The thermodynamics of the phonon drag in ionic semiconductors

Georgescu,

Physica

L.

35

107-l 13

1967

THE THERMODYNAMICS

OF THE PHONON

DRAG IN

IONIC SEMICONDUCTORS by L. GEORGESCU Faculty

of Physics,

University

of Bucharest laboratory

Bucharest,

of molecular physics,

Rumania

Synopsis Acoustical

and optical

of the thermodynamic are considered into account

phonon principles

as charge carriers. the contribution

drag in ionic semiconductors of irreversible The expression

of acoustical

processes.

are studied on the basis The

of thermoelectric

and optical

phonon

electrons

and holes

coefficients,

taking

drag, is given.

In a metal or semiconductor, the normal vibrations of the lattice are replaced by a system of quasiparticles, phonons, a system generally considered as being in thermodynamic equilibrium. In the phenomena of transport, the displacement of the phononic system from the state of equilibrium, gives birth to the acousticall) 2) a) and opticala) phonon drag. In studying the phonon drag in the phenomena of transport, only the contribution of acoustical phonons was considered, both in the case of semiconductors5) and of metals6) 7). The thermoelectric phenomena were thoroughly studied from the thermodynamic point of view, starting with Callena). The thermoelectric coefficients are functions of the phenomenological coefficients; both the interaction mechanisms of the charge carriers and the type of semiconductor, degenerated or non-degenerated, are included in the phenomenological coefficients. Thus very general relations between the thermodynamic flows and forces are obtained. A certain charge carrier scattering mechanism, intended for the particular study of some special processes in solid bodies, can be demonstrated also phenomenologically. On this line, Prices) had worked out thermodynamically the acoustical phonon drag with semiconductors, the terms related to the phonon drag being expressed in terms of supplementary coefficients in the expression of the current density and of the flow of energy. Based on the thermodynamic principles of irreversible processes la) rr), the author tries to emphasize phenomenologically the possibility of acoustical and optical phonon drag existence, by explicitly considering two scatter-

107 -

108

L. GEORGESCU

ing mechanisms: the scattering of charge carriers by acoustical and optical phonons. The considered thermodynamical system is an ionic type semiconductor, having electrons in the conductive and holes in the valence bands. The concentration of charge carriers is assumed to be low in order to be able to write linear relations between the thermodynamical flows and forces. Generally, we may consider the ionic semiconductor with n types of charge carriers, and with an ek (k = 1, 2, . . ., n) electric charge per unit of mass to be subjected to a temperature gradient (VT # 0), to a gradient of chemical potential (0,~ f 0), and to the action of an electric field (E # 0). The magnetic field is zero (H = 0) ; chemical reactions within the system are excluded. The whole system is divided into two subsystems: the charge carrier subsystems (electrons and holes), and the phonon subsystem (acoustical and optical phonons). The local temperature of the two subsystems is considered to be the same (Tcarriers = TDhonoIls= T). The temperature gradient is the only thermodynamic force acting on the phononic system. The production entropy for the whole system (charge carriers and phonons) appears as 12) :

or an analogous

form: To = -Jb*VT

-

5

Jk*[vpk

- e&E]

k=l

were Jq is the total flow of heat (of the charge carriers plus phonons), Jh is the total flow of entropy (of the charge carriers plus phonons), Jk is the flow of material of the component K. Flow Jq and Jh are related:

J; = Jp -

I: ,LLk’Jk

(3)

k

being the chemical potential of the component k. The following phenomenological equations result from the expression the production entropy (1) :

pk

of

the thermodynamic forces appearing as Xi = -ezVp, - TV(pJT) (9’ is electric potential), X,, = -(VT/T) (independent from the index i), since we considered the temperature of the two subsystems as being equal). The

THERMODYNAMICS

phenomenological

OF THE PHONON

are

coefficients

DRAG

IN IONIC

second

109

SEMICONDUCTORS

degree

tensors

(Lkg = L$fl),

a, p = 1, 2, 3). In order to simplify the calculation, the semiconductors are considered to be cubically symmetric; thus only the components Lit;sl’ = Li:r2’ = L&3) of the tensor Lk B, are different from zero. The magnetic field of the system being zero, the Onsager reciprocity relations would read:

