Lecture Notes in
Physics
Edited by H. Araki, Kyoto, .I. Ehlers, MiJnchen, K. Hepp, Z~irich R. Kippenhahn, M(Jnchen, H...
24 downloads
416 Views
6MB Size
Report
This content was uploaded by our users and we assume good faith they have the permission to share this book. If you own the copyright to this book and it is wrongfully on our website, we offer a simple DMCA procedure to remove your content from our site. Start by pressing the button below!
Report copyright / DMCA form
Lecture Notes in
Physics
Edited by H. Araki, Kyoto, .I. Ehlers, MiJnchen, K. Hepp, Z~irich R. Kippenhahn, M(Jnchen, H. A. Weidenm~iller, Heidelberg and J. Zittartz, K61n
207 S.W. Koch
Dynamics of First-Order Phase Transitions in Equilibrium and Nonequilibrium Systems
Springer-Verlag Berlin Heidelberg New York Tokyo 1984
Author Stephan W. Koch Institut ffJr Theoretische Physik, Universit~t Frankfurt Robert-Mayer-Stra6e 8-10, D-6000 Frankfurt/Main 1
ISBN 3-540-13379-8 Springer-Verlag Berlin Heidelberg New York Tokyo ISBN 0-38?-13379-8 Springer-Verlag New York Heidelberg Berlin Tokyo This work is subject to copyright.All rights are reserved,whetherthe whole or partof the material is concerned,specificallythose of translati(~n,reprinting,re-useof illustrations,broadcasting, reproduction by photocopyingmachineor similar means,and storage in data banks. Under § 54 of the GermanCopyright Law where copies are madefor other than private use, a fee is payableto "VerwertungsgesellschaftWort", Munich. © by Springer-VerlagBerlin Heidelberg 1984 Printed in Germany Printing and binding: Beltz Offsetdruck, Hemsbach/Bergstr. 2153/3140-543210
Contents I)
II)
Introduction
Survey
I)
Basic
Features
2)
Phase
Transitions
3)
Scope
of
Equilibrium I)
2)
III)
and
this
Phase
Dimensional
Transitions Systems
.........
2 8
......................................
...............................
Separation
............................
Nucleation
b)
Phase
c)
Spinodal
d)
Spinodal Decomposition as G e n e r a l i z e d Nucleation Theory ...................................
Phase
Theory
Separation
................................... in B i n a r y
Decomposition
Transitions
in T h i n
Mixtures
Films
Phase
a)
The
Solid-Liquid
The
Commensurate-Incommensurate
Transitions
Systems
.....
.........................
b)
Phase
.................
in One-Component
Transition
................... Transition
..........
............................
The Plasma Phase Transition in Highly Excited Semiconductors ..........................................
b)
I
............
a)
a)
2)
in L o w
Transitions
of P h a s e
Nonequilibrium I)
First-Order
Book
Phase
Dynamics
of
.....................................
10
16 16 18 24 32 45 47 48 62
74
74
Electron-Hole Droplet Nucleation in I n d i r e c t - G a p Semiconductors ......................................
77
The Plasma Phase Transition in D i r e c t - G a p Semiconductors ......................................
86
Optical
Nonequilibrium
Systems
...........................
a)
First-Order Nonequilibrium Phase Transitions in L a s e r s . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . .
b)
O p t i c a l B i s t a b i l i t y o f T w o - L e v e l A t o m s in a Resonator ..........................................
c)
Deterministic
d)
Dispersive
e)
Optical
Chaos
in B i s t a b l e
Bistability
Bistability
due
Systems
in S e m i c o n d u c t o r to
Induced
94
95 98
.............
108
Etalons
.....
114
.......
129
Absorption
I: I n t r o d u c t i o n and Survey
The topic of this book + is the theoretical d e s c r i p t i o n of d y n a m i c a l aspects of d i s c o n t i n u o u s phase t r a n s i t i o n s
in p h y s i c a l
systems.
It in-
cludes effects like the d e v e l o p m e n t of phase s e p a r a t i o n - i.e. nucleation and spinodal d e c o m p o s i t i o n - , freezing and melting,
as well as
phase t r a n s i t i o n s in systems w h i c h are far from thermal equilibrium. Examples are the f o r m a t i o n of e l e c t r o n - h o l e d r o p l e t s in highly laser excited s e m i c o n d u c t o r s and transitions b e t w e e n d i f f e r e n t n o n e q u i l i b r i u m states in optical systems like optical bistability.
The usual m e t h o d s to d e s c r i b e these phase t r a n s i t i o n s is to treat only a few r e l e v a n t v a r i a b l e s explicitly.
In such a m a c r o s c o p i c theory these
r e l e v a n t v a r i a b l e s assume the role of order parameters. r e l e v a n t v a r i a b l e s lead to nonlinearities,
The other,
d i s s i p a t i v e effects,
noise c o n t r i b u t i o n s in the equations of the order parameters.
non-
and to
Hence,
it
is m o s t a p p r o p r i a t e to treat these p r o c e s s e s w i t h i n a p r o b a b i l i s t i c formalism.
In this way one is able to i n v e s t i g a t e the d y n a m i c a l evolu-
tion of a system after changing the e x t e r n a l control parameters.
If dis-
c o n t i n u o u s phase t r a n s i t i o n s take place the i n i t i a l l y stable states d e c a y through b u i l d - u p and growth of h e t e r o p h a s e fluctuations.
The pro-
babilistic f o r m a l i s m is well suited to d e s c r i b e these stochastic processes.
It is one of the intentions of this book to p o i n t out some common aspects of the seem±ngly quite d i f f e r e n t physical p r o b l e m s p r e s e n t e d in the v a r i o u s chapters.
Especially,
c o n n e c t i o n s will be e s t a b l i s h e d bet-
w e e n the d i s c u s s e d n o n e q u i l i b r i u m t r a n s i t i o n s and phase t r a n s i t i o n s in the v i c i n i t y of thermal equilibrium.
However,
one may not expect a uni-
fied theory on the level of the theory of critical p h e n o m e n a for continuous phase transitions,
This theory u t i l i z e s the o c c u r e n c e of fluc-
tuations on all length scales leading to u n i v e r s a l behaviour.
Such fluc-
tuations do not occur in c o n n e c t i o n w i t h d i s c o n t i n u o u s phase transitions. On the contrary,
a w e l l - d e f i n e d length scale is set by the spatial ex-
tension of the h e t e r o p h a s e f l u c t u a t i o n s driving the r e s p e c t i v e transition.
E s p e c i a l l y these h e t e r o p h a s e f l u c t u a t i o n s and their c o n s e q u e n c e s
are a c o n t i n u o u s theme of this book.
+This book is based on the h a b i l i t a t i o n thesis of the author, w h i c h has been a c c e p t e d in D e c e m b e r 1983 by the Physics D e p a r t m e n t of the U n i v e r sity Frankfurt, Fed. Rep. Germany.
I.I Basic F e a t u r e s of F i r s t - O r d e r Phase T r a n s i t i o n s
The b a s i c features of f i r s t - o r d e r e q u i l i b r i u m phase transitions are d i s c u s s e d m o s t easily in the framework of the Van der Waals theory for the liquid-gas transition.
Historically,
this theory is the first
successful d e s c r i p t i o n of a d i s c o n t i n u o u s phase transformation. dates back to the year 1873 when V a n der W a a l s in his thesis
It
[I] pro-
posed the famous state e q u a t i o n for a c l a s s i c a l liquid-gas system:
(p + ~ ) ( V - b ) = R T
Here, V is the m o l e c u l a r volume,
(I.I)
p is the pressure,
ture, and a and b are m a t e r i a l parameters.
