FERROMAGNETIC PROPERTIES OF HEXAGONAL IRON-OXIDE COMPOUNDS WITH AND WITHOUT A PREFERRED ORIENTATION

CPYRGHT Approved For Release 1999/09/24: CIA-RDP83-00423R0020-7 2059 LABORATORIA N.V. PHILIPS' GLOEILAMPENFABRIEKEN EINDHOVEN (HOLLAND) FERROMAGNETIC PROPERTIES OF HEXAGONAL IRON-OXIDE COMPOUNDS WITH AND WITHOUT A PREFERRED ORIENTATION G. W. RATHENAU, J. SMIT and A. L. STUYTS GEPUBLICEERD IN: ZEITSCHRIFT FUR PHYSIK, 133, 250-260, SEPTEMBER 1952  Appr4 ved For Release 1999/09/24: CIA-RDP83-00423R002000130008-7 Zcitschrift fiir Physik, Tad. 133, S. 250-260 (1952). Ferromagnetic properties of hexagonal iron-oxide compounds with and without a preferred orientation. By G. W. RATIMINAU, J. SMnT and A. L. STUYTS. Mit 10 Figurcn im Text. (Eingegangen am 22. Juni 1952.) Approved For Release 1999/09/24: CIA-RDP83-00423R002000130008-7  Approved For Release 1999/09/24: CIA-RDP83-00423R002000130008-7 CPYRGHT I3esprechung der Magnetisicrung von hexagonalen Eisenoxydverbindungen als Uunktion der Fcklstarkc. Ilci der I3ildung von Bloch-Wanden miisscn t'nrcgclmaLigkcitcn im Iirislallbau Iuitspiclcn (13). Dci regelloser Icristallvcricilung and ciner hristallgroLic obcrlialb der kritischcn kann Dcmagnctisicrung durch wandvcrschicbung schon bci positivcn I rldstarken von ungcfahr da I, aultreten (C). I lurch Orienticrung der Kristalle dicscr Iiiscnoxydverbindungen I crruxdure wcr- dcn (IM)_,-N%'crte von 3 ? iI'? Gil Oc crrcicht. Durch IcornvcrgroLicrung crgibt iclr vine starkc 1'cncusscrung tier lextur. the gedvutct wirtl (D). .I. I nlruduclron. A class of magnetic hexagonal iron-oxide compounds given the name of Ferroxdure has been dealt with in detail in an earlier publication'. The prototype of these ceramic materials has the composition BaO.6 Fe_O.,. We shall confine ourselves in this paper to material of about this composition. The most important magnetic properties of this nonconducting per- manent magnet material of high coercive force are represented in Digs. I 3. As is seen from Fig. I, the saturation magnetization I, at room temperature is about one fifth of that of metallic iron. The value of the magnetization at low temperatures can be explained, as was shown in 1, as being caused by non-compensated antiferromagnetism. Fig. 2 for time crystal anisotropy constant K shows that the forces binding the spins to the direction of the hexagonal axis are very strong. K is defined by the equation for the magnetic energy h Iti sin'- l-J Il'stnr1U ?- . (I) where (1 stands for the angle between the direction of the magnetization and the hexagonal axis of a single crystal. As is not unreasonable to 1 \ ENT, J. J., G. W. RATm3NTu, G. W. GORTER and G. W. VAN OosTEIt,moeT: Philips Tcclut. Rec. I3. 194 (1952. Approved For Release 1999/09/24: CIA-RDP83-00423R002000130008-7  CPYRGHT Appro vied For Release 1999/09/24: CIA-RDP83-00423R002000130008-7 Ferromagnetic properties of hexagonal iron-oxide compounds. 251 for which the magnetization 15000 ,,.,,,,.l- --I-, u - - 70000 dom the value 0.96K/IS sig- 7500 ---t - 75000 01 I I 700 -700 0 700 200 300 T Fig. 2. Constant of crystal anisotropy K of BaFe,,O,, as a function of temperature. taneous rotation of the 70000 SninS- For nn --1.,1r. ?.F na .,~ 20000 the following significance. If a single crystal is mag- netized to saturation along the easy direction of the hexagonal axis an anti- parallel field must attain 2K/IS to cause reversal of the magnetization by simul- times smaller at room tem- 200 -100 0 700 20D 300 YOo ?C 500 perature. In rig. 3 the Fig. I. Saturation Magnetization of BaFe1EO19 as a function quantity 2K/IS and the erg/cms of temperature. coercive force actually ob- 5 served for fine-grained sin x706 tered material are plotted 0 against temperature. The field strength 2K/IS has 4 3 ymme ry, the difference of magnetization energy in WO different directions, given by K, is much greater than Is the equivalent quantity in 200 cubic crystals, which, e.g., for metallic iron is twenty a expect for a crystal of low c00 t GauB simultaneous rotation of 500 the reversal of magnetiza- 700T_2_00 300 009 Lion in an actual specimen Fig. 3. The quantity 2KJI,, for BaFe,,O,, and the coercive force jHe of fine-grained sintered specimens as a function of of the magnets under con- temperature (particle size of the order of one micron). sideration cannot be solely due to rotational processes against the forces of crystal anisotropy. Firstly ,11, though very large, is for the greater part of the Curve RozoRTx, R. M.: Ferromagnetism, p. 831. New York 195'1. immediately reveals that io0 7oa o 0 of the two curves in IF ig. 3 Approved For Release 1999/09/24: CIA-RDP83-00423R002000130008-7  Approved C')Qi 1999/09/24: CIA-RDP83-00423R002000130008-7 much smaller than 0.96 K,'Is