THEORY OF NOISE IN A MULTIDIMENSIONAL SEMICONDUCTOR WITH A P-N JUNCTION

Declassified in Part - Sanitized Copy Approved for Release ? 50-Yr 2014/01/16: CIA-RDP81-01043R002800140012-9 NAVORD REPORT 5762 STAT THEORY OF NOISE IN A MULTIDIMENSIONAL SEMICONDUCTOR WITH A P ? N JUNCTION =1' ttiT OF N "re 'LINA ?N\NmisprOb. 24 JUNE 1957 U. S. NAVAL ORDNANCE LABORATORY WHITE OAK, MARYLAND Declassified in Part - Sanitized Copy Approved for Release 50-Yr 2014/01/16: CIA-RDP81-01043R002800140012-9 STAT Declassified in Part - Sanitized Copy Approved for Release ? 50-Yr 2014/01/16: CIA-RDP81-01043R002800140012-9 a NAVORD Report 5762 THEORY OF NOISE IN A MULTIDIMENSIONAL SEMICONDUCTOR WITH A P-N JUNCTION ABSTRACT: This thesis discusses the fluctuations of noise in a two and three dimensional semiconductor containing a p-n junction. We consider a rectangular parallelepiped single crystal. It is bisected in the longest dimension by a p-n junction. Since this dimension is several diffusion lengths it can be considered infinite. In the transverse plane we investigate the case where both dimensions are finite, and then the case where one is finite and the other infinite. In the p-n junction the noise is the result of fluctuations in the minority carrier density. In a p-n junction there are two classes of minority carriers: 1. holes in the n-type material, 2. electrons in the p-type material. Since both hole and electron density fluctuations are similar, we discuss only the former in detail. We investigate the differential equations for a two and three dimensional semiconductor with a p-n junction and find the inhomogeneous form of these equations. These equations are solved with the help of the scalar and tensor Green's function. The noise problem is solved by using these equations as Langevin equations and interpreting the dis- tributed sources as random forces. Then the noise current spectrum is determined with stochastic process theory after deriving the sources from basic physical models and the theory of stationary, ergodic, Markovian processes. We U. S. NAVAL ORDNANCE LABORATORY WHITE OAK, MARYLAND Declassified in Part - Sanitized Copy Approved for Release @ 50-Yr 2014/01/16: CIA-RDP81-01043R002800140012-9 Declassified in Part - Sanitized Copy Approved for Release ? 50-Yr 2014/01/16: CIA-RDP81-01043R002800140012-9 NAVORD Report 5762 consider two cases of surface recombination velocity on the transverse surfaces: infinite s and finite s. For the infinite case, we get the exact solution which provides an upper bound for the noise spectrum for large s. For an arbitrary s we get a solution but have confidence in the solution for only small s. Therefore we have obtained a complete solution for the two cases of practical interest: large and small surface recombination velocity. These cases should prove of interest in the analysis of noise phenomena in semiconductors. ii a Si Declassified in Part - Sanitized Copy Approved for Release ? 50-Yr 2014/01/16 ? CIA-RDP81-01043R002800140012 q iii STAT Declassified in Part - Sanitized Copy Approved for Release ? 50-Yr 2014/01/16: CIA-RDP81-01043R002800140012-9 iv ri NAVORD Report 5762 CONTENTS CHAPTER Page I. INTRODUCTION 1 II. PROBLEM AND METHOD OF SOLUTION 3 III. THREE-DIMENSIONAL NOISE SOURCES FOR A p-n JUNCTION 7 IV. SCALAR INHOMOGENEOUS SEMICONDUCTOR EQUATION AND GREEN'S FUNCTION 22 V. TENSOR GREEN'S FUNCTION FOR THE SEMI- CONDUCTOR WITH A p-n JUNCTION .??? OOOO 33 VI. NOISE CURRENT SPECTRUM IN THE p-n JUNCTION WITH INFINITE SURFACE RECOMBINATION VELOCITY 46 VII. NOISE IN A p-n JUNCTION WITH ARBITRARY SURFACE RECOMBINATION VELOCITY 62 VIII. CURRENT SPECTRUM IN A TWO-DIMENSIONAL SEMICONDUCTOR WITH A p-n JUNCTION 75 IX. SUMMARY AND CONCLUSIONS 81 APPENDIX A. DISCUSSION OF GREENS FUNCTIONS 85 B. EXCESS CHARGE DENSITY AND p-n JUNCTION INPUT ADMITTANCE 90 BIBLIOGRAPHY 96 Declassified in Part - Sanitized Copy Approved for Release ? 50-Yr 2014/01/16: CIA-RDP81-01043R002800140012-9 STAT Declassified in Part - Sanitized Copy Approved for Release ? 