T is the tempera-
The p r e s s u r e c o r r e c t i o n
term a/V 2 is a c o n s e q u e n c e of the attractive part of the i n t e r m o l e c u l a r i n t e r a c t i o n potential. part, Fig.1
The co-volume b takes into account the repulsive
shows e x a m p l e s for the isotherms r e s u l t i n g from the Van der
W a a l s equation.
IT! c
L , A B
Fig.
I :
I C
l O
I E
T Tc.~ V
Isotherms of a Van der Waals system
The function p(V) IT=const d e f i n e d by Eq.(I.1) ty. Therefore,
one has m u l t i p l e
(schematically)
shows a cubic n o n l i n e a r i -
solutions for TT c the isotherms
w h i c h are also d e s c r i b e d by the ideal gas
state equation. For T~T c the isotherms m a y be s u b - d e v i d e d into parts c o r r e s p o n d i n g to d i f f e r e n t states of the system
(see Fig.l).
For VE the system
is in the h o m o g e n e o u s gas state. The actual values of A and E, i.e. of V f l u i d and Vgas , are d e t e r m i n e d w i t h the help of the s o - c a l l e d M a x w e l l construction.
This c o n s t r u c t i o n is a c o n s e q u e n c e of the condition,
that in h o m o g e n e o u s systems the
chemical
potentials
~ for c o e x i s t i n g
phases have to be equal ~fluid = Pgas The i n c r e a s i n g part of the i s o t h e r m
(region B-D in Fig.l)
describes
states of the h o m o g e n e o u s system that are m e c h a n i c a l l y u n s t a b l e
>0
.
T On t h e
other
hand,
the
states
belonging
m e c h a n i c a l l y stable. Nevertheless,
to
the
regions
A-B and
D-N a r e
they are no t h e r m o d y n a m i c equilibri-
um states because they do not have the lowest free energy. However, due to their m e c h a n i c a l
stability they have a finite lifetime and may
v e r y well be o b s e r v e d experimentally.
The states of regions A-B and
D-E are called o v e r - h e a t e d fluid phase and o v e r - s a t u r a t e d v a p o r phase, respectively. F r o m the p-V d i a g r a m
(Fig.l) one may c o n s t r u c t the binodal line in a
T-V d i a g r a m by connecting the points of liquid-gas e q u i l i b r i u m .
l
Tc
~pbin
vc Fig.
line
odol line inodQI
2 : Phase d i a g r a m of a Van der Waals
v system
(schematically).
The binodal line is also known as phase s e p a r a t i o n line,
since it se-
parates the h o m o g e n e o u s gas and liquid states. For p a r a m e t e r s w i t h i n
the binodal existence.
line the e q u i l i b r i u m system shows spatial two-phase coThe dashed line in this
c o e x i s t e n c e region
been c o n s t r u c t e d from the p-V d i a g r a m for the c o n d i t i o n
(see Fig.2)
~p/~V T=0. For
this curve, V a n der Waals i n t r o d u c e d the name "spinodal line" In the region b e t w e e n binodal and spinodal, An a m e t a s t a b l e
state. At this point,
has
[2] .
the h o m o g e n e o u s system is
it is important to mention,
that
such a strict d i s t i n c t i o n between m e t a s t a b i l i t y and i n s t a b i l i t y is a direct c o n s e q u e n c e of the e q u a t i o n of state y i e l d i n g isotherms of the form shown in Fig.1. Moreover,
a rigorous t r e a t m e n t of these effects
goes clearly beyond the framework of e q u i l i b r i u m thermodynamics.
The
c o r r e s p o n d i n g states are n o n e q u i l i b r i u m states w h i c h are c h a r a c t e r i z e d by a finite lifetime.
Physically,
this is a c o n s e q u e n c e of the charac-
t e r i s t i c fluctuations driving the system towards equilibrium.
The Van der Waals theory is a typical example of a m e a n - f i e l d theory. In Refs.
[3-6]
the r e s p e c t i v e authors show, that the state equation
(I.19 is an exact d e s c r i p t i o n for systems w i t h a p o t e n t i a l U acting on a m o l e c u l e at point r given by
[3,5]
~
r2
(II. I )
where Jn=gnfn-£n+ifn+1
(II.2)
The q u a n t i t y Jn is the net p r o b a b i l i t y current b e t w e e n clusters A n and An+ I. The gain rate is given by the current of m o n o m e r s t h r o u g h the cluster surface gn=b(T)nl (t)n(d-1)/d
Here, nl(t)
is the c o n c e n t r a t i o n of m o n o m e r s
(II.3)
in the vapour,
n (d-1)/d
is p r o p o r t i o n a l to the surface of a cluster in a s y s t e m with d dimensions. The loss rate is given in terms of the t h e r m i o n i c e m i s s i o n current through this surface: £n=a (T) n (d-1)/dex p (o (T)/n I/3) ,
(II. 4)
Here, the term e x p ( o ( T ) / n 1/3)
takes into account the s u r f a c e - t e n s i o n c o r r e c t i o n of the m o l e c u l a r work function in a cluster.
(More details are given in [21-27]
.)
The m a t h e m a t i c a l t r e a t m e n t may be s i m p l i f i e d c o n s i d e r a b l y by n e g l e c t i n g the discrete nature of the v a r i a b l e n. This c o n t i n u u m a p p r o x i m a t i o n replaces the d i f f e r e n c e - t e r m s In this way,
in the m a s t e r e q u a t i o n by differentials.
the s o - c a l l e d F o k k e r - P l a n c k a p p r o x i m a t i o n is obtained.
F o r m a l l y more correct w o u l d be a K r a m e r s - M o y a l e x p a n s i o n the m a s t e r equation.
[28-30]
The individual c o n t r i b u t i o n s are e x p a n d e d
of
20
according to
£n+ I fn+ 1=m~0 [~.w ~n~l £nfn Hence, the right-hand side of equation
(II.1)
is expressed in terms of
fn" The Fokker-Planck equation is obtained by neglecting derivatives of higher than second order. Generally,
a Fokker-Planck equation need not be a good approximation
of a master equation.
The Pawula theorem
[30]
states,
that the
Kramers-Moyal expansion either stops for m0 ,) [I, otherwise
and
(II.38)
The i n t r i n s i c a l l y stochastic dynamics of the MC m e t h o d is the reason why the sequence of g e n e r a t e d c o n f i g u r a t i o n s does not n e c e s s a r i l y correspond to the true physical time evolution.
One may h o w e v e r introduce
a MC analogue of time, w h i c h in the f o l l o w i n g Will be called T . It is measured, m e n t s of an atom,
e.g.,
'MC time'
in units of the number of a t t e m p t e d displace-
i.e., in units of M C S / A
(MC steps per atom). The re-
lation of the MC time • to the real p h y s i c a l time t is strongly dep e n d i n g on the p r o p e r t i e s of the s i m u l a t e d system. An almost linear conn e c t i o n between t and T should be e x p e c t e d only if the true physical d y n a m i c s is c o r r e c t l y
mimiked
K e e p i n g these r e s t r i c t i o n s
by
the M e t r o p o l i s dynamics.
in mind, one may discuss the MC dynamics of
phase s e p a r a t i o n in the kinetic Ising model. As a result,
these simula-
tions yield the atomic distributions on the available lattice sites.
31
Fig.lO presents some typical examples. been obtained for different times homogeneous equilibrium system
•
The shown distributions have after quenching an initially
(at T>Tc)
to Ti
+(Yi-YJ
)2
(ri-rj)2
Here, < ..... > denotes configurational placed by temporal averaging.
systems with an in-
by applying the
a%(ri_rj )
>
"
(II. 60)
a(ri-rj ) averaging,
which may be re-
f A
0.2
%
~, > - .
