCIENCES USSR* D. V. Efremov, M. G. Meshcheryakov, A. L. Mints, V. P. Dzhelepov, P. P. Ivanov, V. S. Katyshev, * * E. G. Komar, I. F. Malyshev, N. A. Monoszon, 1. Kh. Nevyazhsky, B. I. Polyakov, A. V. Chestnoi The chief characteristics of the six-meter synchrocyclotron of the Institute of Nuclear Problems of'the Academy of Sciences, USSR, which provides proton acceleration to an energy of 680 Mev, are described. INTRODUCTION. The construction of powerful high-energy accelerators for heavy.particles became feasible with the announcement by V. 1. Veksler (1944) and. McMillan (1945) of the phase stability principle in connection with particle motion in cyclic resonance accelerators. In order to further research in the physics of high-energy particles and gain experience in synchrocyclotron acceleration techniques a large five-meter synchrocyclotron was built at the Institute for Nuclear' Problems of the Academy of Sciences, USSR using this machine it was possible to accelerate deuterons to an energy of 280 Mev and cc-particles to an energy of 560 Mev. In 1950, protons with an energy of 500 Mev were obtained with. this machine [1-3]. The construction of the accelerator was preceded by studies on a working; model which clarified a number of questions connected with the start-up and operation [4]. Studies of the operation of this machine and experience acquired in carrying out research with it made it possible in 1953 to modify the accelerator so that it became feasible to accelerate protons to an energy of 680 Mev. The average current in the outermost orbit in this operation was 0.3 pamp. A general view of the six-meter synchrocyclotron is shown in Fig. 1. In rebuilding the machine a new vacuum system was installed, the diameter of the pole-pieces of the electromagnet was increased to six meters and a new radio-frequency resonance system was'developed. The six-meter synchrocyclotron provides intense beams of positive and negative it -mesons with energies up to 400 Mev and neutrons with energies up to 600 Mev. By making certain minor changes in some of the compo:= nents of the radio-frequency system in this machine it is also possible to obtain deuterons with energies of 420 Mev and a-particles with energies up to 840 Mev [5], [6]. The Electromagnet It is well known that the stable motion of ions in the gap of an electromagnet is limited to the region .in which the index denoting the decay of the magnetic field intensity in the radial direction . dlnH n _ ding 0. 2, *Reported at the All-Union Conference.on the Physics of Hi gh-Energy Particles, May 14, 1956. *Deceased. Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 so that for ii = 0.2 there Is observcd a parametric resonance between the free vertical and radial' oscillations of the ions being accelerated. General view of the accelerator. In actual accelerators, because of the lirnitatioh of the vertical dimension of the aperture of the .dee, the region in which parametric.resonance niay.arise determines the. maximum radius of the region of magnetic field in which the acceleration of jOns is feasible. This was kept in mind in designing so as to obtain the largest possible stable orbits for the accelerated ions. In the five - meter magnet the pole tips were ' fabricated from. soft iron. in the form of solid discs. The pole tips now in use, which are six meters in diameter, are welded together from several pieces. The pole tips simultaneously serve as the upper and lower walls of the vacuum chamber located in the gap between the poles of the iiiagnet. The gap. space between the pole tips at the center of the chamber is 600 mm. The magnetic field intensity at the center of the' vacuum chamber is 16,600 ,Nauss. The length of the electromagnet is 18 m, height about 10 m ,and weight'7.,000 tons. The yoke was made from ordinary carbon steel. The exciting winding of the electrorria;~net consisted of .air cooled copper straps. The, direct-current generator required 'to obtain the nominal field intensity had a power rating of 1000 kw. The current in the ex- citing winding was stabilized to within. ? 0.1 ?fo. A great deal of laborious computational and experimental work was devoted to the magnetic field correc- tions in the acceleration region. In addition to the use of shims 'at the periphery of the pole pieces a great deal of effort was made to insure the coincidence of. the surface at which the radial component of the -magnetic field was zero with the median plane of the acceleration chamber. In carrying out the work on the correction of the magnetic field configuration it was found necessary to develop apparatus suitable for accurate magnetic measurements; an instrument for measuring the decay of the magnetic field in the radial direction [1]; an instrument for determining the azimuthal asymmetry of the-mag- netic field [7], and 'apparatus for determinf; the location of the surface at which the radial component of the magnetic field vanishes. kL-- - Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 As a result of these studies and the corrections of the magnetic field of the six-meter synchrocyclotron the radius of the region in which stable motion, of the accelerated ions could] be guaranteed reached a value of 279 cm. The machine also had a number of auxiliary non-symmetrical exciting windings fed fron a separate gen- erator thus making it possible, while the machine was in operation, to vary the location of the plane containing the trajectory of the accelerated particles; this feature was used in determining the optimum operating conditions The decay of the magnetic field intensity in the radial direction from the center out to the limiting radius needed for focusing the particles in the vertical plane was 4.9%. The displacement of the center of the outer- most orbit did not exceed 2 cm. Careful adjustment of the magnetic field of the accelerator made it possible to accelerate protons to an energy of 680 Mev [8]. To enhance ion focusing in the. initial acceleration stage -steel. cones were placed at the center of the pole tips. Means were also provided for relatively fast changes of the polarity of the electromagnet (15 min) thus making it easy to get an output of tr+ or n mesons of various energies through the collimators in the apertures in magnet supports. Resonance: system :and Radio-Frequency Generator [9) The design of the rf system for this machine was dictated by the necessity of obtaining an accelerating . voltage of some 15 kv and a frequency change from 26.5 to 13.6 me for proton acceleration. In this connection. it is necessary that the metal rotor of the variable condenser, 'which determines the frequency, be located in a region of weak magnetic field in order to avoid high eddy currents. On the other hand the removal of the rotor to a location at which the leakage field of the magnet is weak is undesirable because it is impossible to keep the system compact. Therefore extensive precautions were taken to see that the variable condenser, which was located at a point at which the field intensity-is 600-800 gauss, is well shielded magnetically. Inside the shield the field intensity is no greater than 30 gauss. It turned out, however, that under these conditions the distance from the center of the pole pieces to the variable condenser is approximately equal to a half-wavelength at the high-frequency end of the operating region. Thus to tune up the system in this region it was necessary to raise the upper resonance frequency both by changing the wave impedance and by constructional changes which resulted in a slight increase of the current paths in the system. The expansion of the operating range on the low frequency side was accomplished by increasing the. wave impedance of the system in the immediate neighbor- hood of the variable condenser. This part of the system can be considered a "lumped" inductance. The radio-frequency resonance system consists of the dee with. its grounded frame, ,the variable condenser and the line which connects them. Close to the variable condenser the latter assumes the form of a coaxial line; it is connected to the dee through a smooth transition section (Fig. 2). The rotor of the variable condenser, which consists of '6 discs with 10 fins in each is braced against the inner conductor of the coaxial line by insulators and is electrically connected to it by a semicylindrical (6 pairs of cylinders) condenser with a capacity of 20,00.0 ?f. The.shaft and rotor are held firmly by metal bearing- supports which are located radially at the center of gravity of the system. To keep the reactance of the supports high over a wide range of frequencies they are made in the form of cylindrical spirals, i. C. chokes; these are fabricated from special hollow steel tubing which is water cooled and copper-plated to reduce the radio-frequency resistance. The inductance of these bearing supports is in parallel with the line and increases the upper frequency of the operating range to some extent. The present design provides a wide, range of operating frequencies with relatively small values of current and voltage in the variable condenser. It has been feasible to use an accelerating voltage amplitude of more than 15 kv and an accelerating-cycle repetition rate of about 100 cps. The semicylindrical condenser effectively shunts the ball bearings of the rotor and its contact brush which is a slotted bronze collar which rides on the steel shaft of the rotor. Although the peak current through the con- denser reaches 3,000 amp the current through the bearing and contact brush does not exceed 100 amp. 'The *The control of the location of the plane also made it possible to reduce smoothly by a factor of several thousand the intensity of the external proton beam; this was necessary in order to carry out several physics experiments. Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 apparatus has been operated without any trouble, for more than 10,000 hours without replacerrient of bearings. Fig. 2.' The dee removed` froth the .vacuum chamber. The rotor design permits the capacity of the resonance system of'th.e radio-frequency generator to be varied and gives optimum values of.the system impedance over a wide range of frequencies. Parasitic oscillations were virtually suppressed by using a "band-pass" oscillator system in which positive feedback occurs only in a specified frequency region; this system allows wide; independent control of the ab- solute magnitude of the positive feedback in the extreme high and low frequency regions. The system makes use of a series of LC circuits , between the plate and the cathode input and. between the input grids and cathode of two ultrahigh, frequency oscillator triodes (GU-12A) which are of the grounded type and also employs out- put inductances, interelectrode condensers, and cathode chokes. The operation of the resonance system and the radio-frequency'generator have been described in a sepa- rate report-[61, The radio; frequency systeili can be cut off during the non-operating dart of the cycle by a thyratron unit which controls the,grid of the oscillator [9]. The system can be,operated so that. the acceleration cycle is con- trolled.by a frequency which is several times-smaller than the modulation frequency; it is also possible to obtain single acceleration pulses, thus allowing the system to trigger'a Wilson cloud chamber or some other detection device. All modes of operation arc controlled by a special timer unit [10] which maintains strict time sequence between the pulses which trigger the ion source, the thyratron control system and the.other components. Use of the timer also makes it possible to synchronize the operation of the accelerator' with that of other instruments and devices being used in the various nuclear research projects. All the counting.sequences are controlled by the frequency-change cycle of the radio-frequency oscillator which drives the resonance system. The switching of the radio-frequency voltage during each cycle is accomplished by means of a photoelectric system in which a light beam incident on a photoelectron multiplier is interrupted by the fins, on the rotor of the variable con- denser. L Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 453 Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 Vacuum System The operating stability of the accelerator as well as the intensity of the accelerated ion beam at the out- put are determined to a large degree by the vacuum conditions in the volume of the chamber and frequency vary- ing, device. The accelerator vacuum chamber has the form of 'a rectangular parallelepiped 675 x 675 x 100 cm3. This chamber is built from brass plates 100 mm in thickness. The steel top and bottom of the chamber also serve as the pole tips. The vacuum seal between the brass plates of the chamber and the pole pieces, as in the other vacuum apparatus, is achieved by means of rubber gaskets. Following appropriate conditioning of the chamber the minimum pressure of the residual gas is 2.10-6 mm Hg. With the introduction into the ion source of the working gas the pressure does not exceed 6-7. 1.0-6 mm Hg. The volumes of the chamber, the resonance line and '.the variable condenser are contiguous. The total volume in which a high vacuum is maintained is about 35 m3,. The vacuum chamber is evacuated by two oil-jet pumps with a total capacity of 80, 000 liters per second at a pressure of 1. 10-5 min Hg. The housing of the variable condenser is evacuated by an auxilary pump with a capacity of 10,000 liters/sec at a pressure of 1. 10-5 mm Hg. The baffles of the high vacuum pumps are cooled to a temperature of -20? C to freeze out the oil'vapors. The quality of the vacuum gaskets is such that under normal conditions the increase in the chamber pressure which arises due to the leakage of air from the outside and outgassing from the inner surfaces amounts to 0.2-0.3 mk/hour.