50-Yr 2014/01/16: CIA-RDP81-01043R002800140012-9 ? RAVORD Report 5762 CHAPTER I INTRODUCTION Semiconductor noise studies give useful information about the basic pnysical micros- copic processes in semiconductors and in the solid state. Furthermore, noise becomes very inportant when a semiconductor device such as a transistor is used with signal levels com- parable to the noise. A semiconductor crystal which is p-type at one end and n-type at the other has a transitiop zone whlch is called a p-n junction (Shockley"-, Kittel). Current is carried across the;pnction by minority carriers; that is, electrons in the p-type region and holes in the n-type mion. Petritz3,t has shown that noise in a p-n junction arises from fluctuations in the concentration of minority carriers. Consid- ering a p-n junction as an ideal one dimen- sional structure, he has derived expressions for this noise. Van der Ziel2 has extended the solution to the one-dimensional p-n-p transistor structure. In both studies the effects of surfaces were considered in an ap- proximate manner. However, surface conditions have been found to influence markedly the performance p-n junction diodes and transistors (Kingston u). Considerable theoretical work has been done to understand the signal properties (voltage,. cur- rent, -frequency relations) of p-n junction devices, consiaered as three-ditgensional struct- ures (Shockley(, Van Roosbroecku). ' It is the Declassified in Part - Sanitized Copy Approved for Release ? 50-Yr 2014/01/16: CIA-RDP81-01043R002800140012-9 1 Declassified in Part - Sanitized Copy Approved for Release ? 50-Yr 2014/01/16: CIA-RDP81-01043R002800140012-9 NAVORD Report 5762 purpose of this thesis to develop a theory of noise which considers the p-n junction as a three dimensional system, and which treats the effects of surfaces in an exact manner. A second objective ofthe thesis is to test and extend a powerful method developed by Petritz304 for studying complicated random processes. This aspect of the work is of inter- bst in the general theory of random processes. 2 ? NAVORD Report 5762 CHAPTER II PROBLEM AND METHOD OF SOLUTION 2.1 Introduction We assume that semiconductor noise is a stationary, ergodic and Markovian random process.3 Considering the local hole density, pt(xly,z,t), as a random variable, this is a three-fold infin- ite random process. In order to solve such a complicated problem, we have generalized a method used originally by Petritz.3 This method employs the Kolmogorov,-Fokker-Planck (KFP) and the Langevin techniques to describe the noise (Fe..- lex', Chandrasekhar101 Uhlenbeck and Ornstein-'l, Wang and Uhlenbeck12). 2.2 The Kolmogorov-Fokker-Planck Equation Approach The KFP equations12 for the three dimensional semiconductor are given by- P (r) 111(111 = ? P (Tn.l-t91m(r),t)E (TnIT9i c(r)) lc,ic *To. t p(rns(r)lk(r),t) QNMI-rn(r)) x;x*Tri P(mo/m1t) is the conditional probability of finding the random variable with a value m after the time t, if at zero time the random variable had a value mo. The random variable is the hole density in the n-type semiconductor. The symbol r represents r(xly,z)la function of the three rectangular coordinates. q is a transition probability and is defined) by the equation, gm at.) = Q(xl-m) At t Graer (0)t . (2) got (1) Declassified in Part - Sanitized Copy Approved for Release ? 50-Yr 2014/01/16: CIA-RDP81-01043R002800140012-9 3 1 Declassified in Part - Sanitized Copy Approved for Release ? 50-Yr 2014/01/16: CIA-RDP81-01043R002800140012-9 NAVORD Report 5762 Q describes how the system changes in an infin- itesimal interval of time, At, and characterizes the stochastic process. For the semiconductor problem, Q is independent of time and the pro- cess is stationary. Q is non-zero and less than unity and the process is ergodic. The interpretation of equation (1) is that the rate at which the conditional probability P(m0/m1t) changes with time results from transi- tions away from and to the desired state. Equa- tion (1) is subject to the boundary condition 13(m.1171,0)=- , (3) where 8?.,is the Kronecker delta. SinCe a random process is characterized by transition probabilities, we list them for the p-n junction: rn(r)-1) Gli-m(r)1,rn(r)+ ((Nn (r)lin(r) =n1 (r) , -m(r) = bulk recombination; (4) bulk emission; (5) bulk diffusion (6) decrease; bulk diffusion increase. At the transverse surfaces, the surface tion probabilities are Qs(rn Vs) -1.11 = mc.r,V-cs , Qs(in (r,11-rnK + 9 is evaluated by multiplying Eq. (42) by 111 and summing; the result is IN1z)e. (t(N> + (N) ? 2045. + at (62) When the time of observation of N goes to infiri- ity, since 1112.)= ova> - clot = (63) At civ), Declassified in Part - Sanitized Copy Approved for Release ? 50-Yr 2014/01/16 ? CIA-RDP81-01043R002800140012-9 17 (65) Declassified in Part - Sanitized Copy Approved for Release ? 