/
/////
o.o 0.0
Fig.28:
0
z/o
2.0
Number density versus normal distance z from the graphite surface. Results of m o l e c u l a r dynamics simulations for xenon on graphite. With increasing parallel pressure, PH , successively a second adsorption layer is formed. The constant temperature in the simulations is kBT/e=0.7 . (From Ref. 88,)
In the numerical the formation
simulations
for xenon on graphite
of a first and a second adsorption
[88]
one observes
layer , depending
o n the value of the applied pressure Pll . The results are summarized
59
in Fig.28. The two peaks in the density distribution function define the two layers at z=z m and z=2Zm, respectively.
They are separated by
a broad region with almost zero density. Thus, one may unambiguously separate the properties of both layers. With increasing pressure, more and more atoms are promoted into the second layer. However,
for the
investigated values of Pll one always observes a low density fluid state in this layer
(see Fig~29).
Piio2/e = 2.0 ~"
-,"
"~,
Piio2/e = 2.6 v-
-,
-
_.~-
Piio2/e = 2.2
Piio'2/e = 2.8
Piio2/e = 2.4
Piio2/e = 3.0
Fig.29: Trajectory pictures of the atoms in the second adsorption layer for the conditions shown in Fig.28. (From Ref. 88.) The liquid to solid transition takes place in the first adsorption layer. The temporal evolution of this phase change is shown in Fig.30. Again, the heterophase
fluctuations preceeding the phase transition
are visible in form of small crystallites within the liquid. The pertinent temporal variation of the density is completely analogous to
60
'-'-'.-:-'-4 &~:.'--:' ~r+ ,
•
2000
~:~:5:ii:i:{:~:{:~:i':!"
,.jy
•
========================
~
t
~ff=4000 ========================== t= ,oooo •,:.:: ::. ,: DUUU
,,'.-.-:.:,:.-..'.:.:,.,.
• ..,.-..,.,,
.,,.. ....
,,
_
t -
12000
Fig.30: T r a j e c t o r y pictures for the atoms in the first a d s o r p t i o n layer. The i n d i c a t e d times are in units of time steps of the m o l e c u l a r d y n a m i c s simulations (1 time step ~O.O5 ps). At t=0 the p r e s s u r e has b e e n increased from Pl ~ 2 / E = 2 . 5 to 2.6. At the lower pressure, the system was in the state of a homogeneous liquid, kBT/e=O.7. (From Ref. 88.)
that of the t w o - d i m e n s i o n a l
system
(see Fig.25).
The results of c o n s t a n t p r e s s u r e simulations for v a r i o u s t e m p e r a t u r e s are s u m m a r i z e d in Fig.31. constant density situation
They are c o m p a r e d to MD findings for a [89b]
. The constant p r e s s u r e results
clearly show d i s c o n t i n u o u s v a r i a t i o n of the density, w h i c h is indicative for a f i r s t - o r d e r transition.
Under c o n s t a n t d e n s i t y conditions,
the m e a n d e n s i t y of the first layer varies continuously,
because one
crosses the liquid - solid c o e x i s t e n c e region.
To summarize,
the d i s c u s s e d c o m p u t e r simulations c l e a r l y show that the
m e l t i n g t r a n s i t i o n in the n u m e r i c a l m o d e l systems is of first order. Even t h o u g h some results of the l a b o r a t o r y e x p e r i m e n t s
[82] may be
61
reproduced quantitatively
[89b]
, there is still a c o n t r o v e r s y con-
cerning the i n t e r p r e t a t i o n of these findings. of some unknown reason, h e x a t i c phase
[93]
It could be, that b e c a u s e
the s i m u l a t i o n techniques cannot r e p r o d u c e the
. This point has to be i n v e s t i g a t e d in future
studies.
0.92
i
i
i
i
i
• Conslont Aree end Coverege • Conslont Pressure end Eoverage
, ~ 0.90
~' 0.88,
"\
u= 0.86
\•
-~ 0.84
i
'-" 0.82 I
0.62
I
I
I
I
0.64 0.66 Temperoture kT/~
0.68
Fig.31: V a r i a t i o n of the p r o j e c t e d t w o - d i m e n s i o n a l d e n s i t y in the first a d s o r p t i o n layer. Results of the m o l e c u l a r d y n a m i c s s i m u l a t i o n s for the n u m e r i c a l model of x e n o n on graphite. The dots are obtained for constant d e n s i t y s i t u a t i o n s and the t r i a n g l e s are results under c o n s t a n t p r e s s u r e conditions, respectively. (From Ref. 89b.)
A n o t h e r not c o m p l e t e l y u n d e r s t o o d feature is the role of the s u b s t r a t e in the e x p e r i m e n t a l findings. This has been studied, niques,
in Ref.
again by MD tech-
89a. Here, m e l t i n g of s u b m o n o l a y e r xenon, k r y p t o n and
argon has been simulated. W i t h o u t substrate, all three systems are c o m p l e t e l y identical, noble gas p a r a m e t e r s
the n u m e r i c a l m o d e l s of b e c a u s e the r e s p e c t i v e
~ng' ~ng m a y be e l i m i D a t e d by proper scaling of
the t h e r m o d y n a m i c variables. noble gases on graphite.
However,
this is no longer true for the
The a d d i t i o n a l p a r a m e t e r s
e x p l i c i t l y in the calculations.
~ng-c'
~ng-c appear
T h e y are the basic reason for the
quite d i f f e r e n t b e h a v i o u r of the three systems as soon as they are phys i s o r b e d onto the substrate.
A solid krypton film,
for example, may b e c o m e c o m m e n s u r a t e to the
lattice of the g r a p h i t e surface.
This gives rise to the c o m m e n s u r a t e -
incor~mensurate t r a n s i t i o n d i s c u s s e d in the f o l l o w i n g c h a p t e r of this book.
The n u m e r i c a l model of the argon film, on the other hand,
shows
d i s c o n t i n u o u s m e l t i n g w i t h o u t substrate, but an a p p a r e n t l y c o n t i n u o u s
82
t r a n s i t i o n after p h y s i s o r p t i o n onto graphite
[89a]
. The c o n f i g u r a -
tions of the argon adsorbate are found to be strongly influenced by the p r e s e n c e of the substrate. Therefore,
one has to conclude that m e l t i n g
argon on graphite is no proper example for truely t w o - d i m e n s i o n a l behaviour.
II.2b The C o m m e n s u r a t e - I n c o m m e n s u r a t e
Transition
Two length scales are c o m p e t i n g in the compound s y s t e m of a noble gas adsorbate on a graphite substrate. One of it is due to the atomic i n t e r a c t i o n between the rare gas atoms. This defines the e q u i l i b r i u m lattice constant of the t w o - d i m e n s i o n a l
crystal. The second length
scale is p r o v i d e d by the p e r i o d i c v a r i a t i o n of the substrate p o t e n t i a l p a r a l l e l to the g r a p h i t e surface. The amplitude of this v a r i a t i o n is c o n s i d e r a b l y smaller than that of the i n t e r a t o m i c rare gas p o t e n t i a l [90]
. If the two length scales are incommensurate,
the p r o p e r t i e s of
the adsorbate are d o m i n a n t l y d e t e r m i n e d by the direct noble gas interaction. An example for this s i t u a t i o n is the s y s t e m xenon on graphite, w h i c h has been d i s c u s s e d in the p r e v i o u s chapter.
The present chapter deals with a system, can become commensurate.
This is r e a l i z e d for k r y p t o n on graphite.
a certain range of coverages,
In
one observes the o c c u r a n c e of a complete-
ly r e g i s t e r e d k r y p t o n adsorbate, W i t h increasing coverage,
the s o - c a l l e d c o m m e n s u r a t e phase.
a t r a n s i t i o n to the i n c o m m e n s u r a t e situation
/....,../...,../
takes place.
js
/ 11
Pig.:32:
in w h i c h both length scales
/
t
i/
•
i /
'--I z " / / "-.,/ / /
Atomic structure of a graphite surface. Four unit ceils are plotted w i t h two carbon atoms per cell. The center of the d a s h e d hexagon is a possible a d s o r p t i o n site.