and, secondly, the dependence on tem- perature of both quantities is quite different r. It thus proves necessary to explain the coercive force of the fine- grained material and the hysteresis-loop, which will be treated more fully in section C, by assuming the formation and movement of Bloch walls in the small single crystals of which the material is composed. This assumption is by no means trivial in this special case, as will presently be shown. B. Bloch-wall formation in small Particles. Let us for the sake of simplicity treat asmalt single crystal ofdiameterd containing a Bloch wall parallel to the hexagonal axis (Fig. 4b). The Bloch wall reduces the volume energy of demagnetization, but its surface energy has to be fur- stable only if the diameter ex- ceeds a critical value2, which turns out to be about Fig. 4 a and b. A sphertral particle in which in al a l3krh wall grows from the right-hand side, while in h) it . paratrs two Weiss domains. 9a d` 2n 712 (2) ir being the wall energy per cm2. For Fcrroxdurc d, is of the order of one micron at room temperature, a grain size which can be technically obtained by grinding and milling. It is the high crystal anisotropy K, which enters in the expression for o, and the relatively low value of I, that cause the large critical diameter d, For metallic iron d, would be 50 times smaller. It is a question of considerable interest how, after saturation and application of an external demagnetizing field, the wall enters the sphere of Fig. 4. An energy barrier has to be surmounted. It has been stated by KITTE1.3.4 that above a certain size, exceeding d, of equation (2), Bloch wails will be created spontaneously, but for smaller dimensions an external field has to be applied, the critical magnitude of which he has calculated. We believe that this calculation needs some revision, and that the correct critical field does not depend upon the particle size, this being very large compared with the thickness of a Bloch wall. I The strain energy will not be considered in what follows, since the constant of magnetustriction on saturating along a direction of the basal plane proves to be only about 20, to ?. 2 iiITTEL, C.: Rev. Mod. t'hvs. 21, 541 (1949). 3 KITTEL, C.: Phys. Rev. 73, 810 (1948). 9 130ZORTH, R. M.: Ferromagnetism, p. 831. New York 1951. Approved For Release 1999/09/24: CIA-RDP83-00423R002000130008-7  CPYRGHT App oved For Release 1999/09/24: CIA-RDP83-00423R002000130008-7 Our calculation, which very closely resembles that of KITTLL, runs as follows. It is seen that the largest field H. is needed in the very initial stage of the formation of the wall, so we have to consider only small angles of deviation 0 of the spins. Therefore if the Bloch wall starts at the surface of the sphere (Fig. 4a) the energy balance reads K Oz?v+L,X.=(H,-P 4n Is) 1, ?I: 02 V. (3) Here v is the volume of the disturbed region, 1 4a I, the demagnetizing field from the bulk acting in v, and E,,,. the exchange energy, which can be made vanishingly small as compared with the anisotropy energy by taking the disturbed region sufficiently broad in the beginning. Ignoring it, one obtains for the critical field strength H` = 2K/I,-0.33. 47cI,. (4) Thus H, is independent of the particle size. It can be shown that the gain in demagnetizing energy is larger if the wall starts in the middle of the sphere. In that case the coefficient of 4 rc I, is --0.86. For a thin plate magnetized along its normal these values are - 1.01 and -2-02 respectively. So we arrive at the conclusion that Bloch walls will be created in pairs with opposite screw orientation (+ and - walls). If only the situation with one wall is stable, the other one will disappear, turning over the spins on its way. For Ferroxdure the condition is satisfied that the wall thickness (about 10_e cm) is small compared with the critical diameter (about. 10-4 cm). We expect from this analysis that large crystals should also retain a very high coercive force (2K/IS -2.02 ? 4n I, 7000 Oe at room tem- perature). Since this is contrary to the experiments we must assume that the Bloch walls are nucleated at places where the anisotropy energy is lower due to imperfections most probably occurring at the crystal boundaries. C. The magnetization curve. It has been shown in the preceeding section that in specimens of BaO ? 