* . If a preliminary vacuum of the order of 10-3 mm Hg is maintained in. the chamber then the opera- ting vacuum for the conditioned accelerator can be reached in 25-30 min after opening the vacuum valves on the oil-jet pumps. The vacuum chamber of the accelerator is provided with various devices which are used to introduce targets into the chamber and to locate them at a given radius. This operation is carried out remotely without disturbing the operating vacuum in the chamber. Ion Source and Particle Extraction The ion source in the six-meter synchrocyclotron is the usual arc type with a thermal tungsten cathode. A cold cathode was also used quite successfully. In this case a considerably greater stability in the magnitude of the ion current is achieved at normal intensities. In the cold cathode source the discharge is excited by the radio-frequency field in the dee by secondary electron emission from an aluminum or beryllium cathode. Extraction of the proton beam from the vacuum chamber into the external region is accomplished by excitation of radial oscillations of the accelerated particles in, the outermost orbit and the ejections of protons through a magnetic channel [11j. The ion current in the external beam is 5-7ufo of the current in the circulating beam. A large of number of beams of neutrons and charged ir-mesons of both sign is also extracted. The extrac- tion of each beam is accomplished by means of special devices located in the accelerator. A separate report [12] is devoted to information on the extraction of particle beams from the vacuum chamber. Arrangement of the Accelerator Facilities. All the accelerator facilities are located in two buildings. The first building contains the equipment which cannot be_ separated from the accelerator by any appreciable distance if efficient operation is to be achieved.. In this building there is a laboratory with experimental and monitoring apparatus which is used in research on the external particle beams. ' In order to provide the most favorable conditions for carrying out research with the accelerator the control room of the accelerator is isolated from the main laboratory by two concrete shielding walls with thicknesses of 4 and 2 to and a ceiling 1.5 m thick. The passage of the particle beams through the 4-meter wall which separates the accelerator -room from the measurement enclosure is allowed by a porthole with collimators (Pig. 3). The electric power facilities and the water cooling installation for the' resonance system and the radio- frequency generator, and the control console for all circuits and components of the accelerator are located in the second building. Probably equals 10-6 mm Hg/hour.-Translators note]. Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 Synchrocyclotron room Th rotr,,n Radio-frequency gen- Local control panel Vacuum -1 pump Collimator N IGS vacuum chamber Electromagnet Concrete Fig. 3. Plan of the six -meter- synchrocyclotrori building. Control of the' Synchrocyclotron Because of the radiation which accompanies the operation of the machine the presence of personnel in the main room in the immediate vicinity of.the accelerator is not possible. The monitoring functions involved in the operation of the machine and the control of the. facilities are carried out remotely by the attending en- gineer and technician who remain in a room containing the control console in the second building (Fig. 4). For this purpose there are provided a number of instruments and devices which permit automatic remote control of the facilites. The synchrocyclotron and its facilities have operated without trouble for many thousands of hours without requiring any significant shutdown. for repairs or modification. Main Trends of Nuclear Research In the research which is being carried on at the synchrocyclotron of the Institute of Nuclear Problems of the Academy of Sciences USSR most attention as being devoted to the nucleon energy region 380-660 Mev and Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 to the following three types of nuclear processes: the elastic scattering of protons by protons, neutrons by protons, and neutrons by neutrons; the production of charged'and neutral ir-mesons in nucleon-nucleon collisions, and the interaction of if-mesons with nucleons. Cxperimental investigations are also being devoted to a study of the inter- action of nucleons and ir-mesons with nuclei. A.dis.i~ussion of these investigations isbeyond the scope of the pres- ent report and is to be found ;1.n appropriate- papers. Fig. 4. Main control console.. At the synchrocyclotron of the Institute of Nuclear Problems, which at the present time is the largest machine of ifs type in the world, research in the energy region up to 700 Mev is being carried on by many. physics and chemistry institutes of the Academy of Sciences USSR. The accelerator is operated regularly from 100-105 hours per week. It is possible to carry out research on 13 external beams of protons, neutrons, and 7r-mesons of high energy. The construction of this accelerator is the result, of the combined efforts over a number of years of a large group of scientists, engineers, and technicians. Many plants participated in- the construction of these facilities; particularly. manufacturers of electrical equipment. The design and development of,the various components of the six-meter synchrocyclotron involved 'a good deal of research in,the realms of physics, radio-engineering, electronics, power engineering and vacuum tech- niques. As a.result of this research it has been possible to avoid,a great deal of the difficulties involved in the start-up operation, although certain of these remained and were overcome in the initial operating stages. It is apparent that the synchrocyclotron acceleration, technique is extremely convenient in this region of particle energy. The experience acquired in operating actual synchrocyclotrons and calculations which have been made indicate that the upper limit on the energy for this- method of accelerating protons is approximately 1,000 Mev. Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 ? [1] M. G. Meshcheryakov, A. V. Chestnoi, V. P. Dzhelepov, V. S. Katyshev, A. A. Kropin, V. P. Dmitrievsky, et al. (Report Inst. Nuc. Prob., Acad. Sci. USSR) (1951). (2] L. M. Gurevich, N. K. Kamins]cy, I. G. Klyatskin, I. Kh. Nevyazhsky, B. I. Polyakov, N. K. Titov, and V. F. Trubetskoi (Rep. RAL . Acad. Sci. USSR) (1947-1950). [3] D. V. Efremov, E. G. Komar, and N. A. Monoszon (Report NIIEFA) (1950). [4] M. G. Meshcheryakov, G. I. Budker, V. P. Dmitrievsky, V. S., Katyshev, A. A. Kropin, and A. V. Chestnoi, et al. (Report Inst. Nuc. Prob.,Acad. Sci. USSR) (1947-1949). [5] M. G. Meshcheryakov., A. V. Chestnoi, V.. P. Dzhelepov, V. S. Katyshev, M. F. Shulga, and V. T. Dmitrievsky (Report Inst. Nuc. Prob., Acad. Sci. USSR) (7.954). [6] A. L. Mints, I. Kh. Nevyazhsky, and B. I. Polyakov, Certain Characteristics and Information Con- cerning the Radio Frequency System of the Six-Meter Synchrocyclotron (Report to the All-Union Conference on the Physics of High Energy Particles) (Moscow, 1956). [7] M.'P. Zeldovich, and S. M.'Rubchinsky (Report RAL Acad. Sci, USSR) (1949). [8] A. V. Chestnoi, V. S. Katyshev, V: P. Dmitrievsky, A A_.Kropin, B. I Zamolodchikov, T. N. Tomilina, and V. B. Mukhina (Report Inst. Nuc: Prob., Acad. Sci. USSR) (1953j,; [9] A. D. Vlasov, G. P. Grudinskaya; G. I. Zhileiko, B. T. Zarubin; B. G. Kulman, V._M Lupulov, I. Kh. Nevyazhsky, and B. I. Polyakov (Report RALAcad. Sci. USSR) (1948-1955). [10] M. M. Veisbein, G. I.. Kiryanov, and A. K. Kotlyakov (Report RAL Acad. Sci. USSR) (1954). [11] V. P. Dmitrievsky; V. I. Danilov,'Yu. N. Denisov, V. S. Katyshev, A:: A. Kropin, and A. V. Chestnoi, Extraction of the Proton Beam from the Six-Meter Synchrocyclotron (Report-to the All-Union Conference on the Physics of High-Energy Particles) (Moscow, 1956). . [12] V. P. Dzhelepov, V. P. Dmitrievsky, V. S. Katyshev, M. S. Kozodaev, M. G. Meshcheryakov, K. I. Tarakanov, and A. V. Chestnoi, The High-Energy Particle Beam from the Six-Meter Synchrocyclotron and its Utilization(Report to the All-Union Conference on the Physics of High-Energy Particles) (Moscow, 1956). Received May 29, 1956. 457 Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 HIGH ENERGY PARTICLES FROM THE SIX-METER SYNCHROCYCLOTRON AND THEIR UTILIZATION* (REVIEW ARTICLE) V. P. Dzhelepov, V. P. Dmitrievsky, V. S. Kat.yshev, M. S. Kozodaev M. G., Meshcheryakov, K. I. Tarakanov, and' A. V.'Chestnoi The problem of increasing the efficiency of utilization of the six-meter synchrocyclotron at the Institute of Nuclear Problems; Academy of Sciences USSR'.is reviewed, .The method by which a large number of particle beams is obtained and collimated is described; using these beams it is possible to carry on several simultaneous experiments. Characteristic beam data are-'presented. INTRODUCTION. Accelerators which produce particles with energies of several hundreds of millions of electron volts offer wide possibilities for carrying on research: on the most important problems of contemporary nuclear physics, for instance studies of the structure and properties. of elementary particles, clarification of the nature of their inter- action, determination of the characteristics of their exchange reactions and so on. High energy accelerators represent large scale industrial efforts and require the expenditure of large sums for their construction and operation. Thus the question .of the efficient utilization of these machines assumes major importance. The present paper is devoted to a short description of the approach to this problem which has been adopted at the. synchrocyclotron of the Institute of Nuclear Problems, Academy of Sciences USSR [1) which accelerates protons to an energy of 680 Mev; Basic Methods of Increasing the Efficient of Utilization of the Accelerator The chief objective of the scientific research at the six-meter synchrocyclotron is the study of elastic and. inelastic nucleon-nucleon interactions in the 300-660 Mev energy region and the scattering of Tr-mesons by nucleons and deuterons. Since the cross sections for the majority of these processes range. from several millibarns to some tens of rillibarns the acquisition of accurate quantitative data entails the expenditure of a considerable amount of accelerator operating time. The efficiency and scope of the utilization.of the synchrocyclotron in nuclear research with high-energy particles depends to a large degree on the rational solution of two problems: the extraction from the acceler-. ator vacuum chamber of intense beams of various types of high energy particles and the reduction of the back- ground caused by the accompanying. radiation. *Presented at the CERN symposium on high energy accelerators and meson physics (Geneva, June 1956). * *Deceased. 459 Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 In this connection we may n-iakc Mention of the following features of the facilities at the six-meter synchrocyclotron: a) the beasts of high energy protons, neutrons, and ir-rrtesons are extracted from the accelerator chamber through the shielding wall in thirteen directions; b) there area rncasurementenclosureand a special laboratory, shielded from the background radiation, for work with it-meson beams; it is possible to carry on simultaneous experiments with several beams of the same or different particles; the experimental equipment. is operated automatically by remote control; nuclear events are recorded by means of amultichannel electronic system. The High Energy Particle Beasts. In principle it,is possible to obtain beams of high-energy particles from any point in the orbit of the accelerated protons. The realization of this possibility,thowever, depends strongly on the design of the acceler- ator. It is important that the accelerator vacuum chamber and its side walls be free from any devices which might hinder the extraction of the particle beams. The extent to which this condition has been realized may .be seen from Figs. I and 2. N&A Fig. 1. The vacuum chamber of the synchrocyclotron showing the side from which the proton, neutron and tr-meson beams are-extracted.', 460 Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP1O-02196ROO0100090006-9 nceeh'r,tjon nice trode vacuuw chflnda?r probe Iupptcrnentnry ,hte)dtng Fig. 2. The high-energy particle beams from the six-meter synchrocyclotron. The first of these shows the front wall of the chamber. Almost the entire length of this wall, at the level corresponding to the proton orbit, is provided with a window for the extraction,. of -the particle beams; these are duraluminum diaphragms approximately 1 mm thick. In Fig. 2 is presented a general diagram. of the accelerator chamber which shows.the particle-beam con- figuration, the shielding layout and the measurement apparatus. Most of the high energy particle-beams which are ejected into the atmosphere are directed into the measure- ment enclosure which contains the experimental apparatus. The collimators are located in the porthole through the four-meter concrete shielding wall. The latter are steel pieces of square cross section, 3.6 m long, which have circular openings through the center, the diameters of which vary from 10 to 150 mm. The space between the collimators is filled with cast-iron blocks, providing good shielding.for the porthole as well as the possibility of making changes in the arrangement of the collimators. Fig. 3 shows a longitudinal section through the build- ing which houses the synchrocyclotron and the supplementary shield of concrete blocks which is in front of the four-meter wall of the measurement enclosure (in Fig. 2 this shield is indicated by dotted lines). The figure also shows a collimator of circular shape located in one of the neutron beams which is designed for work with circular scatterers. Shielding of Synchrocyclotron Operating Personnel From Accelerator Radiation An idea of the amount of shielding for the measurement enclosure and the room containing the recording and detection apparatus can be obtained from the following data. The general radiation level in the measure- ment enclosure for proton energies of 680 Mev with currents at the external target of 0.2-0.3 pamp varies from 461 Declassified and Approved For Release 2013/04/03: CIA-RDP1O-02196ROO0100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 0.1-0.2 mC/sec (in the right side of the enclosure) to 1.5-3mC/sec (in the left side of the enclosure in which there is a dome in the ceiling to allow the operation of a crane); the corresponding fast-neutron intensity (energies of 0.5 Mev and above) varies from 1-2 neut./cm?sec to 60 neut./cm2see.. The flux of neutrons with energies higher than 50 Mev is less than 5 neut./cm?sec [2]. Fig. 3. Radiation shielding for the six-meter synchrocyclotron. In the room which contains the recording instruments the radiation is negligibly small. This is indicated by the fact that when the accelerator is operated at high intensities the Geiger-counter count in any part of the room is not greater than double the cosmic-ray background[2]. 'Characteristics of. High-Energy Beams Extracted From The Accelerator Chamber Unpolarized proton beams. For obvious reasons great effort was expended in increasing the intensity of the external proton beam. An earlier method of proton extraction based on the scattering of protons by a uranium target was replaced by a new scheme developed experimentally at the Institute of Nuclear Problems, Academy of: Sciences USSR [4]'and the Nuclear-Physics Laboratory, of the.-. University of Liverpool [5] in which radial oscillations-of the particles are excited by a local. inhomogeneous magnetic field. The local magnetic field inhomogeneities are obtained by placing an iron mass in the vicinity of the last accelerator orbit. An exciter unit is used to start the radial oscillations. In the vicinity. of the exciter the mag- netic field intensity, falls off radially. The adjustment of the precession of the centers of curvature of the particle orbits is achieved by means of a second excitation region ("regenerator"). in which the magnetic field intensity along the radius increases rapidly. The magnetic field- configuration in the excitation zone and.the radial extent of this zone must be chosen so as to provide a sufficiently large jump. in the last orbit (about 40 mm [6]) while not causing any perturbation of the stable particle motion in the vertical, plane. The extraction of the particles from the chamber was accomplished by means of a magnetic channel con- sisting of two iron plates of varying cross section. In order to control the angular spread of the external proton beam, following the magnetic channel there is a focusing device which reducers the beam spread in the horizontal plane [7]. At a distance of 7 m from the magnetic channel the beam diameter is approximately 8 cm. The angular spread of the external beam is less than ? 