TO discuss details of this c o m m e n s u r a t e - i n c o m m e n s u r a t e
transition,
it
63
is important to consider the geometrical properties of the graphite surface lattice. Four graphite unit cells are shown schematically in Fig.32. Each graphite unit cell contains two carbon atoms. The lattice of these carbon atoms has hexagonal symmetry. This is indicated by the dashed line in Fig.32. The centers of the hexagons are the energetically most favourable positions
for a physisorbed atom. The graphite sur-
face may be regarded as lattice of possible adsorption sites. This is shown in Fig.33.
Fig.33: Lattice of the possible adsorption sites on a graphite surface (hexagons). Physisorbed krypton atoms are symbolized by circles. An incommensurate domain wall is indicated, which connects two commensurate regions A and B (see text). (From Ref. 94.) The equilibrium distance between two krypton atoms is roughly 4% smaller than /~ times the distance between two possible adsorption sites [90] . If the crystalline krypton film is rotated by 30 ° relative
to
the base line of the graphite unit cell, the system gains energy by slightly expanding the distance between the krypton atoms. At certain coyerages,
this allows all krypton atoms to be at adsorption
sites,
forming the so-called /~ x /3 R 30-commensurate phase. Here, one third
64
of all adsorption sites is occupied by krypton atoms,
leading to three
energetically degenerate ground states of the total system. The pertinent sublattices are denoted by A, B, and C, respectively (see Fig.33). By increasing the coverage above one commensurate monolayer,
it is no
longer possible that all krypton atoms are at commensurate positions. The system becomes more and more incommensurate,
until it eventually
forms a uniform solid which is almost entirely determined by the krypton-krypton interaction potential. Many details of this commensurateincommensurate transitions have been studied extensively in laboratory experiments
[78-80,95-99~
of computer simulations
I
13o A
1zo
11o
E
, theoretically
[~05-IO9]
I
"~'
[100-104,94]
and by means
.
I
]
I
]
Krypton on 5rophite
/ Flu,d
9O 80
OZ
Fig.34:
0.4
06 08 1.0 I.Z C . . . . . . . /commensurotel uv~,uy~ ~.monolayerS /
t4
I6
Phase diagram for krypton on graphite. Most of the experimental data are from Ref.99. The results for coverages above one monolayer are extrapolated. (From Ref. 80.)
A p h a s e d i a g r a m for krypton on graphite is reproduced in Fig.34. It has been constructed ments of Ref.99.
[80] utilizing the detailed specific-heat measure-
Some of the details in this phase diagram have been ob-
tained simply extrapolating existing data and may have to be modified in the future. In the following paragraphs,
recent investigations of the
transition region between the commensurate and the incommensurate phase will be summarized.
Very-high resolution synchrotron x-ray scattering experiments have been performed for coverages around one commensurate monolayer
[98]
. The
observed diffraction profiles show a somewhat unexpected behaviour (see Fig.35).
65
, , ,
0.05 E
i
I
i •
0.04
,
,
,
Experiment
E 13 S i m u l a t i o n
x
/H~\\
0.03 w--
"1-
O. 0 2
I
"o
.--
\\
I I
\
0.01
q-
/
cO
"1-
0
I
m,
\
,
I
1.71
i
I q 1.75
I
I
I
1.80
kmax [ ~ - 1 ]
Fig.35: W i d t h of the first B r a g g - p e a k of the atomic s t r u c t u r e factor for krypton on g r a p h i t e at coverages s l i g t h l y above one c o m m e n s u r a t e monolayer. (From Ref. 106 .)
The first B r a g g - p e a k has been found to b r o a d e n c o n s i d e r a b l y for coverages s l i g t h l y above one c o m m e n s u r a t e m o n o l a y e r
[98]
. This was regard-
ed as a hint for the p o s s i b l e e x i s t e n c e of a w e l l - c o r r e l a t e d
fluid
phase between the solid c o m m e n s u r a t e and i n c o m m e n s u r a t e phases. However, no
detailed
informations on the p e r t i n e n t m i c r o s t r u c t u r e of the kryp-
ton film could be o b t a i n e d from the laboratory experiments. has been closed by c o m p u t e r s i m u l a t i o n s not only to reproduce the e x p e r i m e n t a l
[106-109] findings
This gap
. It is now p o s s i b l e
[106]
, but also to
identify the atomic structure of the w e a k l y i n c o m m e n s u r a t e phase.
The n u m e r i c a l model is exactly identical to that of the p r e v i o u s chapter, only the xenon p a r a m e t e r s are r e p l a c e d by the r e s p e c t i v e krypton values. Ref.
The simulation results for the e x p e r i m e n t a l c o n d i t i o n s of
98 are
plotted
in Fig.35.
simulation and experiment.
Quite good a g r e e m e n t is o b t a i n e d between
The m i c r o s t r u c t u r e of the w e a k l y incommensu-
rate k r y p t o n layer in the n u m e r i c a l m o d e l
is
found to be a c o e x i s t e n c e
of c o m m e n s u r a t e regions s e p a r a t e d by a network of i n c o m m e n s u r a t e domain walls
(see Fig.36).
The concept of domain walls has been i n t r o d u c e d p r e v i o u s l y in theoretical m o d e l c a l c u l a t i o n s for the zero t e m p e r a t u r e state of the incomm e n s u r a t e phase
[1OO-104]
. For k r y p t o n on graphite,
assumed to consist of an array of h e x a g o n a l l y
this phase was
shaped c o m m e n s u r a t e
66
regions. This "honeycomb structure" n e e d not be a very regular one b e c a u s e of the p o s s i b i l i t y to reshape the honeycombs by "breathing" [100,101]
. The b r e a t h i n g has to occur w i t h o u t changing the total length
or the number of i n t e r s e c t i o n s of the i n c o m m e n s u r a t e domain walls.
22212 Krypton A
Fig.36:
.
S n a p s h o t picture of the i n c o m m e m s u r a t e krypton atoms (shown as dots) for a 2 2 , 2 1 2 - k r - a t o m s y s t e m on graphite. The effective coverage in the first layer is 1.O23, the t e m p e r a t u r e is 97.5 K. (From Ref. 106.)
In other t h e o r e t i c a l calculations, included
[1OO,101,94]
finite temperature effects have been
. This leads to t e m p e r a t u r e d e p e n d e n t renormali-
zations of the ground state p r o p e r t i e s of the w e a k l y i n c o m m e n s u r a t e phase, e.g., to thermal f l u c t u a t i o n s of the domain wall n e t w o r k and to a b r o a d e n i n g of the wall width.
Some details of these theoretical cal-
c u l a t i o n s will be d i s c u s s e d in the f o l l o w i n g paragraphs. the findings of the m o l e c u l a r dynamics simulations the c o m m e n s u r a t e - i n c o m m e n s u r a t e
Beforehand,
for the dynamics of
t r a n s i t i o n are summarized.
As an example for the n u m e r i c a l results,
the sequence of Figs.
37-40
shows the temporal e v o l u t i o n of the w e a k l y i n c o m m e n s u r a t e phase of k r y p t o n on g r a p h i t e at d i f f e r e n t temperatures. rature
kBT/e = O.1
(Fig. 37)
At the very low tempe-
one finds the h o n e y c o m b network. The
domain walls consist of s t r a i g h t segments w h i c h are aligned
parallel
to the three symmetry d i r e c t i o n s of the g r a p h i t e substrate. M i c r o s c o p ically,
one has to d i s t i n g u i s h b e t w e e n two c o n f i g u r a t i o n a l l y d i s t i n c t
types of walls. A c c o r d i n g to the c l a s s i f i c a t i o n of Ref. called
'light' and
'heavy' walls.