6 Fe2O3. containing crystals of the order of magnitude of one micron, single domain behaviour may be expected at room temperature near the remanence point. At large negative field strengths walls are probably introduced at places where the anisotropy is locally reduced. When trying to understand the magnetization loop of fine-grained material we have to explain at first the course of the curve representing Approved For Release 1999/09/24: CIA-RDP83-00423R002000130008-7  CPYRGHT Approved For Release 1999/09/24: CIA-RDP83-00423R002000130008-7 1H, as it function of temperature (Fig. 3). It has been stressed in I that the critical diameter d, of equation (2) increases with temperature as 1i4j15. This means that for a given grain diameter at elevated tem- peratures below the region of the CURIr temperature fewer walls are to he expected than at a lower temperature, at which a higher saturation magnetization aids in forming them. Especially those walls which are fixed at inclusions or regions of suitable strain, and therefore are least mobile, will persist at higher temperatures. On the other hand the field strength necessary to move a particular wall decreases with temperature as lit. It is believed that these two effects, the influence of which on the coercive force is opposed, cause the maximum in the curve 11, versus temperature, The material under consideration is ideal for separating the magneti- zation processes of rotation and wall movement. While the stiffness with respect to rotation given by 2K,11, is very large compared to 4nI5, the wall formation and wall movement can be made rather easy by firing the material at a high temperature and thus increasing the dia- meter of the grains to some thousand times the critical diameter d, Considering this case, the walls will he formed already in very small demagnetizing fields, say zero. Due to the random orientations of the crystals large internal demagnetizing finds are present, which cause Bloch-wall formation already in positive external fields, leading to a low remanence. Because an appropriate analysis is very difficult, we shall try to approach the problem by using mean values throughout and ignoring the pure rotation for the present (1I= : ). Without wall formation the I -- Il curve coming from saturation should then be the straight line 1 -- j I. Let us consider a small ellipsoid of revolution in the matrix, which will be assumed to have a homogeneous magnetization I in the z direc- tion. The easy direction is along the axis of revolution (,,) and the demagnetization coefficient in that direction is n. The angle between and is 0. It is seen that the total internal field h; in the ellipsoid will vanish for an external field parallel to I given by H,(0)_ cos'-nI. (5) For 11 ?H0(U) the ellipsoid is magnetized to saturation, but for lower fields wall formation occurs and the magnetization decreases in such a way that the internal field h.1 remains zero. The total magnetization as a function of II can now be calculated by averaging over 0, and the NVENT, J. J., G. W. RATHENAU, L. W. GORTER and G. W. VAN OOSTERHOUT: Philips Techn. Rev. 13, 191 (1952). Approved For Release 1999/09/24: CIA-RDP83-00423R002000130008-7  Approv kdlase 1999/09/24: CIA-RDP83-00423R002000130008-7 Ferromagnetic properties of hexagonal iron-oxide compounds. peratures and therefore having different grain sizes. In Fig. 7 the curves arc plotted for two 0 0,5 Ile 1,5 .o 25 such materials, measured at a low nIs - and at a high temperature, one (a) Fig. 5. Demagnetization curve calculated for an as with small crystals and the sembly of crystals which are oriented at random. Field strength for wall formation and displacement are other (b) with large grains show- assumed to be zero. 2K1I, - oo . ing that the fall-off field varies with temperature approximately as 43r I. Curves for pure rotation as calculated by STONER and Wol1LFAxlzT1, on inserting the values of K and Is as measured for single crystals, are dashed. curve of Fig. 5 is found. For H = a n 1, in all ellipsoids walls are created, and for decreasing field the slope of the curve for the dense material assumes the constant value 1. It is seen that the field at which an appreciable decrease of the magnetization due to wall formation occurs specimens fired at different tom- I, 025 in agreement with the experi- 050 ments. Fig. 6 shows curves of I is about nls. For Ferroxdure with its plate-like particles this should be about 4sr I. This is GauB 3000 ` 2000 255 600,9 Oe, 8000 Fig. 6a and b. Hysteresis loops at room temperature of l3alPe,,O,, sintered at 1350 and 1400? C respectively.. In this connection it is also interesting to note that the remanence of hexagonal metallic Cobalt 2 is only 27% of the saturation value. It is.seen from Fig. 6 b that the slope of the I -H curve near H = 0 is greater than the theoretical value 4/8n. This may be due to some 2000 0 2000 4000 6000 Oe 8000 -2000 0 2000 4000 H_ fl-- a b 1 STONER, E. C., and E. P. WOHLFAHRT: Phil. Trans. Roy. Soc. Lend. 240, 599 (1948). 