0.5?. The total intensity of the external beam and the flux at various distances from the chamber along the particle trajectory was determined from the induced s -activity in the reaction Cl2(p, pn) Cu. These measure- ments showed that the total proton current at egress from the magnetic channel is 7.1010 protons/sec; this is 5-6% of the average particle current in the vicinity of the last orbit. Using a bending magnet the external beam can be directed into one of the three collimators (6, 7, or 8) located in the concrete shielding wall (Fig. 2). Thus, on the one hand, the space in which experimental instru- Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 merits for proton studies can be located is enlarged considerably, while on the other, most favorable conditions for operation of the instruments are created. The proton flux in the measuren-ient enclosure, at a distance of 15 m from the output window of the chamber, is (1-2). 10s protons/cm2 sec. The energy spread in the proton beam is very small. The deviation of particle energy from the mean value E av = 657 Mev, as determined by range measurements in copper, was no greater than f 5 Mev.[8]. Because of the high intensity of the external proton beam, it was possible, outside of the accelerator chamber, to obtain abeam of lr-mesons with energies up to 400 Mev at fl uxes of 60 mesons/cm2sec(at energies about 240-270 Mev). In these experiments a ,target of liquid hydrogen or polyethelene is placed in the proton beam, in front of the bending magnet (Fig. 2). The momentum and direction analyses of the 7r-mesons are carried out in the measurement enclosure'. through collimators 8 and 9. At energies of 300 Mev the energy spread of the ir-mesons in these beams was f 5 Mev [9]. hi Fig. 4 is shown a typical ,r. - meson energy spectrum obtained from proton-proton collisions at 657 Mev [9]. (The it-meson emission angle is 24? in the laboratory system). Neutron Beams, y Rays and Polarized Proton Beams. As in all other particle accelerators, at the six-meter synchrocyclotron neutrons.' are obtained by proton bombardment of internal targets. (usually beryllium),which are, .placed on probes (Fig. 2, probe III) in the vicinity of the outermost orbit. Four narrow "rays" are, obtained from the wide beam of neutrons emitted by the target through the use of collimators 10; 11,12 and.15.. The first three 100 200 300 E, Mev Fig. 4. Energy spectrum for 7r +- mesons in (p-p) collisions. neutron beams are unpolarized. At.incident proton energiesof 680 Mev the flux of neutrons with energies greater than 400 Mev at the location of the experimental apparatus is approximately 2. 104 neut./cmzsec.- The fourth neutron beam (collimator 15, emission angle 18?) is partially polarized. It has been shown experimentally that the polarization is approximately 15% [10]. The energy spectrum of neutrons emitted through collimator 11 (emission angle 0?) is presented in Fig. 5 [11]. The spectra of the neutrons emitted through the other collimators are similar although the maxima are shifted somewhat toward the low energy region. The beam emitted through collimator 15 exhibits the largest shift in the main maximum and this amounts to about 80 Mev [11]. Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP1O-02196ROO0100090006-9 In addition to the four neutron beams there are obtained from the same target four high energy y-ray beams which arise in the decay of the neutral 7r-mesons which are produced. The y-ray flux for energies higher than 10 Mev in the measurement enclosure is about 2.103 quanta/'cm2 sec (collimator 11). The energy distribution is shown in Fig. 6 (12]. The study of these y-rays serves as a means of obtaining information on the nature of the interaction of,r?-mesons with matter. Since experiments with polarized nucleon beams are of great interest, two beams of polarized protons are also extracted from the six-meter synchrocyclotron. One of these, which passes through collimator 4, consists of protons which experience diffraction scattering on beryllium nuclei within the vacuum chamber. The beam is polarized to about 60/ [13]; the proton energy is 635 ? 15 Mev. The other beam, which passes through colli- mator 5, is comprised of protons which are quasi-elastically scattered by nucleons inthe beryllium nuclei. The polarization of this beam is about 301 [13]. The intensities of both beams are approximately equal and are about 14-10 4 protons/cm2 sec. d17? de? O 100 200 300 400 . 500 . 600. 700 tp, Mev Fig. 5. The neutron energy distribution. The 7r-meson Beam. In order to create the most favorable ' conditions for work with negative 7r-mesons, a "meson laboratory" was built directly behind one of the vertical supports of the yoke of the magnet. The iron in the yoke was about .3 in thick and provides good shielding against the direct radiation from the acceler- ator chamber. The concrete walls. and, ceiling ' of the laboratory, which. are 1 m thick, serve as shields against scattered neutrons and trays. To provide an exit for mesons into this laboratory there are three collimators (1, 2, 3) in the magnet yoke; by means of multiple magnetic shields the magnetic field in these collimators is reduced.from 1600 to 1-2 gauss. 7r-mesons which are produced in a beryllium target (10 mm in thickness) located inside the accelerating electrode (dee) are directed into these collimators. The target is controlled remotely. By changing.its azimuthal and radial coordinates in conjuction with appropriate changes in the direction of the magnetic field in the magnet gap it is possible to obtain 7r-mesons of both signs and of various energies. Thus there are available 7r.--mesons with energies ranging from. 140 to 410 Mev and it?-mesons with energies from 140 to 245 Mev. The .7r - flux in the "meson laboratory" varies with energy from 200 to-2-3 mesons/cm2 sec [14]. The background radiation level in this laboratory is quite high, however; the general radiation level is 1-2mC/sec, thermal neutron level 500 neut/cm2 sec, and neutrons with energies En > 50 Mev. 3 newt/cm2 sec [14]. .The thickness of the concrete shielding should be increased to 1.5-2 m to reduce this background. In carrying out experiments with Wilson cloud chambers and diffusion chambers the meson flux should not exceed 20-30 particles/cm2 sec and the background of spurious radiation must be extremely low. In this work 7r-mesons with energies from 150 to 400 Mev are utilized; these enter the measurement enclosure through Declassified and Approved For Release 2013/04/03: CIA-RDP1O-02196ROO0100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 collimators 13, 14, and 16. The intensities of these ir?-meson beams vary from 40 per cm2 sec (E,?.-= 230 Mev) to 1-2 per cm2 sec (rlr-= 40.0 Mev). The energy spread is ? 6 Mev for r,-= 230 Mev [15]. The meson source is a second mobile target the positioning mechanism of which is located on the front wall of the accelerator vacuum chamber. dN dey dcd /.0 O 100 200 300 400 500 219 Ey, Mev Fig. 6. The energy distribution for y-rays from the decay of it ?-mesons produced in the collision of 670 Mev protons with carbon nuclei. In concluding this description of the particle beams we may note that the difficulty of locating the charged n-meson beams was substantially reduced through the use of a scheme in which a. current-carrying wire under tension is employed to determine the particle trajectories [16]. Irradiation of Samples Inside the Synchrocyclotron Chamber In addition to the mobile targets located in the chamber the accelerator is provided with four probes by means of which it. is possible to introduce (or extract) into the vacuum chamber samples. of various materials for irradiation by the proton beam accelerated to the desired energy. A similar method of sample irradiation is widely used in radiocheinical research. ,Simultaneous Operation With Several Particle Beams In the experiments with high energy particles several different techniques are employed: electronic par- ticle detection (scintillation counters and Cerenkov. counters in conjunction with photomultipliers), thick- layered emulsions, magnetic spectrometers, Wilson cloud chambers, diffusion chambers, bubble chambers and so on. At the disposal of the experimenters there are ten electromagnets with pole diameters ranging from 30 to 100 cm, powered by a system which is capable of operating five magnets simultaneously. There are also available several thousand concrete blocks weighing up to 50 kg for the construction of local shields. The arrangement of the experimental apparatus in the measurement enclosure is shown in Fig. 7. All terminal equipment for the detection apparatus (counting circuits, recorders, mechanical registers, etc.) and the remote control panels for the experimental equipment and the magnet-current regulator, which are located in places unsafe for personnel (the measurement enclosure and the "meson laboratory") are placed in a special detection apparatus room which is separated from the measurement enclosure (see Fig. 3) by a concrete wall 2 m in thickness. The equipment located in these two rooms is interconnected by a system of radio-frequency, high voltage, and control cables. The use of a patching system allows any of the detection instruments to be used in combination with the experimental equipment in any part of the measurement enclosure. When the machine is in operation no one is permitted in the measurement enclosure; the doors are self- latching. Scientific personnel engaged in nuclear research at the accelerator remain in the room containing the detection apparatus while the machine is in operation. As has been indicated earlier the background 465 Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 radiation level In this room Is extremely low thus allowing people to remain for an unlimited time: Fig. 7. The measurement enclosure with experimental equipment. in place. The present system of collimators and-shielding is arranged so that most advantage can be taken of parallel (simultaneous) operation of groups of experimental instruments with several beam's-of the same or of different particles. For instance over. a 'long period of time there were conducted experiments with 10-12 instruments on four neutron'bearims and two polarized proton beams. It is also possible to conduct simultaneous experiments with two cloud chambers (a Wilson chamber and a diffusion chamber) with the negative it-meson beams which enter the. measure ment enclosure. In this connection we may note that it has been feasible to pulse the accelerating voltage of the six- meter synchrocyclotron [1]; this allows an interruption of the radio-frequency oscillations at the appropriate instant of time and dtusparticlesemerge from the accelerator in bursts at times when the chambers are pre .pared for detection. In working with Wilson cloud cha'mbei- and diffusion chambers on experiments with maximum energy tr -mesons, the :flux of which is quite low, to increase the intensity of the pulsed ir-meson beam, use is~ made of the so-called "storage technique" [17]. This technique is based on the following: for several acceleration cycles (three-four) protons are accelerated only out to a radius of 160-180 cm (with a corresponding energy of 240-300 M(,v);.then on the fourth or fifth cycle the accelerating voltage is applied over the entire frequency range (25-14 me) as a result of which the protons are accelerated out to the limiting radius (278 cm) at which the target is located: By this means it has been possible to increase three-fold the intensity of the s-meson beam and hence to enhance the operating efficiency of the detection chambers. Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 The extraction from the synchrocyclotron chamber of a large number of high-energy particle beams creates the possibility of carrying on research on a wide front. By carrying on several experiments simultaneously, by the use of a multichannel electronic system and through the use of remote control of apparatus located in spots which are unsafe for personnel it has been pos- sible to increase substantially the utilization factor of the machine and to keep non-operating time to a mini- mum. The later is not greater than 7-8% and is determined chiefly by the time required for changes in the experimental apparatus and modification of the machine. LITERATURE CITED [1] D. V. Efremov, M. G. Meshcheryakov, A. L. Mints, V. P. Dzhelepov, P. P. Ivanov,.V. S. Katyshev, E. G. Komar, I. F. Malyshev, N. A. Monoszon, I. I 0 (the amplitude of deviations from equili- Fig. 2.. Construction of the compensating brium is exaggerated. magnets. Total number of magnets 120 Number of compensating magnets 15 Number of radial oscillations per, turn 13.752 Number of vertical oscillations per turn 12.744 Length of the radial focusing magnets 10.99 m Length of the vertical focusing magnets 10.69 Gap length between magnets 1.518 Radius of curvature of the regular magnets 166.1 Radius of curvature of the compensating magnets -296.6 Distance from the chamber axis to the asymptote of the hyperbolic pole the regular magnets pieces of 404.0 thm Internal half-height of the chamber 60 Internal half-width of the chamber 100 Utilization factor for the magnetic field 0.805 Logarithmic, derivative,. of orbit length with respect to momentum - 8.2. 10-4. Opening angle of the beam 2.10-3 radian Amplitude of the radial oscillations caused by compensation 40 mm Allowable momentum deviations A-p/p 0.5% Field tolerances . H/H 0..25% Gradient tolerances Agrad/grad 0.31 Tolerance on magnet displacement 1.0 mm Tolerance on vertical displacement (amplitude of 13th harmonic) 0.5 " Data on the magnet power supply is given in Table 3. Peak powers of the order of 100 kva will be obtained from generators with flywheels. The nominal capacity of each unit is 37 kva. ' There is a 12-phase ignitron inverter system. In order to reduce the ripple. Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 in the rectified voltage it is planned to use a filter and a special scheme for reducing ripple by negative feed- Fig. 3. Construction of the regular accelerator magnets. Growth time for the magnetic field Number of cycles per minute Maximum exciting current Maximum voltage Resistance of exciting winding at 15?C Maximum inductance of exciting winding Peak power back. The injector will be a 100 Mev linear accelerator. The magnetic field at injection is 90 gauss. Any devia- tion of particle momentum from the nominal value leads to compensating radial oscillations and causes the fre- quency of the free transverse oscillations to approach the approximate resonance value. This situation deter- mines the allowable momentum deviations -5.10-3 The accelerating system is supplied with an rf voltage the frequency of which is 30 times greater than the rotational frequency of the particles. The basic data on the radio-frequency system is given in Table 4. As can be seen from Table 4 in the terminal accel- eration cycle the tolerance for frequency deviations is very small. In this last cycle however, the frequency change. is small and thus the problem is not too serious. We are considering a design In which the frequency is controlled by=the beans. ? This system will be tested in a .7 Bev accelerator, which Is under construction. 