104, they are
The atomic density in a heavy wall
is h i g h e r than in a light one. Both types may be easily i d e n t i f i e d by
67
their o r i e n t a t i o n and by the c l a s s i f i c a t i o n of the comm e n s u r a t e ground states s e p a r a t e d by this wall. (See e.g. Fig.1 Ref.
104.)
in
In the p r e s e n t e d s n a p s h o t p i c t u r e s of Fig.37, only heavy
walls are found.
Krypton/Graphite kT/e = 0.1
0 = 1.028
Time 2
4
6
12
14
( Fig.37:
10
8-~
16
Time sequence of snapshot p i c t u r e s of the i n c o m m e n s u r a t e krypton atoms in the m o l e c u l a r d y n a m i c s s i m u l a t i o n s of a 20,736 atom s y s t e m w i t h p e r i o d i c b o u n d a r y conditions. The time is given in units of t h o u s a n d time steps. One time step corresponds to 0.05 ps. The atoms at c o m m e n s u r a t e p o s i t i o n s are not shown, only the o c c u p i e d s u b l a t t i c e s are d e n o t e d by A, B, and C, respectively. The c o v e r a g e is 8=1.O28 and the t e m p e r a t u r e kBT/~=O.I. (From Ref. 107.)
The continuous b r e a t h i n g of the h e x a g o n s may be seen by c o m p a r i n g the individual s n a p s h o t pictures at d i f f e r e n t times. The low t e m p e r a t u r e situation agrees well with V i l l a i n ' s t h e o r e t i c a l assumptions. d i c a t i o n s for a striped phase are found,
No in-
in w h i c h the c o m m e n s u r a t e re-
gions w o u l d exist in form of an array of p a r a l l e l stripes. W i t h inc r e a s i n g temperature, distorted
(see Figs.
ens considerably. unambiguously,
the domain wall n e t w o r k becomes more and m o r e 38-40). The walls b r o a d e n and their surface rough-
However,
those domain walls, w h i c h can be c l a s s i f i e d
are always found to be heavy w a l l s
[107]
. Around
k B T / e = O . 7 , the s y s t e m begins to melt. L i q u i d - s o l i d c o e x i s t e n c e occurs, because the total d e n s i t y of the s y s t e m is fixed. process,
During the h e a t i n g
the p e r c e n t a g e of c o m m e n s u r a t e to i n c o m m e n s u r a t e atoms de-
creases from 75 % c o m m e n s u r a t e atoms at kBT/e=O.1
to roughly 60 % at
68 kBT/e=O.6
[1o7]
The subsequent
decrease for higher temperatures.
onset of melting causes a much sharper As long as the system is in the
Krypton/Graphite
(~
kT/e = 0.3
0 = 1.028
Time 2
4
6
8
10
12
14
16
Fig. 38: Same as in Fig. 37, but for the temperature (From Ref. Io7.)
1l
kBT/e=o.3.
Krypton/Graphite kT/e = 0.5
8 = 1.028
Time 2
4
6
10
12
14
8 -~
16
Fig. 39: Same as in Fig. 37, but for the temperature (From Ref. 1o7.)
kBT/e=o.5.
69
solid state, the increasing percentage of incommensurate atoms is due to a broadening of the domain walls. The average wall width is plotted in Fig.41 for different temperatures. The simulation results allow to
Krypton/Graphite kT/e = 0.7
8 = 1.028
Time 2
4
/c" Ac C
10
6
Ac' ! 12
8--~
v ~: Ac 14
16
Fig.40: Same as in Fig.37, but for the temperature kBT/e=O.7. (From Ref. 107.) determine a width distribution, which is indicated by the bars in Fig.41. This distribution becomes considerably broader at higher temperatures, because of the increasing surface roughness of the walls. The presented results of the molecular dynamics simulations of a system with 20,000 krypton atoms have been confirmed recently by studies of systems with more than 100,O00 atoms
[109]
The solid line in Fig.41 is the result of a theoretical calculation [ 9 4 ] . This theory maps the system of monolayer krypton on graphite onto a Sine-Gordon model. The domain walls are the pertinent soliton solutions. To construct the Hamiltonian of the system, it is justified to restrict the Fourier expansion of the krypton-graphite potential to the leading order
(Eq.II.56). The resulting Hamiltonian is
H=E'I~ ~ (~t ÷S£ml 2+ 21 [ F£'m'i' £ m i S£m,iS£'m',i '+A ~ { 3-cos(g S£m,1) -cos(g S£m,2)-cos g(S£m,1+S£m,2))}l
(II.61)
70
40
I
I
I
'
I
'
/
I
I
~< _="
I
4-'
30
/
2O
I
I
I
0
I
0.2
I
I
0.4
0.6
I
0.8
Temperature, kT/e Fig.41:
Here,
W i d t h of The solid the bars dynamics
÷S£m
the i n c o m m e n s u r a t e domain walls versus temperature. line is a t h e o r e t i c a l r e s u l t [94] . The dots with show the w i d t h d i s t r i b u t i o n found in the m o l e c u l a r simulations. (From Ref. 107.)
denotes
of the n e a r e s t
the d e v i a t i o n
adsorption
r£m=£a 1+ma 2
The q u a n t i t i e s krypton The
E ~, A,
term is the k r y p t o n - k r y p t o n
£ m i
(II.62)
and g are c o m b i n a t i o n s
(the explicit
term in eq. (II.61)
F£'m'i ' ~
atom from the p o s i t i o n
(£,m=0,+I ,+2 .... ) .
on graphite
first
of a k r y p t o n
site
expressions
of the p a r a m e t e r s are given
for
in Ref.
represents
the kinetic
energy,
interaction
in h a r m o n i c
approximation
kr-kr
94).
the second
(II.63)
~r£m,i~r£,m,,i ,
I
and the third term is the k r y p t o n - g r a p h i t e state e n e r g y
has been
subtracted.
interaction.
The g r o u n d
71 Motivated by the computer
simulation
results,
the domain wall network
is assumed to consist of wall segments,
w h i c h are aligned parallel
the symmetry directions
surface
To calculate sufficient
of the graphite
the temperature
(see e.g. Figs°37-40).
dependent width of these walls,
to deal with a p e r p e n d i c u l a r
Following
Ref.
positions
is denoted by s(~). Here,
94, the deviation
to
it is
cut through one of the segments.
of the atoms from the commensurate £ labeles
the commensurate
posi-
tions along the cut. s(£)=0 indicates
a completely
A self-consistent, guration
, for all
commensurate
temperature
(II.64)
situation w i t h o u t
dependent
approximation
any wall. for the confi-
s(£) may be obtained with the help of the B o g o l u b o v
inequality
for the free energy F I
F= - ~ £n Z with
,
(II.65)
Z=tr e -SH
and 8=I/kBT.
The B o g o l u b o v
(II.66)
inequality
is w r i t t e n
Fnc't) The density of all e-h pairs condensed
nd= f dn n fd(n,t) nc This
ex-
coex-
The existence
since they have the tendency to grow to the stationary the clusters
of
the system of e l e c t r o n i c
this barrier allows to consider the clusters
exciton systems.