The total

current

and the total flow of heat are defined by the

density

relations :

I =

Jp = C Jqk.

c edk,

(7)

k

k

In the system under consideration, only the electrons and holes (ei f 0, e.2 # 0) participate to the total electrical current, the acoustical and optical phonons having no charge (es = e4 = 0). Similarly, the chemical potential of the phonons is zero (,~a = ,u4 = 0). By replacing in (4) the expression of thermodynamic forces, and considering relation (7), the total electrical current expression results as:

The coefficient of electrical conductivity ez(Li:’ + L&j,‘,‘)is not affected by the phonon drag, as it is determined exclusively by the charge carriers. In the stationary state with zero electrical current (I = 0) one finds from (8) for the coefficient of thermoelectric force a, the expression: 1 a=

x ek[L$’ -

the identity

(9)

ez(Lii) + L&i))

T (considering

Lii’,&!&]

i,k

__.

ag = x aioi and the fact that the electrons

and

holes form two independent subsystems; the Lrs type coefficients being null), From expression (9), the explicit form of the coefficient of thermoelectric force is : a=---*

1

Ly$ + Lg

eT

+ Lg) -

Lgu -

L’,1,’ + L&j -

Lg

+ Lg

+ L&’ + L&).&C + Lgp Ljl,’ + Lg

with the notations: electrons

ei = -e,

~1 = p

holes es = e, -_ruz = ,u -I- &G (EG width of forbidden

1 (10) (11)

band).

110

L.

GEORGESCU

From expression (lo), the effect of the electrons and of the phonon drag on the coefficient of thermoelectric force al and the effect of the holes and of the phonon drag on the coefficient of the thermoelectric force as, can be written separately : 1 cc1 -

or in a condensed

y

[

L’?’ L$2,’ + $kj eL$’

+ 2i!!i!

11

-

11

f

1

(12)

form: al=ae m2 =

where me, CY~are the coefficients charge carriers.

ah

+

ae,p

(14)

+

ah, p

(15)

of the thermoelectric

Coefficients CL~, p and Q,,p represent the coefficients force due to the acoustical and optical phonon drag:

force

due to the

of the thermoelectric

Relations (14) and (15) s h ow that the coefficient of the thermoelectric force is made up of the combined effect of the charge carriers and of the acoustical and optical phonons. In order to determine the form of the Peltier coefficient and of the coefficient of thermal conductivity, taking into consideration also the acoustical and optical phonon drag, it is necessary to determine the total flow of entropy. To this end, the expression of the flow of entropy, knowing the production entropy can be calculated directly. The relationship between the phenomenological coefficients in going over from the new forces to the old thermodynamic forces is as follows: q;’

= L$?

_q

zzzLz;’ + _&&Ji

Lit’ = Lp

+ (L$’ + LB;‘) #uk-

(18) LgugQ.

The same result is obtained if we calculate initially the total flow of heat in (5), the flow of entropy resulting from relation (3). Irrespective of the selected approach the following, generally known relation is obtained:

J& = ITI - AVT.

THERMODYNAMICS

OF THE PHONON

DRAG

IN IONIC

111

SEMICONDUCTORS

The contributions of phonon drag are also included coefficients 17 and A. Thus, the Peltier coefficient is:

in the thermoelectric

the Onsager relation Ta = --17 being fulfilled, if we compare relations (10) and (19). If the contribution of the carriers (both electrons and holes) to the coefficient of thermic conductivity, omitting the contribution of the phonon drag, is noted with A,, h, then:

1 WY and the total coefficient

of thermal

conductivity

will be

1=&,h+aL+~p

(21)

where AL is the coefficient of thermal conductivity due to the system of acoustical and optical phonons, while A, is the coefficient of thermal conductivity due to the acoustical and optical phonon drag. It can be expressed by: 2

Ap = 7’

Lg’ - Lg.’ Li1,’ + Li’,’ ‘[(Lg) + L’,2d)-

(Lpi + L~~~)l +

ccc% P In expression

(22) second degree drag factors

-

cLh, P).

(22)

have been neglected.