3.8 sec 6 12,000 amp 8,000 V . 0.31 ohm 1.8 henry 96,000. kva Frequency of the accelerating field at the. beginning of the acceleration cycle 2.624 me Frequency of the accelerating field at the end of the accelerating cycle 6.068 me Tolerance on the deviations (slow) of the frequency from the specified frequency pf/f beginning of cycle 2. 10-3 end of cycle 2.6 ? 1076 Corresponding accuracy of magnetic field pH/H beginning of cycle 2.5 ? 10`3 end of cycle 10-2 Frequency of small synchrotron oscillations F beginning of cycle 5150 cps end of cycle 24 cps Tolerance on resonant harmonics 6 f/f beginning of cycle 31.10-T F 50 cps 4.10-g end of cycle 12.5-10 -9 Tolerance on noise modulation of the frequency 4.8- 10-3 cps2/cps ?i 481 Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP1O-02196ROO0100090006-9 In the accelerator under design the protons acquire approximately 1.00 key per turn. The sum of the accelerating voltages is 200 kv. As accelerating elements we propose to use transformers with ferrite cores. The power of the radio-frequency source will be about 500 kw. [11 V. V. Vladimirsky and E. K. Tarasov, "On the possibility of eliminating the critical energy in a strong-focusing accelerator:`Collection; Certain Questions in the Theory of Cyclic Accelerators (Acad. Sci. USSR Press, 1955). Received May 29, 1956 Declassified and Approved For Release 2013/04/03: CIA-RDP1O-02196ROO0100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP1O-02196ROO0100090006-9 LUMINESCENT CHAMBER E. K. Zavoisky, M. M. Butslov, A. G. Plakhov and G. E. Smolkin This paper gives a more detailed description of the components of the luminescent chamber and their development since the time at which an earlier report [1] was, published;, new experimental data are also presented. One of the basic components of the chamber (Fig. 1) is the electron-optical image -converter (EIC), which utilizes.,the principle of the cascade electron-optical light amplifier. Although this principle was reported in the literature long ago [2], the only successful experimental realization of the idea up to the present time has been that of M. M. Butslov.' A multicascade EIC of this type has an electron multiplication factor ne which is no smaller than that of multipliers with resolving powers (at the screen) of d p 10-2 cm and makes it possible, to detect photographically one electron emitted from the input cathode. The diagram of the EIC is shown in Fig. 1. The converter consists of an input section and several amplifier cascades which are coupled by optical contact through thin transparent sheets. There is a fluorescent screen 1 on one side of the sheet and a photocathode 2 on the other. The electron image is kept in focus in the multiplier cascades by the homogeneous magnetic field of the solenoid 3. In the input section electrostatic focusing is employed. With appropriate voltages on the photocathode 2 and the diaphragm 4, an. electrostatic lens is formed. Electrode 5 provides fine focusing of the electron image on the screen 1. PG -3 [] Fig. 1. Diagram of the.luminescent chamber. SC) Scintillation crystal; 0) objective; EIC: 1) fluorescent screen; 2) photo- cathode; 3) solenoid; 4) diaphragm; 5) focusing electrode; 6) 't.deflectibn plates; 7) 8) pulsed electron gate; Ph) photograph- ic apparatus; PG-1) pulse generator for the electron gate; PG-2) pulse generator for the high voltage; PG-3) pulse generator for control of the photographic apparatus; SWG) sweep generator. *The EIC.described in [3] has only one amplifier cascade and an amplification factor of less than 100. ARR Declassified and Approved For Release 2013/04/03: CIA-RDP1O-02196ROO0100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 In the space between the diaphragm and the screen there are two pair of deflection plates 6 which provide the high-frequency sweep. Electrodes 7 in conjunction with the diaphragm 8 comprise a pulsed electron gate. Fig. 1 shows a set-up which incorporates a radio-frequency generator and resonance circuits for the deflection plates as well as a pulse generator PG-7. for the gating section. Because there is no time delay this pulse scheme is an improvement over the analogous arrangement using a magnetic deflection system described in [4]. It provides a sweep "frame" with a resolving time of 10-8 sec and a continuous radio-frequency sweep with a resolving time 3.10-12 sec [5]. Fig. 1 also shows the arrangement of the high-voltage power supply for the EIC. In dc operation, the supply for all sections is obtained from a single high-voltage source through voltage dividers. In recording the tracks of cosmic particles and other random phenomena, a pulsed supply is used for the output section in order to reduce the background. For this purpose a gating electrode such as that described above is used in the out- put section of the EIC. More frequently, however, use is made of a high-voltage pulse supply from a special electrical set-up. ? In the figure this unit is designated by PG-2. The pulse length was varied to fit the emiss- ion time of the output screen. In recording tracks of relativistic particles and other weak signals, even with pulsed supplies on the out- put section it is impossible to eliminate the background due to the inherent noise of the EIC. To reduce this background a pulsed supply was used on the electron gate 7-8 in the input section; this is PG-1. The length of this pulse is determined by the electron time-of-flight in the interelectrode gap ( p 5. 10-9 sec) and the dura- tion of the signal itself. For example in working with CsI(Tl) r a 3. 10-6 sec. In this case the noise of the photocathode is completely supressed. It is, of course, also possible to pulse all the other sections of the EIC. Synchronization of the gating pulses was accomplished by.means of a scheme consisting of a photomulti- plier PM, a discriminator D and a coincidence circuit CC with a. resolving power of 4.10-8 sec. Following the operation of the pulse generators the film in the photographic apparatus was shifted automatically. The operation of the luminescent chamber is strongly dependent on certain important properties of the crystal such as light output, transparency to its own luminescence, and also the relative degree of correspondence between the crystal, luminescence spectrum and the spectral. sensitivity of the photocathode. Unfortunately it .was necessary to ,use crystals of NaI(Tl), CsI(Tl), anthracene and other low quality crystals. However, even in these it was shown experimentally that the amount of light emitted along the track of the charged particle is adequate for detecting even relativistic particles. This can be shown from an elementary calculation. A typical relativistic singly-charged particle loses, in a CsI(Tl) crystal, about 5 Mev per cm of track. The number of photons. emitted in this segment of track into an angle 41r is F 1.,4.1.05, where e is the energy required for the emission of one light quantum in CsI(Tl) which is taken to be - 35ev[6]. The number of quanta incident on the photocathode of the EIC is determined by the solid angle intercepted by the objective z s = 16 B2 (1 +k)2 . 16 Here B and k are the relative aperature and the magnification of the objective, g is the ratio of the correspond- ing solid angles in the crystal and in air - this may reasonably be taken as 1/n2 where n = 1.79, the index of refraction of a CsI crystal. Typically b = 1/2 and k = 1 so that we get s a 170 photons/cm. *A detailed description of suitable circuits, developed by the authors, will be given elsewhere. *It is assumed that the limitation on the emission time of the screen is the speed of the photographic apparatus and not the resolving time of the instrument. Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 The spectrum of the CsI(Tl) emission is almost entirely contained within the spectral sensitivity curve of a cesium-antimony photocathode. Taking the quantum efficiency of the photocathode to be b 10-1 [7], we obtain the number of electrons emitted from 1 cm of length of the image of the track on the photocathode. m pi :1.7.. Since the resolving power of the EIC is dry 10-2 cm it is easily seen that the image of the track will. consist of different points with spaces between there. Each point corresponds to one electron at the input of the E.IC. The space I between the points is 16 (1 + z, d---- -- M 1+?Ilz?Ic't?S_ The useful thickness of the crystal is determined by the depth of focus of the objective and can be com- puted from the formula - d_ ~rtz k213z 14 (1 1 Jc)zl - kz131 k2B All other conditions being equal the gaps in the track are a.function of the ionizing power of the particle. It is convenient to use this relation in conjunction with the range -energy relation in the crystal to identify the to -1 l0- 10', ' Range mm Fig. 2. Range'energy curve for a CsI crystal. a 10-2 J0-~ 1 10 102 J Range mm Fig. 3. Range-light output curves for a CsI(Tl) crystal. particle. In the case of strongly ionizing particles which produce 1 heavy tracks' the spaces. which are used for identification pur- poses are obtained from the optical density of the negative along the. track. In Fig. 2 and Fig. 3 are shown range -energy curves 2 and range-light output curves for CsI(Tl) which have been cal- culated for this purpose. The calculation was based on the well- known Bethe formula for energy loss by ionization. In the low- 3 energy region, where the particle velocity remains comparable to that of a k-electron in an atom, data on energy loss in silver [8] and experimental results on atomic, stopping power of the t 4 d 9 l Fig. 4. Photographs of proton tracks in a track. The reason for this seems to be fluctuations in the light CsI(T1) crystal. flux and the quantum efficiency of the crystal and photocathode. 1CM I emen s were use [ J. I tna ly we present photographs (Pig. 4) of proton tracks in a CsI(Tl) crystal obtained with the neutron . beam of the synchrocyclotron of the Institute of Nuclear Problems, Academy of Sciences USSR. The tracks are arranged in . *We may note that for 1 = d and even for 1> 2e ac holds, the thermal motion of the nuclei is accounted for as if the-substance under investigation were in a gaseous state [5] (Oae is the. characteristic Debaiev temperature, which determines the acoustic oscillations spectrum of the crystal matrix). ' In cases of crystal structures consisting of several kinds of atoms the distortion in the shape of the Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196ROO0100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 a total, barn X>00 ?f;0 E.ev Fig. 2. Complete :neutron cross section of radium Ra 228 resonance absorption curve could also be caused by optical oscillations of the matrix, with a corresponding temperature eop, and the condition of applicability of the formulas, correct for gases, will be different. The theory of this problem has not yet been developed. Frequently the crystal structure of the compound is character- ized by a single temperature e determined experimentally from the thermal conductivity at low temperatures. Information on the characteristic temperatures of radium compounds is not available. If we take the value of e for the compound RaBr2 as not higher than 150? K we can apply the relationship which is correct for the gaseous compounds. For the detected level the Doppler.width p was 0.015 ev. TABLE 3 Parameter designation Experimental parameters, Resulting values Computed parameters of the level first approx- second imation approximation E0, ev 0.537 f 0.006 a0. barn 2300 3170 3500 3600 1. 150 T', ev 0.045 0.032. 0.0297 0.029 f 0.001 a o 1'2, barn ? eve 3.0 :h 0.2 rn, ev (2.1 t. 0.1)?10-' 'For example, for KBr e = 177?K, for AgBre = 140?K [6]. A Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 In accounting for the finite resolving power of the equipment, the resolution function was approximated by a triangle with the additional factor (Ef E)-1, which accounts for the nature of the spectrum E-1 and the dependence of the sensitivity of the detector on the energy E-1/2 B , barn d000 r--- 0.450 0.490 0.530 0.570 0..5/0 E,ev .Fig. 3. Resonance region in the radium cross section. I.) Theoretical Breit-Wigner Curve. II) Computed from the theoretical curve corrected for Doppler spread and resolution .of the equipment. A. P. Tsitovich, who secured uninterrupted operation The method of successive approximations was applied to thirteen experimental points in the resonance region obtained with the thin sample, No. 3. Experimental and computed results of the values of the parameters in the resonance region are show: in Table 3. The solid curve in Fig. 2 is computed according to the Breit-Wigner formula using parameters Eo = 0.537 ev. oo = 3600 barn, t = 0.029 ev, ascat = 6.5 barn. The absorption cross section for 0.025 ev computed accord- ing to the Breit-Wigner formula with above parameters is 7 (0.025 ev) = (13.5 t 1.5) barn. The. resonance, region is shown in Fig.13. In the energy interval of 2 to 50 ev. there is observed a large scattering of experimental points. The accuracy of rneasurements.in the energy region is 15 to 2010. The obtained experimental data do not enable us to. present reliable conclusions concerning the average interval between the levels of radium. Apparently this value is not smaller than 30 ev. The magnitude of the radiation width for 0.537 ev rya P,-- 0.029 ev agrees with the general law of variation of F with atomic weight [7, 8]. The authors thank the radiotechnical group under of the electronic equipment during measurements, A. M. Gonchukova and V. A. Chodakov for. their help in the mathematical processing of the data, and V. I. Mostov for his participation in the discussions of the results. ' LITERATURE CITED '[1] D. Hughes, Neutron Cross Sections, AECU-2040 (Russian edition:with supplement: Atlas of Effective Neutron Cross Sections of the Elements edited by'Yu.V. Adamchuk,(Acad. Sci.USSR Press, 1955). Also: D. Hughes, J. A. Harvey, Neutron Cross Sections (McGraw Hi11 Co., N. Y. 1955.). [2] V. I. Mostovoi, M. I. Pevsner, A. P. Tsitovich,"Physical investigations; :Reports of the Soviet Delegation at the International Conference on the Peaceful Uses of Atomic Energy. ( Acad. Sci. USSR Press, Moscow, 1955 )? [3] L. J. Rainwater, W. W. Havens, J. R. Dunning, and C. S. Wu, Phys. Rev. 73, 733 (1948). V. L. Sailor, Phys. Rev. 91, 53 (1953). W. Lamb, Phys. Rev. 55, 190 (1939). F. Zeitz, Modern Solid State Theory, (State Technical Press, Moscow-Leningrad, 1949). Chap. III. D. Hughes, J. A. Harvey, Nature 173, 942 (1954). H. H. Landon, Phys. Rev. 100, 1414 (1955). Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 DIRECT MEASUREMENT OF THE ENERGY VARIATION OF n FOR U233, U235, AND Pu239 H. Palevsky, D. J. Hughes, R. L. Zimmerman, and R. M. Eisberg' ? Brookhaven National Laboratory, Upton, N. Y. ? ?' A technique is described that measures directly the energy variation of 11, the number of fission neutrons produced per neutron absorbed. When combined with total cross sections, the method is capable of giving fission cross sections as well. Results are presented in the energy region near thermal, of importance to reactor design, for U233, U235, and Pu239. Comparison with ti computed from total and fission cross sections shows good agreement for U233 and U235 but a disagreement outside experimental error for Pu239. An auxiliary experiment demonstrates that v, the number of neutrons per fission; is constant with energy in the region of interest for Pu239, hence that the discrepancy cannot be ascribed to a v variation. 1. Introduction, The variation with energy of n the number of neutrons emitted per neutron absorbed by a fissionable material, is a quantity that is,important to the understanding of the fission process as.well as reactor dynamics. By definition, aF oa where v is the number of neutrons per fission, OF is the fission cross section, and Oa is the absorption cross section (radiative capture plus fission). On the basis of the liquid drop model for fission (Bohr and Wheeler, 1939), the incoming neutron shares its energy with the other nucleons and the fission process takes place before the nucleus loses its excitation energy by radiation. The "prompt neutrons emitted are "evaporated" from the highly excited fission fragments shortly after they separate. In such a model v as a function of the incoming neutron energy is expected to be constant for slow neutrons because the kinetic energy. of the neutron is small compared to the excitation energy of the compound nucleus. From such considerations it was first expected that n also would be constant with energy for low energy neutrons, because of the constancy of v and the supposed high probability of fission relative to capture. *Work performed under contract with U. S. Atomic Energy Commission. ? *Now at. University of Ninnesota, Department of Physics, Minneapolis, Minn. ? [The following is a reproduction of the original American paper, and not a re-translation from Russian - Publisher's note]. 521 Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP1O-02196ROO0100090006-9 In 1.944 at Los Alamos (McDaniel et al, 1944) resonances in the fission cross sections were observed whose parameters indicated that fission widths were comparable to radiation widths.. From these experiments and the work at Columbia (Rainwater and Havens, 1945) on the total cross section measurements of the fissionable materials it was clear that the ratio of fission to absorption changed from level to level, hence that n would vary with energy. At the time the present experiments were undertaken the variation is il with energy in the thermal region (needed for reactor calculations) had been obtained only from the ratio of fission to total absorption cross sections, involving the assumption of a constant v. For U23i the variation of rl deduced from such considerations, however. was in gross disagreement with results of studies of the temperature coefficient of reactivity made at the start- up of the Oak Ridge and Hanford reactors. The present direct method for measurement of the rl variation was developed to resolve this difficulty. The results were in agreement with the observed reactor temperature coef- ficients and it was later shown that the previous disagreement was a result of error in the early fission cross section measurements. 2. Principle of the Direct n Method In this experiment the variation of 71 is measured directly. Under exactly the same experimental conditions two measurements are made: 1) the emission rate of fission neutrons from a thick foil of fissionable material as the incident neutron energy is varied, and 2) the change with energy of the flux of neutrons incident upon the foil. Thus one obtains directly from the ratio of two counting rates the change with energy of n. The fission neutrons are detected by means of proton recoils detected by a scintillation counter (Hornyak, 1952). A thick sample of the fissionable material is used, so that nearly all the incident neutrons are absorbed and.a maximum counting rate is obtained in the scintillation detector. The incident flux is measured by a boron detector in the form of a BF3 proportional counter that absorbs only a few percent of the incident beam. The boron cross section, in the energy range of the measurements, varies as 1/v (Carter et al, 1953; Egelstaff, 1954), and since the detector is "thin" the efficiency of the counter varies very nearly as the cross section. The relationship between tl and the measured counting rates, assuming,the sample is black, is CF ?F CB CB kF v o a . kB n kB where CF is the counting rate of the scintillation counter measuring the fission neutrons from the uranium, and CB is the counting rate in the,BF3 counter measuring the incident flux. kF and kB are the efficiencies of. the scintillation and BF3 detectors, respectively. kF is constant in the.energy region of these measurements. kB is proportional to 1// El where El is the incident neutron energy; therefore 1< n= CF C.B where k is a constant independent of the neutron energy. In these experiments no attempt is made to make an absolute determination of 71, and the results are normalized at E _' 0.0253 ev to the values of n given in the Brookhaven cross section compilation, BNL-325 (Hughes and Harvey, 1955). In practice the sample is not quite "black" to the incident neutrons, and the absorption cross section is needed for computing a small correction for the number of neutrons not absorbed in the sample foil. However, since nearly all the incident neutrons are absorbed, the experimental results depend only in an insensitive way on the absorption cross section. In .treating the experimental data small corrections are made for isotope impurities (1 to 3 percent), departure of the BF3, counter response from the 1/v law 1 percent), and for loss of neutrons scattered out of the foil ( < 1 percent). The scattering correction, although very small in the thermal region, is important in the application of this method to higher energy measurements, where the absorption is smaller. For a black sample only those neutrons that are scattered back from the front face of the foil escape, all the other scattered neutrons being absorbed. A calculation shows that for a black sample the effective scattering cross section is only 15% of the true scattering cross section. This reduction in the scattering effect is of value for measurements at higher energies Declassified and Approved For Release 2013/04/03: CIA-RDP1O-02196ROO0100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP1O-02196ROO0100090006-9 where the scattering cross section becomes an appreciable part of the total cross section. The definition of the effective scattering cross section and a curve giving its value for various sample thicknesses is given in the appendix. The energy of the incident neutrons is determined by a time-of-flight method using the Brookhaven slow and fast choppers to interrupt a beam of pile neutrons. The direct t7 measurement is not restricted by the method used for determining the incident neutron energy. Following the time-of-flight experiments at Brookhaven, similar measurements using a crystal monochromator for energy selection were reported from the Hanford lab- oratory (Leonard, 1955), and at the Geneva meeting in August 1955, several additional results using the same method were reported (Harvey and Sanders, 1956). The direct n measurement offers a simple and accurate method for obtaining knowledge of the variation of n with energy. It is difficult to obtain from cross section measurements the variation of n in the region of resonances because good energy resolution is required for the proper interpretation of total and fission cross section data. The fact that tl varies much more slowly with energy than does either Q& or of is the reason the direct measurement is the logical way to investigate this variation. Experimentally the direct method is attractive because the use of a thick sample yields the highest counting rate and at the same time gives a result that is fairly insensitive to the absorption cross section and sample thickness. These characteristics are in contrast to the cross section measurements where the samples must be thin in the resonance region to give the correct n variation. The present method also allows the use of the same apparatus to investigate all the fissionable materials, one foil being substituted for another when a measurement on a different isotope is required. Further- more the alpha "pile up", which is a serious problem when materials of high specific activity are measured in ionization chambers, creates no difficulty in the direct n method. 3. Fission Neutron Detector The fission neutrons are detected by means of proton recoils produced in a suspension of ZnS in lucite. This phosphor mixture' is molded in the form of 2 in. diameter "buttons" approximately 1-1/2 in. in length. One end has a slight spherical depression to give intimate contact with the face of the RCA 5819 photomultiplier. The buttons are made by heating a mixture of 70 grams of lucite molding powders and 4 grams of 40 u ZnS-Ag to 120?C in a die under 2500 lb/s q.. in. pressure (Higinbotham and Handloser, 1954).. A mechanically sturdy, nonhygroscopic cap is formed, which can be. easily handled for mounting on the 5819 tube face. The dimensions of the collimated neutron beam from the Brookhaven slow chopper .are 1-1/2 in. x 3-1/2 in. Six 5819 photomultipliers are so located along the periphery of this area to surround the sample foil. The arrange- ment is shown in Fig. 1. The calculated fractional solid angle of the sample foil subtended by the six scintillation counters is 1010. The operating point for the scintillation counter is determined by a compromise to satisfy two criteria. First, the efficiency of the counter for fission neutrons should be as large as possible. Second, the sensitivity of the scintillation counter for y-rays from the (n, y) process in the fission foil must be so low that less than one percent of the counts recorded are due to this process. From the work of Hornyak, 1952, and others at Brookhaven it was well established that the ZnS-lucite combination had low y-ray efficiency; however, in order to be certain of the second criterion the following test was run. With the detector set up to perform the experiment, the fission foil is replaced by a gold sample that is of a thickness calculated to produce approximately as many (n, y) events as are produced in the foil of fissionable material. Then a combination of counter voltage, amplifier gain, and discriminator bias is found so that the counting rate is about 0.1% of the counting rate with the fission foil in place. The extra factor of 1/l0 is used because of the uncertainty about the number and energies of the y's produced by (n, y)reactions in gold and the particular isotope under investigation. Only a small loss of neutron efficiency results since the discriminator curve for y-rays falls off much faster than the neutron curve. Under the above operating conditions the over-all efficiency for counting fission neutrons from the U235 foil was approximately 10-3, determined from a measurement of the incident flux and the known fission cross sec- tion of U235. Therefore, since the solid angle is 10%, the efficiency of detection of fission neutrons incident upon the buttons is one percent. The probability for a 1 Mev neutron to make a recoil proton, of any energy, in the traversal of the button is about 1/4. Consequently only about 1/25 of the recoil protons produce a large enough light pulse to be counted above the discriminator level. Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196ROO0100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 VOLTAGE DIVIDER AND CATHODE FOLLOWER . PHOTOMULTIPLIER VOLTAGE DIVIDER AND CATHODE FOLLOWER Fig. 1. Schematic drawing of the scintillation detector. 4. Results By means of this direct method, measurements have been made with the Brookhaven slow chopper (Seidl et all 1951) in the thermal region for U235, U233, and Pu239: For Pu239 the fast chopper (Seidl et al, 1954) at Brookhaven was used to extend measurements through the 0.3 level. The results will now be presented and their connection with the cross section measurements for the same isotopes will be duscussed briefly. 4.1 U 235 The foils used were made of uranium metal enriched in U235 to a concentration higher than 90% and also contained minor amounts of U238 and U234. Two sample thicknesses were used, 0.030" and 0.045". The data were taken in a series of repetitive cycles as follows: C1) The counting rate of a thin-walled BF3 counter which gives the distribution in energy of the incident flux of slow neutrons. C2) The background counting rate pertaining to measurement C1, obtained, at the slow chopper, by a 0.020" Cd foil inserted in the beam. This foil is essentially black to the incident neutrons in the energy range investigated in the experiment. C3) The counting rate of the fission neutrons detected by the scintillation counter. C4) The background counting rate pertaining to measure C3, obtained by inserting a 0.020" Cd foil in the incident beam. The variation in ty is then obtained from the ratio C3 - C4 _ CF C1- C2 CB Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 Twelve cycles of data were taken, which permits one to demonstrate the general reproducibility of the results and also averages.out the short term fluctuations in the sensitivity of the equipment. The statistical accuracy'of the points varies from about one percent in the thermal region to about three percent at 0.16 ev. The corrections applied to the data are as follows: departure of BF3'cotinter from 1/v, about 1.21o; U23a and U238 impurities, about 3.5%; and scattering correction, about 0.7%. Figure 2 shows. the combined results of the experiments performed with U235 at Brookhaven and Hanford. The Brookhaven data are normalized to n = 2.08 at thermal (E = 0.0253 ev), the value quoted in the Brookhaven compilation (Hughes and Harvey, 1.955). The Hanford data are normalized to Brookhaven data in the energy region of 0.10 ev. The dashed line is computed from the ratio of of/ad , Eq. (1), assuming v constant, and using the most recent cross section data, given in BNL-325. The agreement between the direct measurement and the variation of n computed from fission and total cross sections is everywhere within one percent. U235 is the one fissionable isotope at present where the total and fission cross sections are known with sufficient precision so that then variation deduced from these measurements has an accuracy comparable to the direct measurement. The observed n variation in U235 is a good example of the accuracy obtainable by this new method of measurement. The change in 71 in the thermal region is very small'(. 