How-
for the exciton concentration
has to be surmounted by the critical
other hand,
form
relevant properties
into an exciton part and a droplet part.
for n=nc(t)
(III.5)
equations.
from a much simpler set of or-
of the droplet d i s t r i b u t i o n
istence is occuring,
equi-
(II.5).
and the conservation
equations
des-
equation over the droplet vol-
may be obtained
To derive these equations,
maximum
equation
(III.5)
system of i n t e g r o - d i f f e r e n t i a l
ever, a good approximation
citations
can be derived
the continuity
. The resulting Langevin
The F o k k e r - P l a n c k
_~n f(n,t)+S(t) ~n
in droplets
is given by
.
is the first moment of the droplet
distribution
function
in
84 nd=Xl The exciton
density
is
approximated
n
by
c
nx= f
dn n fx(n,t) I
One may therefore
split the conservation ~
the density
dependent
x T
~n=
nn c
into
(III.5a)
+G(t) T
x
e-h lifetime
TX
(III.5)
nd
n
~-~ nx +Tt n d Here,
equation
d
has been approximated
by
N
In Ge, one has approximately of fd(n,t)
~d=4Tx
[118,119]
. The moments
x~ (t)
are given by x
(t)= f n
The zeroth moment x 0 measures x 2 one obtains
the relative
an n~f d
(III.6)
c
the density
mean square
of droplets,
x1=nd,
(&n) 2 of the droplet
and from distribu-
tion
(An)Z=[(x2/x0)-(Xl/X0)2]/(xl/x0) Differentiating Planck
equation
EqIIII.6) with respect (II.5),and
to time,
integrating
2
inserting
by p a r t s
yields
the Fokker-
the
equation
for
X
~ ~X0 ~--~ x =n c - ~
L-~--.~d (a (T) -nxb (T)) ~ FX
-a
- I/3]
+
(III.7) Here,
the surface
poration droplets.
tension
contribution
rate has been neglected. The droplet
density
This
in the expression
for the eva-
is well
for large
is determined
~n -~t x ° = J ( n c ' t ~ - ~ Equations
(III.5a),
9=2,3,...
a closed
(III.7),
and
(III.8)
set of equations.
justified
by
f(nc't)
(III.8)
form for all ~=9/3 with
For the evaluation
of the current
85 J(n c) over the p o t e n t i a l b a r r i e r ~(n c) one needs an e x p r e s s i o n for f(nc). The d i s t r i b u t i o n function may be approximated, c h a r a c t e r i s t i c times for e q u i l i b r a t i o n
a s s u m i n g that the
in the r e s p e c t i v e subsystems of
excitons and droplets are much faster than the r e l e v a n t time scale for v a r i a t i o n of x . If the p o t e n t i a l b a r r i e r is s u r m o u n t e d from the exciton side
(droplet formation and growth),
In the case of the droplet decay,
f(nc)
one replaces f(n c) by fx(nc).
is a p p r o x i m a t e d by fd(nc).
These assumptions are justified in situations, changes of the laser g e n e r a t i o n rate G(t) of the exciton lifetime.
in w h i c h the t e m p o r a l
are slow on the t i m e - s c a l e
For i n d i r e c t - g a p semiconductors,
tions may be r e a l i z e d e x p e r i m e n t a l l y
these condi-
[118,119]
For the n u m e r i c a l solution of the d i f f e r e n t i a l e q u a t i o n s a laser generation rate of the form -t/tr) G(t)=Gl(1-e has been assumed
[121]
,
(III.9)
. This simulates a s w i t c h - o n of the laser ex-
citation w i t h the risetime t r. For the m a t e r i a l p a r a m e t e r s of Ge, one o b t a i n ~ the results p l o t t e d in Fig.45. I
'
'
t''''i
'
G, :3.1Om~tcm"3 / |
T
'°'r
:2.1K
'
'
I''''I
'
'
'
.............
~
I''''I
'
~ X o - l O 4 c n ~
/
'
/
I''
-3
x 2 ..lOZ°cni 3
IY '/K
lo' - /
'
3
x
~
'
G "10t6{ICm3
IF/-
,u cm
,,, ..12
. . . . . .
-3
(~--~)z. 10"1
10°
102
103
104
105
106
time [ps ] Fig.45:
Time d e p e n d e n c e of the laser g e n e r a t i o n rate G,_the e x c i t o n density n x and the moments x0 , xl , and x2 . n = Xl/X0 ~ the average number of e l e c t r o n - h o l e pairs per droplet, is the v a r i a n c e of the d r o p l e t d i s t r i b u t i o n function . (From Ref. 121.)
88
This figure shows, that the exciton density has to e x c e e d a critical value, before e-h droplet formation
takes place. At early times, n
rises p r o p o r t i o n a l l y to G(t) until n u c l e a t i o n tion of many excitons
x sets in causing condensa-
into droplets. At this time,
the moments x 0 , Xl,
and x 2 steeply increase and the exciton d e n s i t y decreases.
Then,
a
stationary s i t u a t i o n is a p p r o a c h e d slowly. The f l u c t u a t i o n s become very large only during the n u c l e a t i o n process.
This temporal v a r i a t i o n has been tested by time r e s o l v e d luminescence measurements
[138]
. The theory is in q u a l i t a t i v e a g r e e m e n t w i t h the
e x p e r i m e n t a l findings of the i n t e g r a t e d exciton and e-h droplet luminescence,
respectively.
The s i t u a t i o n of droplet decay has also been
i n v e s t i g a t e d in this framework
[123] . The theory is found to reproduce
the results of the e x p e r i m e n t s d e s c r i b e d in Ref.129. At this stage, one may thus conclude,
that the dynamics of e-h droplet n u c l e a t i o n in in-
d i r e c t - g a p s e m i c o n d u c t o r s is well understood.
T h e o r y and e x p e r i m e n t
are in good q u a l i t a t i v e agreement.
III.Ib The P l a s m a Phase T r a n s i t i o n in D i r e c t - G a P Semiconductor_ss The c o m p o u n d s e m i c o n d u c t o r s CdS and GaAs are typical examples for the direct-gap materials
i n v e s t i g a t e d in this chapter. Here,
of the e-h pairs is only of the order of nanoseconds.
the lifetime
The recombina-
tion losses are therefore very high, causing s i g n i f i c a n t m o d i f i c a t i o n s of the plasma phase t r a n s i t i o n in c o m p a r i s o n to the situation in ind i r e c t - g a p materials.
Nevertheless,
in CdS and GaAs the e x i s t e n c e of
an exciton gas phase at low incident light intensities is e x p e r i m e n t a l ly assured, tion
as well as the o c c u r e n c e of an e-h plasma for high
[130]
. However,
excita-
no e x p e r i m e n t a l e v i d e n c e has been o b t a i n e d for
the d e v e l o p m e n t of two-phase c o e x i s t e n c e
in form of well defined e-h
droplets.
The t h e r m o d y n a m i c p r o p e r t i e s of the e-h plasma in d i r e c t - g a p semiconuctors have been c a l c u l a t e d q u a n t u m m e c h a n i c a l l y
[131-133]
. These
calculations assume that a q u a s i - e q u i l i b r i u m is r e a l i z e d in the system of e l e c t r o n i c excitations.
For these c o n d i t i o n s one obtains a phase
d i a g r a m for the e-h plasma w h i c h resembles that of a classical (see Fig.46).
liquid
87
50 40 I--
liquid
20
coexistence
01010 1012 , , i i I 101/" 1016 10 le 1020 (cm-3) F i g . 4 6 : T h e o r e t i c a l prediction for the phase d i a g r a m of the electronhole system in CdS. (From Ref. 132.) The phase d i a g r a m exhibits Consequently, However,
a well developed phase coexistence
one should observe e-h droplets
region.
in this parameter
region.
it is not clear to what extend these results are e x p e r i m e n t a l l y
relevant.