50-Yr 2014/01/16: CIA-RDP81-01043R002800140012-9 NAVORD'Report 5762 where 4pt(r)? is given by Eq. (B11). This i6 the desired noise source for bulk recombination. .3.9 The Diffusion Noise Source Solving Eqs. (13) and (14) for p, letting 8r be zero and using the model for the diffusion noise source, Section (3.7), we get 3 ?Az? arr_. D = a t -33 (66) where xi is x, y, or z. We assume that diffusion in the three directions is statistically inde- pendent. Equation (66) becomes a set of three: 9?T ?Dr (67) ST, (67) where u stands for x, y or z. To write equation (66) in the Langevin form, the spacial term is transformed to contain a time constant. We write the second derivative for the finite but small cube and use the densi- ties p(0)= 0 % ? ,p(--1',2--)=p? (68) In this differentiation the diffusing 'direction is u and the length of the cube in this direction is Au. The second derivative is and equation (67) becomes 51) 18 (69) (7o) NAVORD Report 5762 where rt-D11,_ eu.272D (71) With these time constants the transition probabilities for the u direction are Q.Du.(N1)11413-1)=NDirt Du. loss by diffusion; (72) Qt.u(K+1)?=41%1?keDu., gain by diffusion. (73) Here ND is the total number of holes in the cube with dimensions Ax, Ay, Az and with the diffu- sion boundary conditions: Sp cist = bas IDA . (74) Using the techniques of the previous sec- tion, the noise source for diffusion in the u direction is vi(I$D,11z) = 11(414 pt(r)>/ (75) 3.10 The Surface Recombination Noise Source With the model for the surface recombina- tion noise source, Section 3.7, the Langevin equation (10) becomes -0 - te ' The pig is evaluated at the semiconductor boundary and the ifs is the current flowing in (76) 19 Declassified in Part - Sanitized Copy Approved for Release ? 50-Yr 2014/01/16: CIA-RDP81-01043R002800140012-9 Declassified in Part - Sanitized Copy Approved for Release ? 50-Yr 2014/01/16: CIA-RDP81-01043R002800140012-9 NAVORD Report 5762 the direction normal to the surface i. These surface recombination time constants define the transition probabilities: Q$0$111e-1)=. Ns/51 by recombination at the surface; CI (14 Ntis= > [(De) +I. w/1DJ , and identity for large positive integers m and Agr the (4- -11- Y1L .NYI VI (188) the series in Eq. (B28) becomes b.\JA K . (189) b cm Declassified in Part - Sanitized Copy Approved for Release ? 50-Yr 2014/01/16: CIA-RDP81-01043R002800140012-9 57 Declassified in Part - Sanitized Copy Approved for Release NAVORD Report 5762 As m and n individually go to infinity the terms go to zero because (Cie.tror (fien)z' goes to zero. The value of the input admittance is finite except when AGI, is 17121 when it is ,infinite. When szco the surface of the semi- conductor seems to be covered with a perfectly conducting layer which short-circuits the semi- conductor. Therefore the Nyquist noise current spectrum becomes infinite when the surface recombination velocity is infinite. A convergent expression for the case of arbitrary s can be written down directly from the Nyquist Law, Eq. (180) and the real part of the admittance, Eq. (B31). This is discussed further in Chapter VII for the case of arbitrary s. Now we examine this expression for the case of large but finite s. From the boundary conditions, Eqs. (96) and (97), = .541./D =R:zx tdne. (190) When V is large we can write 4a( as 7 (191) Y where r is odd. Substituting Eq. (B31) into (180), letting f be large and the dc voltage at x=0 be zero, we get for the range of small Er, W(IVA = 9-127AD?"-A x]rt cos (m7r4/25i) cos (nirp;isc) 14 (192) 071r/X/ tti,n -t -1 onrrz I [1 Sir Di5C).) M r DA I (i+ T- n:ir 14 t D/SC) X ift (D r/34 Ctrn 1r/Z01 -D/5 Of+ Eirrizc )(1--D/sort+ id1/414 (Dtylf unip-A9/(!-1)/s8)t + [ (Pi 1ttzc)(1-D/5c)J2 19. 58 50-Yr 2014/01/16: CIA-RDP81-01043R002800140012-9 NAVORD Report 5762 If we let sb/D and sc/b become very large while (,,and en remain small, Eq. (192) becomes identical with the Nyquist current spectrum with Eq. (179); to make the two equations agree the conversion factors between Figures 2 and 3 are used: 13-zb; C=2c, (193) 6.7 Convergence of the Series for the Excess Noise Spectrum To discuss the convergence of the excess noise spectrum, we investigate Eq. (181). In the denominator of this equation there are two factors which contain minus signs, one in m and one in n. Taking the factor in m (identical results are obtained with n) the indices m, m: and m" are related so that Imtmlvel must be odd. For the whole factor to be zero ( - le1)1(a nine' (19)) Solving we get 771?t77';_trn"--r-o. (195) Since zero is an even number, the factors cannot vanish. Furthermore the factor in m is nega- tive whenever m