1% from 0.01 to 0.1 ev). From the total and fission cross sections it is not possible to, predict with certainty the sign.of the slope of the 17 curve in the thermal region. The resonance parameters of the 0.29 ev level give a ratio of radiative capture to fission cross section that is greater than that measured at thermal by spectrographic methods (Inghram., 1956). This fact had led to the belief that tl would decrease with increasing energy in the thermal region. The results of the present 7 measure- ments at Brookhaven, however, showed the opposite to be true. This situation arises because contributions from at least two negative levels, in addition to those,frorn the positive levels, are required to fit the cross section of U235 in the thermal region. From the observed variation of n and the total cross section an estimate may be made of the ratio of capture to fission for the negative levels (Harvey and Sanders, 1956). 4.2 U235 The foil was made of uranium metal with a U233 content greater than 90% and a thickness of 0.025". The same experimental procedure was used in obtaining the U233 data as was outlined above for U235. The corrections for isotopic impurities, scattering, and the departure of the BF3 counters from 1/v were each about one percent. u235 1 BROOISIAVEN DATA { HANFORD DATA Figure 3 gives. the results of the measure- ments on U233 normalized to 77 = 2.31 at E = 0.0253. rf is seen to be constant within statistical error (. 1%) from 0.01 to 0.1 ev. The dashed line is computed from the curves drawn through the total and fission cross aloF ~~ _L '-}; T ~Q1e compilation again with the assumption of a -"-I . 40 -015 in this case is good within the large statisti- as a function of for U235. The experimental Fig. 2. 71 energy P data are normalized to tl =:2.0$ at, thermal.- The dashed line gives n as calculated from the absorption and fission cross sections assuming v is constant. For the Pu239 measurement a 0.033" plutonium metal sample was used, which contained over 90% Pu239 and about one per- cent aluminum. The corrections for scatter- ing and departure from 1/v. are small (- 1%). Below 0.35 ev the correction for isotopic impurities is also less than 1%. However, above 0.4 ev this correction rises rapidly and amounts to 28% at 0.7 ev. Figure 4 shows the results of the measurements made with plutonium in the energy interval from 0.015 to 0.7 ev. Here, in marked contrast to U233 and U235, ,0 changes rapidly in the thermal region. The data from 1.90 I. I 1 001 0.02 005 W 02 0.5 10 cal errors in the fission cross section data, ENERGY IN e which would easily allow a f 5% variation in 77 over this energy interval. Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 thermal up to 0.15 ev were obtained with the slow chopper and normalized ton = 2.03 at thermal. The fast chopper was used to obtain the higher energy points and these were normalized to the slow chopper points in the neighborhood of 0.15 ev. The dashed line again is computed from BNL7325, assuming v constant. From the direct n measurement the ratio of n at 0.3 ev ton at thermal is seen to be 0.75 * .02. The cross section data assuming v is constant gives for the same ratio 0.85 t .05. --T--T,--r u233 005 I I I I I I I 1 1 02 .03 .04 .05 .06 .07 .08 .0910 ENERGY IN ev Q15 0.2 ENERGY IN ev Fig. 3. n as a function of energy for U233. The Fig. 4. n as a function of energy for Pu239. The experi- experimental data are normalized ton = 2.31 mental data are normalized ton 2.03 at thermal. at thermal. The dashed line gives n as calcu- The dashed line gives n as calculated from the absorp- lated from the absorption and fission cross sec- tion and fission cross sections assuming v is constant. tion assuming v is constant. . The 12% disagreement between the direct measurement and the cross section results. is seen to be outside the experimental error, and for this reason a series of experiments were performed to see. if there was an unassigned source of systematic error. In order to check whether the experiment was dependent on the energy of the fission neutrons the bias on the scintillation counter was increased until, the counting rate fell to one half of the value originally obtained. The slow chopper points were re-run with the higher bias settings and the results were in agreement with the first set of measurements. Next the shielding in the vicinity of the. counters was re-arranged to make sure that scattered neutrons.were not giving rise to spurious counts. No effect was found within an upper limit of 2%/0. As a final check the transmission of a 0.009" Pu foil was measured using the scintillation counter as a detector. The measured transmission agreed with the known. cross section data again proving that the timed neutrons were of correct energy. At first this disagreement was taken to imply that cross section measurements were in error. However recent theoretical (Bohr, 1956) and experimental (Pitcher, Harvey, and. Seth, 1955) work have indicated that there is a possibility that a fissile:,nucle.us can have more than one mode of fission.: On the basis of such con- siderations it would be possible that v might be different for the different levels. Therefore it was decided to investigate whether the assumption of the constancy of v in the energy interval of the experiment was valid. The measurement of the energy variation of v was made by comparing the ratio of fission neutron to fission fragment counting rates in the thermal region and a small energy interval centered at 0.3 ev. The same counter as used in the tl experiment was used to measure the fission neutrons, but a thin (0.001") foil was sub- stituted for these measurements. In order to measure the fragment counting a gas scintillation counter containing 10 mg of Pit was. constructed (Palevsky, Larsson, and Zimmerman; 1956). The neutron energies were selected by means of filters, using the beam of pile neutrons collimated by the fast chopper in a stopped, open position. The thermal data were obtained by Open-Gd differences using Gd(NO3)3 dissolved in D2O as a filter. The atomic concentration of Gd in the filter was 5 X. 10-4 atoms/cm2. The energy interval centered on the resonance was obtained by taking Gd-Pu differences using the same filter and a 0.009" Pu foil. Because the plutonium foils in both the fission fragment and fission neutron detectors were thin the result is fairly insensitive to the shape of the neutron spectrum. The result of this experiment is as follows: W0.3 CV Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 where uncertainty in the neutron spectrum constitutes one percent of the error and the residual error is statistical. It is therefore clear that the discrepancy between the direct n measurement and the cross section derived values cannot be attributed to a change in v. This same conclusion has been reached by means of similar v ineasure- ments at Saclay (Auclair, Landon, and Jacob, 1.955), Hanford (Leonard et al, 1956), Argonne (Bollinger et al, 1956), and Moscow (Pevsner et a1, 1.956). The constancy of v constitutes a definite advantage of the present direct rt method be- cause the t) measurement gives at the same time the energy variation of a, the ratio of capture to fission cross sections. It also implies that the relative fission cross section can be obtained from the 17 measurement together with the absorption cross *section (Eq. 1), thus avoiding the often difficult direct fission measurement. 5. Conclusions For U2'15, where the total and fission cross sections have been most accurately measured, the agreement between the direct p measurement and the energy variation of n calculated from the cross sections, assuming v is constant, is excellent. Such a comparison for U233 does not have much meaning at present because the cross section data do not have sufficient statistical accuracy. In Pu249 the disagreement between the direct measurement and the cross section calculation is about twice the standard deviation of the error associated with the cross section measurements. It should be mentioned that direct n measurements performed by Sanders at Harwell (Harvey and Sanders, 1956) using a crystal spectrometer are in excellent agreement with the present measurements. In the Harwell measurements the fission neutrons were moderated in paraffin and detected by BF3 counters. Because of the widely different nature of neutron sources and detectors in the two experiments, one would expect that the kinds of systematic errors arising in the Harwell experiments would be entirely differ- ent from those of the Brookhaven measurements. The excellent agreement of the results, therefore, indicates that the energy variation of n has been correctly determined. The discrepancy between n and the cross sections for Pu239 cannot be ascribed to a change of v with energy-because the recent experiments at various laboratories, performed to check this possibility, have all verified the constancy of v. Even though both 71 and the cross section for Pu239 have been measured at several laboratories it seems most likely at present that the discrepancy, which is about nine percent when based on world average values (Harvey and Sanders, 1956) of all quantities, is a result of combined experimental errors. It is important that further measurements be made in order to resolve this discrepancy so that the present 17 method can be pushed to higher energies with confidence, and perhaps be used to obtain fission cross sections as well. 0.4 0,3 0.2 U.S 00 t Acknowledgements The authors wish to thank Dr. T. I. Taylor of Columbia University for his assistance in taking the U235 data. We are also indebted to W. A. Higinbotham and J. A. Handloser of the Brookhaven Electronics Department for preparing the ZnS-lucite scintillation caps. The Effective Scattering Cross Section The counting rate in the scintillation counter used 0,64 to detect the fission neutrons from a fissionable material .is proportional to the average neutron flux in the material. 2 N6t 3 4 5 For a foil of thickness t the average flux is given by -~ Fig. 5. K, as a function of sample thickness Not. Ktrs is the effective scattering cross section. t F(x)dx, F (t) - ? I =F (0) c dx 0 -Nl at 1_c Neat 527 Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 where F (x) = F (0)e-Noa t if there is no scattering in the foil. N is the number of nuclei per cm3 and as the absorption cross section. To include the effect of scattering let K(x) be the probability that a neutron scattered at the distance x will leave the foil without being absorbed. Thus K(x)as, the effective scattering cross section, represents the fraction of the scattering cross section that is effective in contributing to the attenuation of the flux. We then have, including scattering, d r(x) - r(x)Na,1-;-K(x)6Q) . (6) Figure 5 shows the average value of K for various foil thicknesses in units of Naat, computed from Eq. (6). The curve represents the numerical solution for K (x) of Eq. (6) and subsequent averaging over x. LITERATURE CITED Auclair, J. M., Landon, H. H., and Jacob, M. (1955) Compt. rendu 241,.1935. Bohr, N., and Wheeler, J. A. (1939) Phys. Rev. 56, 426. Bohr, A.. (1956) Proceedings of the International Conference on Peaceful Uses of Atomic Energy, Paper P/911. Bollinger, L. M., Cote, R. E., Hubert, P., Leblanc, J. M., and'Thomas?G. E. (1956) Bull. Am. Phys. Soc. '1, No. 4. Carter, R. S., Palevsky, H., Myers, V4 W., and Hughes, D. J. (1953) Phys. Rev.92, 716. Egelstaff, P. A. (1954) J. Nuclear Energy 1, 57. Harvey, J. A., and Sanders, J. R. (1956) Progress in Nuclear Energy Series I, Vol. 1, Chapter 1 (Pergamon Press, London). Higinbotham, W., and Handloser, J., (1954) Rev. Sci. Instr. 25, 98. Hornyak, W. F. (1952) Rev. Sci: Instr. 23, 264. Hughes, D. J. and Harvey, J. A. (1955) Brookhaven National' Laboratory Report 325 Neutron Cross Sections (Superintendent of Documents, Washington, D. C.). Inghram, M. (1956) Proceedings of the International Conference on the Peaceful Uses of Atomic Energy, Paper P/596. . Leonard, B. R. (1955) reviewed by H. Palevsky, Proceedings of the International Conference on the Peaceful Uses of Atomic Energy; Paper P/587. Leonard, B. R., Seppi, E. J., Friesen, W. J. (1956) Bull. Am. Phys. Soc. 1, No. 1. McDaniel, B. D., Sutton, R. B., Anderson, E. E., and Lavatelli, L. S. (1945) Los Alamos Scientific Laboratory, University of California (unpublished). Palevsky, H., Larsson, K. E., and Zimmerman, R. L. (1956) Rev. Sci. Instr. (in press). Pevzner, M. I., Donelyan, L. S., and Adamchuk, Yu. V. (1956) private communication; Kalashinikov, V. I., Tebedev, V. I., Mikallyan, L. A. and Pevzner, M. I. (1956) private communication. Pilcher, V. E., Harvey, J. A., and Seth, K. K. (1955) Phys. Rev. 100, 1248A. Seidl, F. G.'P., Palevsky, H., Randall, R. R., and Thorne, W. (1951) Phys. Rev. 82, 345. Seidl, F. G. P., Hughes, D. J., Palevsky, H., Levin, J. S., Kato, W. Y., and Sjostrand, N. G. (1954) Phys. Rev. 95, 476. Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP1O-02196ROO0100090006-9 FUEL BURN-UP IN NUCLEAR REACTORS The paper describes the method of calculating fuel burn-up in nuclear reactors, taking into account the capture and multiplication of neutrons while slowing down. In the calculations, account is taken of the burn-up of U235 and the build.-up and burn-up of Np239, Pu239, Pu240, Pu241 and of the fission fragments. INTRODUCTION The economic characteristics of nuclear reactors designed for the production of electrical energy depend to an important degree on the quantity of raw material required to produce a given amount of electrical energy. or, in other words, on the permissible degree of nuclear fuel burn-up. If we assume.that the problem of maintaining continuity of operation of reactor fuel elements has been solved, then the permissible extent of fuel burn-up will be determined by the initial excess reactivity in the reactor and by the laws of its decrease during the reactor's operation. In this paper is considered the change in reactor reactivity with time (the kinetics of burn-up) for the case of extensive fuel burn-up. Numerical results are obtained for natural uranium systems with heavy water moderation. Multiplication During Slowing Down In burn-up kinetics a leading role is played by the accumulation of Pu239, Pu240, and Pu241. These isotopes, and Pu239 in particular, have large neutron absorption and fission cross sections in the epithermal region. For this reason it is necessary to take into account in the kinetic equations not only the capture of neutrons in the epithermal range but also the deviation of the cross section from the 1/v law in the thermal region. We will consider, to begin with, certain questions involved in calculation of the capture and multiplication of neutrons during the slowing down process. Let us assume that the neutron spectrum (on the energy scale) has the form of the Maxwell distribution at the temperature T: N (E) dE = NT T7'-3/2e-T l/E dE (NT is the total number of thermal neutrons), which extends up to the energy Ejo* and of a Fermi. distribution of slowing down neutrons f(E)dE, extending from the energy Ejoto the energy spectrum of fission neutrons. The "joining" energy Ejo is determined as the energy of intersection of the two spectra. In such an approximation, no account is taken of the influence of chemical binding (which becomes important near the joining energy) on the neutron spectrum. Comparison of the spectrum obtained with experimental measurements [1] shows that the *The factor y, which differs little from unity, takes account of the circumstance that the Maxwell spectrum must be normalized to unity in integration to Ejo rather than to infinity. Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196ROO0100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 error introduced by such an approximation is comparatively small. The spectrum of the slowing down neutrons is determined by the equation (E) f" q(T)w(L)9 where Is is the scattering mean free path, g is the mean logarithmic energy decrement, dr = 3lEE , and g Aq= aT YI2(C) where L(r) is the diffusion length of neutrons of age T. In the Equation (3) it is assumed that the 'moderator does not contain "any hydrogen, and that the total neutron absorption cross section is small compared to the scattering cross section, thereby assuring the applica- bility of the diffusion approximation. The existence of strong resonance absorption (for example by the resonance levels of U238 or Pu240) is taken account of in equation (2) by the factor cp(E), which represents, the probability pf escaping resonance absorption by the strong resonance levels, and which therefore cannot be' included in L2 in Equation (3). The initial conditions for the function q(r) can be obtained through calculating the number of fast neutrons originating in the capture of thermal, as well. as of slowing down neutrons, by the fissioning nuclei, and has the form e(E-s) q (O) ?vT viaiTp5NiT I J Lz (T) q (T) d p Here p I is the concentration of the ith isotope, a iT is the 'absorption cross section of thermal neutrons, v'i is the number of secondary neutrons per absorption, NiT is the density of thermal neutrons at the location of the ith isotope, is the fast neutron multiplication constant,k(r) is the multiplication constant for neutrons of age r. The thermal neutron cross sections entering into the first member of Equation (4) are assumed to have been averaged over the Maxwell spectrum in accordance with the equation E,jo S -N (E,) dE aT?T = at1 = Eio J N(E)dE where VT = 2200. m/sec, is the standard speed of thermal neutrons. As is well known, in this averaging (see, for example, [2]) what is actually averaged are not the cross sections as and the transport lengths It, but the mag- nitudes o av and the' diffusion coefficients D - ltv. *The division of resonance capture into that by strong and weak levels is somewhat provisional. Subsequently 'we will include in cp only resonance capture in U238 and Pu240, the remainder being included in the term q(r)/L2(r) in equation (3). . Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 The Equations (3) and (4), together with the equation for thermal neutrons RANT_NT = -Q (To (Tc is the thermal neutron lifetime) determine fully the conditions for reactor critical size, and for the neutron density distribution in the reactor. If the reactor does not have a reflector, the solution of Equations (3), (4) and (6) can be obtained through the substitutions q (r, T) = q (T)el r, which gives -0 2 T l%2T 4(T)'=q(0)e ?L (T) Tip dT 2 ~ (x2+__)NT(o)=Jf_q(0)e ? L c2) T NT (r) = NT (0) ef-r, where LT is the diffusion length for thermal neutrons (calculated through averaging over the Maxwell spectrum by the method described above), while ~p is the total resonance escape probability (by strong levels) in neutron slowing down to the energy Ejo. The substitution of Equation (7) into (4) leads to the characteristic equation for determining the Laplacian of the system K 2; 1 + %2Lz, = - ~? d,c . 2 -% T ?o kre 0 L2 (;) J T.o dT . 2 k (T) dT a-~ L2 1-% L2(T) kT = RT1?O is the thermal neutron multiplication constant. From the equations (1), (2) and (7) we can determine the joining energy Ejo - 5-o- _ e T?= (1-fx2L`) is(I o) (( T 2 2 eirr \ o ) X (Essoo 11/2 T ) Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 where 'CT = mean absorption length at the given temperature, while E2200 is the neutron energy corresponding to a neutron speed of VT 2200 m/sec. Now it is easy to deduce the burn-up equation for any isotope. Let pi he the number of nuclei of the ith isotope. The number of neutrons captured by the nuclei of this isotope per unit time are determined by the expression Ea NTOTa TPi+Pi voi(1-')! (Is)dE Ljc, (E0 is the fission spectrum energy). Strictly speaking, the neutron density in equation (11) should be considered as varying for the different isotopes although for convenience we will ignore this fact in our notation, assuming that the appropriate corrections have been included in the cross sections. Inserting the Equation (7) into the Expression (11), we obtain the equation for the burn-up of the ith isotope: dpi_ dt - - NTVTaiTpi - NTVT - dT 2 -x - Z 0L CO i- k(T) dT e L.2 (t) 0 at (E) L2 L2 CO E ?(E)e dE+Q-a,ipt where Q is the number of nuclei of the given isotope formed as a result of neutron capture by the preceding Isotope;. Xi is the disintegration constant (if the given isotope is radioactive). It should be noted that for an infinite system an equation of the type (12) can be easily obtained also for the case of moderation by hydrogen since in this case the kinetic equation for slowing down can be solved exactly. In the sequel we will be investigating thermal neutron reactors for which the magnitude is dE S Eli (E) L Ejo Tjo (' di o can be considered to be fairly small. Then the equation (12) goes over into Eo dpi - - NTVTaSTpi NTvT?rP Vh?hTPh Pi ?i(E) } Q-a.ipi? h EJo ? 4= vh ahTPh It . Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 As is known [3], [4], the probability of a neutron resonance capture in its moving through a distance 1 within a cylindrical fuel element of radius R is determined, for the case of a single resonance, by the expression ? T E smod~ lcr C 2 lcr L. 1? (2lcr Kr L jl C I for)) . where r is the level width, while lcr is the absorption length in the center of the resonance It' is necessary to average this expression over all directions of neutron motion in the fuel element. Let us make such an average approximately, replacing 1 by the mean path of the neutron in the fuel element. 1- = 2R. This approximation has sufficient accuracy for practical cases, since in the limiting case of I/l,cr>> 1 the expression (19), after the substitution 1 = 2R, differs from the exact expression only by 2%.; in the case of the other limiting situation. of 1/lcr i1: ~R-RZ S N (R) R dR Changes In Reactivity The reactivity of the system is characterized by the effective multiplication constant, small changes in which are proportional to small changes in the Laplacian. The expression for the effective multiplication con- stant can be easily obtained starting with the equation (8). For this purpose let us employ the circumstance that absorption during.slowing down takes place primarily in the energy region near to thermal energies. The factor a-x=- can be taken out from under the integral sign in the denominator at the value T]o = .r (Elo). The expression (8) assumes the form: 1-{- x2L3 = ke -x2TJo , k=kT(1a-1A)+ + S (1- a-u') x2 LT), dc Q tQJ= La (T) , In case of low absorption during slowing down dT J(~ k (t) :.. dT a L2(T) L (T) dr dT dT Q L2(T) L2 (T) e Tjo dT C ` Lz'(T) ? 1 in the expression for S one can drop, in Te dc -J La both numerator and denominator, the factor e 0 To the extent that these factors are dropped in S.M Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 both the numerator and denominator the value of S practically does not change even for not very small TJ, TJo S k (T) L2 (T) 8- o (' dc kl SILz(~) The multiplication constant for thermal neutrons, kT, can be written in the following way: kT = i''Ps`fo`Pff . X '4sasTPr, 4eaoTP9-i-'JiaiTPi TPa+.asTP5 + a9TPo+QOrPo+QiTP1+1arP+(arP)ff .In the Expression (25) go = e`O 0, EOTP is absorption in the moderator and in the construction materials(aTp.)'ff is absorption by the fission fragments, off' eOff ff is the probability of resonance absorptioiY`in the fissio.i fragments. Poisoning due to the isotopes Xe 135X e and $.m149 the concentration of: which rapidly attains equilibrium levels, we will include in Ea Tp and not in (' 01 P)ff-.. The ratio of the value of kT at the time s,. to its value at the beginning of the fuel reloading cycle; is equal to.' kT (s) f (s) 1 kT (p) - ~~ 1-A (s) PPo (S) `P ff (S) X X cff..., 1+(1.+.ce)(1+;2c)(1-A) , 1 A(s)= (1-1- CO) Ec) X X11 - p6 a9T Po -. a'oT Po - aiTPi}, Ec = EoTP cff = (arP)f .asTPsO+aeTPs' . a6TP6? (26) Here, as previously,' it. is assumed that if the mean neutron densities are different in various materials, then the cross sections must be multiplied by appropriate factors. The magnitudes, w and 6 are simply expressed through prior introduction of the probability of neutron absorption during slowing down: W -'rb+'r9+ lg ? U t Smod X a5Pb2~E[cs(1-{-EC)-1-EC Jo r,r s~, +yB09T V6 Q f--' I6 of j9 (1+cs)(1+Ec)(1-A) X 5T sT w f(s) d,c f2 (,) Then (29) Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 7  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 To obtain the value of the effective multiplication constant, it is necessary to calculate the change in the multiplication constant induced by charge in 0 " E which appears on the left side of the Expression (23.). Since 2 0 1-A(s) ' eff(s) -k(s) eff. (0) k(o) x2Lr (0) A (s) -A (s) + iOLT (0) where the connection between k and 1 1; 2) weak absorbers with of 100). Calculations carried out on the assumption that the scattering at these a (90?) energies is of purely diffraction character lead to a proton radius of ro 0'.7.10-13 cm. A similar analysis carried out by other authors for smaller energies led to a proton radius .r0 P (0.5-0.7) ? 10 cm. Results of measurements of the total interaction cross sections of nucleons with nucleons and with deuterons were reported by V. I. Moskalev. The total cross section of the (p, p) interaction increases by a factor of 1.5 in the energy range from 380 to 660 Mev. The total cross section of the (n, p) interaction remains constant and equal to (34-37) ? 10-27 cm2. At energies. below 580 Mev the (p, d) interaction cross section agrees within the limits of error with the sum of the (n, p) and (p, p) scattering cross sections, and at larger energies is somewhat smaller. This effect can evidently be explained by the screening of the nucleons in the deuteron. Analyzing the energy dependence of the total cross sections for scattering of nucleons by nucleons, K. Brueckner (USA) came to the conclusion that meson production at energies 500. to 1000 Mev occurs only in collisions of nucleons in states with T 1. At higher energies, when double meson production. begins, mesons are also produced in collisions of nucleons in states with T = 0, and the total'cross section of the interaction of nucleons in this state begins to increase. This effect can be explained on the hypothesis that meson production occurs mainly through intermediate states with T = 3/2 and J = 3/2. V. P. Dzhelepov remarked that, according to data obtained by his group, at neutron energy about 600 Mev the meson 'production occurs equally intensely with T = 1 and. with T = 0. The conclusions of Prof. Brueckner are based on the analysis of. data relating to the difference between "the (p, d) and (p, p) cross sections. The nonadditivity of the (p, d) interaction cross section, which increases with the energy, could' thus lead. to a lowering of the cross sections found in this way for meson production in states with isotopic spin T = 0. The morning and evening sessions on May 18 were devoted to the interaction of 7r- mesons with nucleons and nuclei. In the reports of N. A. Mitin, A. I. Mukhin, and I. V. Sokolova accounts were given of experiments on the scattering ofir mesons by nucleons and on the carrying' through of the phase-shift analysis of this process. The report of Prof. E. Clementel (Italy) was also devoted to this latter question. The experiments were carried out in the meson energy range from 176 to 310 Mev. The phase-shift analysis was done both with and without the inclusion of d waves. It was shown. that the contribution of the d waves to the scattering is small in com- parison with those of the s and P waves. The dependence of % on the meson momentum was found to be almost linear right up to 307 Mev. From the results obtained it follows that the interaction radius ins states with T = 3/2 cannot be appreciably greater than the value r = 6.5 -14 cm. At energies larger than 240 Mev it was not possible to obtain agreement of the energy dependence of the phase resonance with the Chew-Low theory. The results of the. phase-shift analysis permit one to assert that the conclusions from the dispersion relation agree with experiment right up to 310 Mev energy. R. Marshak told about the scattering of low energy 7r- mesons by protons. A comparison of the experimental results with the Chew-Low theory led the speaker to the conclusion that the hypothesis of charge independence might be "unjustified" in this energy range, since two effects depending on charge come to be of great importance: the Coulomb interaction and the nucleon mass difference. K. Brueckner stated that the dependence of the total interaction cross sections of 7r-mesons with Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP1O-02196ROO0100090006-9 nucleons is not monotonic at high energies. At low energies the meson, as it were, "does not notice" the meson cloud of the nucleon and interacts only with its central core. With increase of the energy the meson cloud be- conies transparent and collisions occur at large impact parameters. The resonance nature of the interaction between mesons leads to the nonmonotonic behavior of the energy dependence of the cross sections for inter- action of mesons with nucleons. The interaction of 7r--mesons - with the nuclei of various elements was the subject of reports by R. M. Sulyaev, N. I.. Petrov and A. E. Ignatenko. In collisions of 330 Mev 7r - mesons with ilea nuclei the mesons interact mainly with the separate nucleons of the a particle, but multiple processes also turn out to be important here. The angular dependence of the elastic ( 'R , a) scattering is evidently nonmonotonic in the region of small angles. This fact may possibly be evidence of a difference of sign of the Coulomb and nuclear scatterings, unlike the case of energies below 200 Mev, where the signs are the same. The elastic scattering of 7r -mesons by nuclei of carbon and lead is satisfactorily described by means of the optical model. The inelastic collisions mainly have the character of the interaction of mesons with the individual nucleons, the collisions being mostly single for the range of scattering angles from 120? to 180?, while in the scattering at angles from 0 to 60? the mesons make several collisions in the nucleus. The total interaction cross sections and the`.total inelastic colli- sion cross sections with mesons in the energy range 140 to 400 Mev were determined for a number of nuclei. The experimental results,agree well with calculations carried out on the basis of the optical model, with use of the dispersion relation to find the optical parameters of the nuclei. The radii of the nuclei agree well with the expression R = 1.43 ? 