The calculations
electronic An estimate
did not consider the short lifetimes
of the
excitations. for the influence
of the e-h pair lifetime on the details
of the plasma phase transition may be obtained by evaluating ralized G i n z b u r g - L a n d a u
potential,
Eq.(III.2a),
meters of GaAs and CdS. The results
the gene-
for the m a t e r i a l
para-
are shown in Fig.47.
number of e-h pmrs
.
number of e-h pe,rs n
.~[CdS , .¢
6o As TISK . . . . . . n. [tO~c~ s] (D 867 ® 1,33 ~3.3 057 ®5?0
[ ©IZl, .,,0"*~"
Z
~ J
f
i0z ®12 I,
-10 -to
} 1 e'h d~p rodlus R (pm]
Fig.47:
e-h drop rod,us I Ipml
Generalized Ginzburg-Landau potential for various exciton densities. The results for GaAs at T=6 K are shown in the left figure for the exciton densities nx(1Ol4cm-3): (I) 0.67, (2) 1.33, (3) 3.3, (4) 6.7, (5) 67.0. The results for CdS at T=20 K are plotted in the right figure, n x (I016cm-3): (1) (I) 0.124 ( 2 ) 0 . 2 4 9 , ( 3 ) 0 . 6 2 3 , (4) 1.24, (5) 12.45. (From Ref. 134.)
88 In the d i r e c t - g a p s e m i c o n d u c t o r s GaAs and CdS, the r e c o m b i n a t i o n losses dominate over the e v a p o r a t i o n losses at p r a c t i c a l l y all e x c i t a t i o n intensities.
The size of the critical droplets is t h e r e f o r e e x t r e m e l y
small and the p o t e n t i a l b a r r i e r to n u c l e a t i o n is almost absent. Evaluation of the s t a t i o n a r y p r o b a b i l i t y distribution,
Eq. ~II.2),yields
the results shown in Fig.48.
.
.
.
.
f
.
.
.
.
l
.
.
.
.
i
.
.
.
.
r
.
.
.
.
M
,_~Cl5
/
~
/
G~Z.7.16'ec~/~
E I0
ZO
30
~0
50
number of e-h poirs n
Fig.48:
N o r m a l i z e d d i s t r i b u t i o n function for the p r o b a b i l i t y to find clusters w i t h n e-h pairs. The results are c a l c u l a t e d for CdS at T=15 K for d i f f e r e n t e-h pair g e n e r a t i o n rates G . (From Ref. 135.)
A n o t h e r c o n s e q u e n c e of the short e-h pair lifetime is the small size n s of the stable droplets. n s ~300
. This a s s u m p t i o n is
j u s t i f i e d s e l f - c o n s i s t e n t l y w i t h i n the calculations. An example
for the
n u m e r i c a l results is r e p r o d u c e d in Fig.49.
No large e-h clusters are found under the i n v e s t i g a t e d conditions. droplet size
n
exceeds
n=50
even for very high excitations.
The
only in a short t r a n s i e n t t i m e - r e g i m e Under the assumed conditions,
these ex-
c i t a t i o n intensities are the h i g h e s t e x p e r i m e n t a l l y r e a l i z a b l e values before damage of the crystal sets in.
C a l c u l a t i n g the density of the e l e c t r o n i c e x c i t a t i o n s in the s e m i c o n ductor shows that the plasma liquid d e n s i t y has already been reached. Thus,
the state of a plasma liquid in d i r e c t - g a p m a t e r i a l s is not
a p p r o a c h e d by the growth of large droplets, p a c k i n g of tiny clusters.
but by i n c r e a s i n g l y dense
Due to the p r e d o m i n a n t n o n e q u i l i b r i u m effects,
the two- phase coexistence region is
h a r d l y developed.
This shows that
m o s t results of the q u a s i - e q u i l i b r i u m c a l c u l a t i o n s n e g l e c t i n g finite lifetime effects are e x p e r i m e n t a l l y not really relevant.
The absence of a well defined t w o - p h a s e region suggests the a p p l i c a t i o n of a h y d r o d y n a m i c d e s c r i p t i o n for the p l a s m a phase transition.
In in-
d i r e c t - g a p m a t e r i a l s this a p p r o a c h was found to be v a l i d only near the critical point. One may expect,
that the h y d r o d y n a m i c m o d e l has
a m u c h b r o a d e r range of a p p l i c a b i l i t y in d i r e c t - g a p s e m i c o n d u c t o r s
90 because here only tiny clusters are formed. These may be r e g a r d e d as local fluctuations of the e-h p a i r density.
fn(t)~
c¢s%-•
1o,: 40
2o
t Ins]
Q) n
0
f.(t) ], [cr6'
CdS Tp" 8K
1017I 10ls 2O
b)
~/~~
,o
I[ns]
1
f.Ct) CdS "rp- 8K
lO~S 10~ 2O ns'l
c)
6o\ n
~
1o
0
Fig.49: N u m e r i c a l results for the cluster d i s t r i b u t i o n function f(n,t) versus time and n u m b e r of e l e c t r o n - h o l e pairs per cluster. The p l a s m a t e m p e r a t u r e is TD=8 K . A 7 ns pulse has been assumed and a peak g e n e r a t i o n rate Gl(1027cm-3s-l): a) G/=0.5 , b) GI=I.0 , c) G/=2.O . (From Ref. 137.)
91
Eqs.(III.3) and theory shows,
(III.4)
[138,139]
are the starting point for the h y d r o d y n a m i c
. However,
a stability
that including the velocity
analysis
of these equations
field as a dynamic variable yields
nothing but a damped mode which always remains stable [27] . For simplification, one may thus eliminate the velocity adiabatically. density
This leads to an effective
equation
field
for the local e-h
0(r,t)
Here, M = I / S m and F2=VF/8 structure
. Mathematically,
as Eq. (II.23) of the classical
composition
in binary systems.
Eq. (III.11)
field theory
For example,
and Miller
[41]
droplet
the quite successful
has been g e n e r a l i z e d
formation
in direct-gap
theory by replacing the homogeneous Within the approximations
for a treatment
of
theory of Langer,
Bar-on,
to deal with the p r o b l e m of e-h
semiconductors
local chemical potential may be obtained
~(r,t).
de-
This analogy suggests the application
of m e t h o d s which are similar to those developed Eq. (II.23).
has the same for spinodal
[138,139]
. Here,
the
from quasi - e q u i l i b r i u m
e-h density by the local density
of Ref.
41 one constructs
a system
of equations which is solved numerically.
This allows the d e t e r m i n a t i o n
of the temporal
distribution
evolution of the density
gether with that of the moments of the p r o b a b i l i t y details see, e.g., Examples
the discussion
of the results
function
fl to-
distribution.
For
in chapter lI.Ib of this book.
are reproduced
in Figs.5Oa-d.
The calculations
have been done for CdS under pulse excitation with a pulse width of 1.2 ns
. Fig.5Oa
tribution system.
shows a typical example of the resulting
fl together with the chemical p o t e n t i a l
The temporal
density dis-
~h of the homogeneous
evolution of fl is p l o t t e d in Fig.5Ob.
It turns
out that the m a x i m u m of fl is always at the value ~ which is the mean e-h pair density determined by the external
laser g e n e r a t i o n
rate
G(t) ~d ~- G_( t ) With increasing
(111.12)
~?
times the distribution
due to prominent density fluctuations. double peaked structure
are found.
function broadens However,
no indications
This indicates
gative value of ~ = p - ~ .
for a
that no true separa-
tion into a liquid phase and a gas phase is taking place. be signified by two peaks of fl(u),
significantly
This would
one at a positive and one at a ne-
92
I -120I :ds f t,..w
~,,/ 1 /
_
-~
[ ~0zzx0"cm'
10"
Fig.5Oa:
..... z
t0's densityR [cm*J
I0'+
.5
0
Density d i s t r i b u t i o n fl for the g e n e r a t i o n rate G = 1 . 2 x 1 0 2 7 c m - 3 s -I and the q u a s i - e q u i l i b r i u m chemical p o t e n t i a l Ph as functions of the e l e c t r o n - h o l e density p . (From Ref. 137.)