2 BozoiTn, R. 112.: Ferromagnetism, p. 266. New York 1951. Approged For Release 1999/09/24: CIA-RDP83-00423R002000130008-7  CPYRGHT Approv clustering of similarly oriented crystals, or to walls which pass through crystal boundaries, thus leading to smaller demagnetization. -ZGW u 6t/W 'UM oarro vu awa H fe Fig. 7a and b. Hysteresis loops for tiaFc,.U,. oriental at random, measured at - tyb- and 280- C resper- tively. of a material with small crystals, obtained by sintering at a low temperature, b) a material with larger crystals. Dashed: demagnetization curves calculated for pure rotation. 8 2080 0 two t090 &700 X l' i ~O4W -? 17 D 4 6000 80000810000 H-- H-- a b Fig. 8a and b. Hysteresis loops at n,om temperature measured for psewio-unicrystalline material along the direction of preferred magnetization, to be compared with Fig. 5. a) small crystals, b} large crystals, higher density. For the sake of comparison Figs. ba and b show the magnetization curves of pseudo-unicrvstalline specimens of the same material (sec- tion D), with small and large crystals respectively. As can be expected, Approv4d For Release 1999/09/24: CIA-RDP83-00423R002000130008-7  CPYRGHT Appr~ ved For Release 1999/09/24: CIA-RDP83-00423R002000130008-7 Ferromagnetic properties of hexagonal iron-oxide compounds. 257 for positive fields these curves do not show a decrease of magnetiza- tion through wall formation (due to the formation of internal poles) as strong as represented in Figs. 6 and 7. In connection with the above considerations dealing with a material for which it was assumed that rotations were absent, while wall displace- ments could easily occur, one may ask how the magnetization curve will be if wall formations are strictly excluded while only rotations occur. This case can be realized by working with particle sizes much smaller than the critical one. Whereas in the first case considered the remanent induction for crystals with one direction of preferred magnetization proved to be much less than half of the saturation induction, it turns out that in the latter case it is larger. This can be understood as follows. The remanence value of 2,r IS has been deduced by assuming that in each particle the magnetization points in the easy direction, giving a minimum of the energy of crystal anisotropy. The inner demagne- tization energy, however, which has been dealt with above, may then be large. In reality the sum of both energies has to be minimized. Therefore the actual value of the remanence will exceed 2n IS and corresponds to the magnetization in a positive field, smaller than 4i-ZI, in STONER and WOHLFAHRTS curve. Due to the large value of 2K/IS the saturation magnetization was measured on a single crystal. Therefore we were not able to verify experimentally the above statements with certainty. t 1 permanen -agnet rnateiia needed to produce a B=4atJ~H given field in a given volume of air gap is about inversely proportional to the value (BH)max in the _H eHL o part of the B-11 diagram, where B is positive Fig. 9. schematic 4 a I and B curves at negative field and H negative'. From Fig. 9 it will be evident strengths. that the only way to raise the (BH)max value of a material with very high coercive force IH, is to increase the remanence 4'r I, for if the coercive force for the magnetization were infinitely is equal to half the saturation value. i~ From a technical point of view the volume of D. Preferred orientation in the polycrystalline ceramic material. It has been stressed that, since it is due to non-compensated anti- ferromagnetism, the magnetic saturation of the hexagonal iron-oxide compounds is not very large. Except for correc- tions which are treated in section C the remanent ~'tI magnetization of an assembly of crystals with uniaxial magnetic anisotropy, oriented at random, Approved For Release 1999/09/24: CIA-RDP83-00423R002000130008-7  CPYRGHT Approved q or Release 1999/09/24: CIA-RDP83-00423R002000130008-7 258 G. W. RATHENAU, J. SaiiT and A. L. STUYTS: large the coercive force for the induction 1? would be H, = 4~r I, and the (BH)n,ax value would amount to 4nIF)2 -2 It has therefore been our aim to arrive at a preferred orientation of the hexagonal axes, which is the direction of easy magnetization of the small single crystals within the sintered permanent magnet bodies. We have succeeded in producing a preferred orientation of this kind by orientating small single crystals of the hexagonal compounds in a strong magnetic field and compacting them by pressing, preferably in a magnetic field. In the subsequent firing operation the preferred orientation is not dest- Tabir I. roved butontlfecontrary a,sl e, rr,~ greatly improved. This can be shown by a corn- bfore firing . 1500 870 1.72 parison of the remanent after firing . . . 