10 -iq At/S cm. V. V. Krivitsky told about the creation of 7r +- mesons by collisions of 308 Mev ic -mesons with carbon nuclei. The total cross section for this process was found to be equal to oc = (2.6 t 1.3) ? 10-27 cn72.. A rough estimate of the cross section forthe similar process in ( 7r p) collisions leads to vp . 10-27 cm2.. In the discussion of questions connected with the interaction of fast, particles, with nuclei, considerable attention was given to polarization phenomena. G. D. Stoletov reported on the polarization of proton beams arising from the scattering of 660 Mev protons from beryllium nuclei. The experiments were conducted with primary scattering angles of 18? and.9?,in the laboratory reference system. The degrees of polarization found here were 33 and 66% respectively. It was found that the maximum value of the degree of polarization in elastic scattering of protons from beryllium nuclei is considerably higher than in the case of quasi-elastic scattering and inelastic collisions. The polarization in elastic scattering at angle 9? does not change perceptibly with increase of the atomic weight of the analyzer. The polarization of proton beams emerging from quasi- elastic. collisions and meson formation decreases markedly with increase of.atomic weight. A report by R. Marshak: was also devoted to the question of studying the polarization occurring in the scattering of protons by protons and by complex nuclei. I. I. Levintov told about a determination of the ratio of the real-parts of the spin-orbit and central inter- action potentials of nucleons with nuclei. This quantity can be found from data on the polarization. at high energies, on the basis of information about the levels of certain nuclei and about the scattering at low energies. The values of this ratio found in different ways agree among themselves. N. A. Guliev told about a calculation of the polarization appearing in the scattering of nucleons by nuclei. In this work the distribution of the nucleons in the nucleus was given and the potential corresponding to this distribution was found by means of scalar meson theory. Several reports were devoted to-the scattering of high energy particles and to the nuclear reactions pro- duced by these particles. In his report L. Rosenfeld (England) discussed the possibilities that the study of the nuclear scattering of fast particles provides for the study of nuclear structure. The data on the scattering of electrons -provide evidence that the parameter To in the expression for the nuclear radius must be regarded as dependent on A and equal to ro = 1.4 ? 10-13 cm for heavy nuclei and ro = 1.2.10-13 cm for light nuclei. The calculations show that with further increase of the accuracy of the measurements it will be possible to observe effects due to the fact that the charge is not' continuously distributed in the nucleus, but concentrated in the in- dividual protons. On the basis of the results of experiments on the scattering of ?-mesons the conclusion is drawn that the anomalous scattering of these particles either does not exist at all, or else is much smaller than had been expected previously. 628. Declassified and Approved For Release 2013/04/03: CIA-RDP1O-02196ROO0100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9 M. Levy (France) spoke about the scattering of 550 Mev electrons by protons and deuterons. At large scattering angles the measured cross sections are 10 times greater than the Rutherford values. Better agreement is obtained by taking into account the distribution of charge and magnetic moment in the proton. To explain the data on (e, d) scattering it is necessary to take the neutron radius much smaller than the proton radius, but this contradicts the data on the magnetic moments of nucleons. Better results can be obtained by using a nucleon model with a central core, but here the size of the core has to be taken equal to that of the whole proton. It is possible that the results of these experiments give evidence that the interaction of point charges at small distances (r Pj 0.5 ? 10 cm) departs from the Coulomb law. V. I. Moskalev reported on measurements' of total cross sections and-inelastic interaction cross sections of neutrons and protons with nuclei. The total cross sections of light nuclei at energies of 660 Mev for protons. and 630 Mev for neutrons are equal'to each other, which is evidence for the charge symmetry of nuclear forces. In the range of neutron energies from 380 to 630 Mev a small increase of the cross sections of light nuclei is'ob- served. The total cross sections of the heavy nuclei remain practically constant in this range. The inelastic interaction cross sections of. protons with nuclei remain almost constant in a wide range of energies from 150 to . 850 Nlev. El-Nadi (Egypt) considered in the Born approximation the theory of reactions in which the incident nucleon captures two nucleons from the nucleus. The results of the calculations agree 'qualitatively with the experimental data (presence of. a maximum in the small angle region). But the further course of the cross section does not agree with the results of the calculation. The carrying out of further experiments will show whether the cause of the discrepancy is the use of the Born approximation. An account of the elastic and inelastic scattering of high energy neutrons and deuterons by extended semi- transparent nuclei wa's'given by K. A. Ter-Martirosyan. The formulas and curves obtained by his work may be useful in determining the sizes and shapes of nonspherical nuclei. N. A. Perfilov reported on the emission of fragments with Z >'4 in the destruction by protons of the nuclei of an emulsion. In the energy range from 350 to 660 Mev the yield of the fragments increases by a factor of 2.5. The observed effect cannot be explained by the splitting of Ag or Br nuclei, nor by the evaporation of fragments from strongly excited nuclei. J. Filbert (France) told about a study of the interaction of:1. Bev protons with the nuclei of a photographic emulsion. The total interaction cross: sections were studied, and also the yield of a particles from light and heavy nuclei and the probabilities of formation of stars, with various numbers of charged particles. The discussion of the problems connected with: photonuclear reactions began with a survey report by A. M. Baldin, devoted to the photoproduction of 7r-mesons from protons and deuterons. An account of the photopro- duction of slow ir-mesons from complex nuclei with y-rays of maximum energy 260 Mev was given by N. G. Semashko. Comparison with the results of the calculations. of Baldin and Lebedev showed the necessity of taking into account the finite dimensions of the nucleus. The fact that the cross section for photoproduction of it mesons is proportional to A2/3 is interpreted as evidence that the formation of mesons occurs mainly at the surfaces of nuclei. The conclusion is' drawn that the decrease of the meson yield for small Z is due to the nuclear reaction (repulsion) in the. system ir-meson-nucleon. A. A. Abrikosov directed his talk to a consideration of a number of quantum electrodynamical effects at high energies. A. B. Migdal explained that, because of the necessity of taking into account large longitudinal distances in the production of pairs and Bremsstrahlung at high energies the ordinary shower theory turns out to be altogether inapplicable in dense media at energies greater than 10-13 ev. In a number of interesting reports W. Panofsky (USA) told about experiments on multiple photoproduction of sr- mesons from hydrogen, about the photoproduction of p-meson pairs, about the direct production of mesons by electrons and about Bremsstrahlung at high energies. At electron energies of 575. Mev the production of pairs of ir-mesons was observed with a cross section of 10-33 cm2. The system (ir+, p) is formed .mainly in the p state, and the system (ir-', p) in the s state. The distribution of energy between the components of a pair turns out to be extremely uneven: near the threshold the ir-mesons take up almost all of the energy. The results of the experiments obviously agree with the hypothesis that the production of mesons goes through the inter- mediate state J = 3/2, T = 3/2. The results of another series of experiments enable us to conclude that direct creation of pairs of p-mesons is evidently an?existing process. Here the experimental cross sections agree better 629 Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196R000100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP1O-02196ROO0100090006-9 with the calculated values if the finite size of the nucleus is taken into account. In these experiments no effects were observed that could he ascribed to the action of nonelectromagnetic coupling of p-mesons with nuclei. B. M. Pontecorvo told about attempts to detect a nuclear interaction connected with the interchange of p-meson pairs. It was shown that if such an interaction exists at all, its contribution to forces does not exceed 10- 2 % of the contribution due to 7r,= mesons. Reports by N. B. Delone and V. S. Roganov, and also by R. Wilson (USA) were devoted to various questions connected with the photodisintegration of the deuteron. Studies have been made of the angular distributions and the spectra of the neutrons and protons appearing in this process. It is noted that the angular distributions of the neutrons from the reactions (y, d) and (y, C) agree near 0 = 45?. It is concluded that with light nuclei reab- sorption of mesons is unimportant. The data on the photodisintegration of .the deuteron, for energies up to 50 Mev agree in their general features with the theory of Schiff. At larger energies the experimental points lie considerably higher than is predicted by this theory. A simple model is proposed to explain the behavior of the cross section for this process at high energies. Rough agreement with the experimental data can be obtained if one supposes that the production of mesons from the nucleons in the deuteron is the same as,from free nucleons. If the pro- duction of the mesons occurs at large distances from the nucleon, they escape, and actual meson production is observed. For meson production at small distances, the mesons are emitted and reabsorbed. This effect leads to a rise of the cross section for photodisintegration of the deuteron near the threshold for meson production. Similar conclusions, reached in a study of the photoproduction of Tr- mesons from deuterons, were reported by M. I. Adamovich. A. N. Gorbunov reported on experiments on the photodisintegration of helium nuclei at high energies. It was found that the (y, p) and (y, n) reactions are of resonance character with a maximum near 27 to 30 Mev. The cross section of the (y, p) reaction is constant at energies 40 to 75 Mev and falls sharply at the latter energy. In this range the cross section of the (y, n) reaction decreases monotonically. The angular distributions of the neutrons and protons are identical, and an energy-dependent asymmetry is found around the angle 90?. In the process of absorption of quanta by nuclei of helium higher multipoles play a part even at low energies. The last session of the section on elementary particles and their interactions was devoted to questions about new particles. M. Menon (India) told about a cloud chamber study of s-particles at a height of about 2500 m. A. I. Alikhanyan reported on experiments with a. mass spectrometer used together with two Wilson cloud chambers. In the composition of the cosmic radiation, besides. protons, deuterons, 7r-and p-mesons, and positive and negative K-particles, there was observed a group of particles with mass about 560 times the mass of the electron. The intensity of these particles is equal to about 1% of the number of p-mesons in the same interval of ranges. V. A. Lyubimov reported on measurements of the spectrum of: K-particles at a height of about 3200 m. In the range of momenta up to 450 Mev/c there are far fewer K-particles than ?r-mesons N7r 6.5 Jo in the interval of momenta up to 900 Mev/c the ratio of the intensities of K-particles and ir-mesons rises to 20 1o, and in the interval of momenta up to 1200 Mev/c it reaches 40 to 501o. At momenta from 900 to 1000 Mev/c the yield of K particles is a maximum, and their number exceeds the number of Tr-mesons. The results of the ex- periments. make it seem possible that K-particles, like 7r-mesons, are quanta of the nuclear force field. L. Smith reported on experiments with the cosmotron, in which during bombardment of carbon and lead nuclei with 1.9 Bev 7r-mesons a search was conducted for joint production of A- and 0-particles. The lifetimes of 0?-and T?-particles were found to be greater than 10-9 sec, and that of K-particles equal to 10-9 sec. It was shown that the scattering cross sections for the different kinds of K-particles are the same. Wang.Han-Chang (China) told about some results of work in which heavy mesons and hyperons were studied with a Wilson chamber at a height of 3185 m. In 30,000 exposures 8200 nuclear reactions were found, and 200 heavy mesons and hyperons. Several cases of pair production of these particles were observed. B. S. Neganov put forward a proposal to consider the nucleon as a system consisting of a..hyperon and K - particles. In this case the K-particles must be regarded as structural units entering into the composition of the nucleon, and not as quanta of the nuclear field. On this assumption the process of production of hyperons and K- particles in pairs must be regarded as a process of dissociation of the nucleon. 630 Declassified and Approved For Release 2013/04/03: CIA-RDP10-02196ROO0100090006-9  Declassified and Approved For Release 2013/04/03: CIA-RDP1O-02196ROO0100090006-9 Professor Wang Han-Chang (China) presents' a report at the A11=Union Conference on iligh Energy Particle Physics in Moscow, May 22, 1.956. J. Steinberger (USA) presented a report on the production of "strange" particles froth hydrogen by 1.3 Bev tr-mesons, Decays of .E--and,K-particies:were observed, which were due, in the opinion of the speaker, to electromagnetic processes. A? considerable number of cases were observed of "unusual" decay of A and 0 --- particles, in which visible tracks of decay particles were absent. The lifetime of E--particles was found to be 1,4'10-10 sec, Analyzing the experime ntal'data, the speaker came to the conclusion that they do not provide an indication of a higher spin for the hyperon. .The report of R. Peierls (England) was devoted to hypernuclei, i.e., -nuclear systems in which bound hyperons occur as constituents. Similar questions were discussed in. the report of N?. N. Kolesnikov at one of the meetings of the theoretical section. Here also L. B. Okun described the results of calculations of the cross sections for exchange collisions of K-particles in hydrogen and deuterium, and also for reactions in which K- particles are captured by deuterium; the purpose is,to obtain evidence about the spin and parity of 1-0.4 ev) is equal..to half the capture. cross, section at thermal energy. For nuclei of intermediate atomic weight (50