-0.8
Fig.5Ob:
/,
0
1
2
u(1078c63)
3
T e m p o r a l e v o l u t i o n of the d e n s i t y d i s t r i b u t i o n fl(u,t), u=p-~. The times are given in ns after the onset of the e x c i t a t i o n pulse. (From Ref. 139.)
Cd 5
t2 If,.60K
Z,
/"\(d,
// ~\\
% , I0"¢m'
1,0
B
/
.5
f
\~
i
x.
• i
,
,
L
,
I
t Ins] Fig.5Oc:
~
W+,, ,
, ,
,
I
1.6
,
?
O~
.?
Time d e v e l o p m e n t of the average e l e c t r o n - h o l e density and of the second and third m o m e n t of the p r o b a b i l i t y distribution, and , respectively. (From Ref.137.)
g3
~
cd s
i,z HI B*l
S
tO
tZ
1,1~
16
IS
k [ Z,I" IOScm'~l
Fig.5Od:
Structure factor S(k,t) for various times after the onset of the excitation pulse (see text). (From Ref. 137.)
The temporal evolution of the mean density ~ is shown in Fig.5Oc together with that of the second and third moment of the distribution function. After 0.4 ns, ~(t) reaches the value corresponding to the instability point of the chemical potential.
For higher densities,
phase separation would occur in classical systems. This is however prohibited by the short e-h lifetimes in direct-gap semiconductors.
Only
a broadening of the distribution function takes place. This is also indicated by the second moment . Its time-development that
of
follows
~. The third moment measures the asyrmaetry of the
distribution function. Negative values indicate that most density fluctuations are in direction to lower densities.
An example for such a
situation is shown in Fig.5Oa. Finally,
in Fig.5Od the time dependent structure factor S(k,t)
is plot-
ted for several times after the onset of the exciation pulse. The wavelength at which S(k,t) has its maximum is the dominant wavelength of the expected density pattern
(see the discussion in chapters II.Ib
and II.lc). For CdS the wavelength is in the region IO-5cm>l>lO-Ucm. These values are compatible with the cluster model of e-h droplet nucleation, which predicts for temperatures well below T c the formation of e-h clusters with an average radius on the order of IO-6cm. The time development of S(k,t) synchrotron radiation
could be measured experimentally with pulsed [140]
. Up to now, however, no such measurements
have been reported. To summarize,
both the nucleation theory and the hydrodynamic model
predict significant nonequilibrium effects for e-h droplet nucleation
94
in d i r e c t - g a p semiconductors.
These effects lead to the c o n c l u s i o n
that the plasma phase t r a n s i t i o n in these m a t e r i a l s is only weakly of first order. Due to the smallness of the e-h density fluctuations,
a
direct experimental m e a s u r e m e n t is complicated. A c o m p a r i s o n between theorz and e x p e r i m e n t is t h e r e f o r e only i n d i r e c t l y possible. centrates on the theoretical result,
It con-
that a two phase c o e x i s t e n c e
region is only i n c o m p l e t e l y d e v e l o p e d for d i r e c t - g a p semiconductors. A lineshape analysis of the optical spectra of gain and a b s o r p t i o n in h i g h l y excited CdS and GaAs shows that the e-h system does not reach the plasma liquid d e n s i t y
[130,137]
. Moreover,
in a g r e e m e n t w i t h
t h e o r e t i c a l p r e d i c t i o n s the o b t a i n e d e-h d e n s i t y is found to be prop o r t i o n a l to the e x c i t a t i o n intensity.
This is in c o n t r a s t to the
s i t u a t i o n of a system in thermal equilibrium.
Here, the r e a l i z e d densi-
ty w o u l d e x c l u s i v e l y be d e t e r m i n e d by the t h e r m o d y n a m i c parameters.
III.2 Optical N o n e q u i l i b r i u m Systems M a n y optical systems w i t h suitable n o n l i n e a r i t i e s
exhibit nonequi-
librium phase transitions. A very important example is the laser w h i c h even shows a full h i e r a r c h y of those transitions.
Firstly,
at the laser
t h r e s h o l d coherent r a d i a t i o n d e v e l o p s out of the thermal light. For increasing pump power, up into short pulses.
e v e n t u a l l y the c o n t i n u o u s
laser r a d i a t i o n breaks
Still higher pumping leads to strongly fluc-
tuating m a n y - m o d e emission. A t h e o r e t i c a l analysis indicates that most of the n o n e q u i l i b r i u m transitions in lasers occur c o n t i n u o u s l y topic of this book.
[11 - 13]
In some special cases,
hibit first-order transitions.
. Thus they are not the
however,
a laser may also ex-
This happens for example if one inserts
an additional s a t u r a b l e absorber into the cavity. Hereby,
the total
losses of the light in the r e s o n a t o r become i n t e n s i t y dependent.
This
m a y lead to a d i s c o n t i n u o u s onset of laser action at the threshold. Details of this system will be d i s c u s s e d in the next chapter
(III.2a).
The very topical effect of optical b i s t a b i l i t y will be i n v e s t i g a t e d in the subsequent chapters.
Particularly,
array of two-level atoms in a cavity. optical bistability.
chapter III.2b deals w i t h an This is the classical m o d e l for
The relevant equations are the so-called optical
M a x w e l l - B l o c h equations, w h i c h will also be applied to the laser theory in chapter III.2a.
Some of the recent results for optical bistabi-
lity will be d i s c u s s e d in detail.
In this context,
it has been
85 shown, that a class of solutions of the Maxwell-Bloch equations exhibit limit cycle behaviour and even deterministic chaos. These features will be investigated in chapter III.2c.
Finally,
the last two chapters,
III.2d and III.2e, deal with optical bistability in semiconducting materials.
Such systems are especially interesting for possible device
applications,
e.g., as logical elements.
III.2a First-Order Nonequilibrium Phase Transitions
in Lasers
The optical effects of polarizable matter are often described by the so-called Maxwell-Bloch equations.
In the semi-classical approximation,
these equations are usually formulated for the electromagnetic (r,t), for the atomic polarization P(~,t)
field
and for the atomic inversion
o (r,t). To keep the analysis as transparent as possible,
in the follow-
ing the often complicated energy spectrum of the atomic system will be approximated by a simple two-level model. Only those two energy levels will be considered explicitly, cal transition.
which directly participate in the opti-
The influence of all other states is summarized in
form of dissipative contributions and noise terms in the dynamic equations of the relevant variables. The deterministic part of the optical Maxwell-Bloch equations is [141]
I ~2E
~2~
c ~ - ~ -AE= - c---/ 4~ ~-~/
,
(III.13)
82p +2Yi 3--~ 8P +92p~ =-2g2E~
,
(III.14)
and (III.15)
In these equations,
c is the velocity of light in vacuum,yiand y11are
the transversal and longitudinal damping constants, frequency of the atomic polarization,
g is the optical matrix element
and o 0 is the inversion due to external pumping, tem of partial differential equations fied considerably within the so-called imation'.
~ is the eigen-
(III.13)
respectively.
- (III.15)
The sys-
can be simpli-
'slowly varying enveloppe approx-
Here, one splits off the rapidly varying parts of E and P
98
÷ ÷ ei(Kr-~t%,,+c.c. (r,t)=E(r,t)
(r,t) =P(r,t)
+c.c °
The a m p l i t u d e s E and P are assumed to vary slowly in space and time. Inserting this ansatz into Eqs.
(III.13) -
the second d e r i v a t i v e s of the amplitudes
DE
(III.15)
and n e g l e c t i n g
leads to
~t -
'~iA~+KJE+~E0-igP+FE
'
(III.16)
~P 8t -
(iA~+yj)P+ig~E+Fp
,
(III.17)
2o ~t
where