Conclzcsions. The contribution of acoustical and optical phonon drag in an ionic semiconductor has been emphasized based on the thermodynamic principles of irreversible processes. From a phenomenological point of view, the contribution of optical phonon drag is as effective as the contribution of acoustical phonon drag. The optical phonon drag is generally neglected in the literature as against the similar acoustical phonon drag. This could be acceptable at low temperatures, where the acoustical phonon drag is predominant, while the optical phonon drag is neglectable under such

112

L. GEORGESCU

circumstances. However, it would be quite wrong to conclude that the contribution of optical phonons to the phonon drag is negligible also at high temperatures. This is due to the fact, that there is a clear difference between acoustical and optical phonons. Acoustical phonons can be excited (that is moved out from the state of equilibrium) at low temperatures, under the influence of a strong interaction between carriers and acoustical phonons. Optical phonons can be excited at high temperatures, where they interact strongly with charge carriers, thereby contributing to the phonon drag 4). These general considerations substantiate the presence of terms characterising both the optical and the acoustical phonon drag in thermoelectrical coefficients. However, no conclusion can be reached phenomenologically with regard to the temperature range in which either of these phonon drags becomes predominant. The expression of the coefficient of thermoelectric force, due to the acoustical phonon drag (similar to relation (17)), can be derived on a variational basisis), for instance, and will be:

where m* is the effective mass of carriers, v the average velocity of sound, 76 carrier relaxion time, (1; phonon mean free path. For acoustical phonons, the dependence of mean free path A; upon temperature and upon the wave vector of phonons q is knowni4) : 4

-

Tn-5

.q-n

being a function of the symmetry of the crystal). Basically, the same reasoning could be made also for optical phonons ; however, the relationship between A, and temperature or wave vector in case of functional optical phonons, is not known. By analogy, a relationship similar to the one applying to acoustical phonons could be considered. In this case, the contribution of the optical phonon drag to the thermoelectric coefficients could be of the same order of magnitude as the contribution of the carriers, within a given temperature range4). As to the coefficient of thermal conductivity, we may assume on the basis of the same considerations, that the contribution of the optical phonon drag will be predominant at high temperatures and could be of the same order of magnitude as the carrier contribution, while negligible at low temperatures. A number of experimental results obtained in measurements of the coefficient of thermoelectric force at high temperaturesib) is) could be explained by considering the optical phonon drag. (PZ

Received

15-0-66

THERMODYNAMICS

OF THE

PHONON

DRAG

IN IONIC

113

SEMICONDUCTORS

REFERENCES Gurevich,

E. L., J. of Phys.

(Soviet

Union)

2 (1945)

1) 4

Herring,

3)

Appel,

4) 5)

Plivitu, C. N., Phys. Stat. Sol. 12 (1965) 265. Ter Haar, D. A. and Neaves, A., Phil. Msg. Suppl.

6)

Hanna,

7)

Ter

C., Phys.

96 (1954)

J., 2. Naturforsch.

12a

D. A. and Neaves,

H. B., Phys.

Rev.

410;

13a

(1958)

E. H., Proc. roy. A., Proc.

73 (1948)

P. I., Phil. Mag. 46 (1955)

477;

1U (1946) 67.

1163.

(1957)

I. I. and Sondheimer,

Haar,

8) Callen, 9) Price,

Rev.

386. 5 (1956)

Sot. A239

roy. Sot. A228

241. (1957) 247.

(1955)

568.

1349.

1252.

I., Etude thermodynamique des ph6nomenes irreversibles (Liege, 1947). 10) Prigogine, North Holland Publishing 11) de Groo t, S. R. and Masur, P., Non Equilibrium Thermodynamics, Company (Amsterdam, 1962). S. R., Mazur, P. and Tolhoek, H. A., Physica 19 (1953) 549. 12) de Groat, J. M., Electrons and Phonons, Oxford at the Clarendon Press (1960). 13) Ziman, 14)

Herring,

15)

Miller,

C., Phys.

16)

de Vroomen,

E., Komarek,

Rev.

95 (1954)

954.

K. and Cadoff,

A. R., van

Baarle,

I., J. appl. Phys. 32 (1961) 2457.

C. and Cuelenaere,

A. J., Physica

26 (1960)

19.