3100 , 420 7.4 magnetization of the specimen in the direction in which the orienting field had been applied and normal to it, before and after firing. According to table 1 the ratio of the remanent magnetizations greatly increases on firing. This improvement of the preferred orientation by firing will be discussed more fully below. Here it suffices to say that by orienting the crystals the value of Fcrroxdure permanent magnets has been increased from 09 to 3.0 times 100 GB Ore. The curves in Figs. 8a and b give the magnetization for oriented Ferroxdure-samples which have been fired at lower and higher temperatures respectively. The orientation of such sintered ceramics becomes apparent when the specimens are broken. Rupture occurs generally along the basal pla- nes, which develop very perfectly. When the specimen is correctly tilted with respect to a light source a pronounced reflection of light by the basal planes can be observed. Specimens with a texture, in the form of a cube with two faces parallel to the hexagonal basal plane of the crystals, demonstrate --when overfircd--the existence of the texture through the preferential growth of the crystals along the basal plane. In Figs. 10a and b micrographs of such a specimen are seen with the plane of the figure normal, respectively parallel, to the hexagonal axes. The large dimensions of the crystals in the basal plane and the small dimensions normal to it are evident. In discussing the improvement of preferred orientation by firing, two explanations are possible. Firstly it might be thought that the crystals which are incorrectly oriented are generally those that have the Approved or Release 1999/09/24: CIA-RDP83-00423R002000130008-7  CPYRGHT App roved For Release 1999/09/24: CIA-RDP83-00423R002000130008-7 Ferromagnctic properties of hexagonal iron-oxide compounds. 259 smallest dimensions and therefore disappear under the action of the surface tension at the boundary of air and the crystals. However, since the disappearance of the incorrectly oriented material occurs mainly after the specimen has been sintered to about four-fifths of the X-ray density, it seems that the following explanation is more appropriate. It has been shown for metals that a crystal cannot absorb another one which has about the same orientation or a twin. orientation'. The Fig. tea and to Microphotographs of a Ferroxdure cube with oriented crystals, a) the hexagonal basal planes being in the plane of the picture, b) the basal planes being normal to the plane of the picture. I ox . improvement of a preferred orientation by grain. growth has also been followed directly by electron-emission microscopy2. It turns out that only those crystal boundaries move that have large interfacial energies due to different orientation of neighbouring grains. If an incorrectly oriented crystal is imbedded in. a matrix of equally oriented crystals it "rows only if it is large compared with the crystals of the matrix. Other wise it will be absorbed. The condition for growth is approximately3: Did > 2yd1/yii, where ydt is the interfacial energy of the boundary of the incorrectly oriented r 'CIEDEMA, T. J., W. MAY and W. G. BURGERS: Acta Crystallogr. 2, 151 (1949). LACOMBE, P., and A. BERCIIEZAN: C. R. Acad. Sci., Paris 228, 93 (1949). 2 RATHENAU, G.W., and G. BAAS: Physica, Ilaag 17, 117 (1951). a SMITIr, C. S.: Trans. Amer. Soc. Met. ('reprint 37 (1951). Approved For Release 1999/09/24: CIA-RDP83-00423R002000130008-7  CPYRGHT Approved For Release 1999/09/24: CIA-RDP83-00423ROO2000130008-7 2(i() G. W. ltArnrxAu, I. SMIT and A. L. STUYTS: Ferromagnetic properties. large grain within the matrix of small grains, while y, is the mean inter- facial energy between similarly oriented grains. D and d are the dia- meters of the crystal under consideration and that of the adjacent particles respectively. For the plate-like Ferroxdure particles the above-calculated ine- quality does not apply, but it is easily shown by energy considerations that a similar relation holds also in this case. Consider, therefore, a thin plate (thickness d, diameter D) where 0 is the angle of misfit with respect to the surrounding, perfectly oriented, crystals of mean thick- ness d. The misfitting particle will disappear if the total surface energy is reduced by the absorption. This leads for D to the approximate relation card 3yd?y? for growing, and if it is smaller then the particle will disappear. Here yd, and y? have the same significance as above. ,d, will strongly increase with 0. In conclusion, it may thus be expected from this analysis that in the course of the sintering process misoriented crystals with about the same dimensions will be absorbed by the matrix. Lindharen (.Vc:derland), Philips' Research Laboratories, N. 1'. Philips' C iloeilampenfabrieken. Approved For Release 1999/09/24: CIA-RDP83-00423ROO2000130008-7