CHARGE TRANSFER UPON CONTACT BETWEEN
METALS AND INSULATORS
by
Donald Ora VanOstenburg
AN ABSTRACT
Submitted to the School for Advanced Graduate Studies of
Michigan State University of Agriculture and
Applied Science in partial fulfillment of
the requirements for the degree of
DOCTOR OF PHILOSOPHY
Department of Physics and Astronomy
1956
Approved
^ . /M
�CHARGE TRANSFER UPON CONTACT BETWEEN METALS AND INSULATORS
The equilibrium charge distribution between sub
stances in contact has been calculated for several cases in
the one-dimensional approximation, e.g. metal-insulator,
metal-semiconductor, and metal-metal.
In addition to these
cases, we have considered insulator-insulator contacts, and
certain other metal-insulator contacts.
The direction of
charge transfer is, of course, such as to equalize the Fermi
levels.
The order of magnitude of the charge and of the
effective depth of the charged regions depend on the rela
tive positions of the energy bands in contact.
Thus, for
example, in the metal-insulator case it is possible to have
either a large charge density ( 1 0 ^ statcoulombe/cra ) in a
thin layer (10
cm), or small charge density (10“
lombs/cm^) in a thick layer (10 ~ cm).
statcou-
The insulator-
insulator cases give rise to similar distributions.
The
energy levels in most insulators are too poorly known to
permit strict quantitative comparison with experiment, but
the results permit a semi-quantitative explanation of many
of the observations in static electrification.
The calcula
tions were carried out assuming the bodies In immediate con
tact.
No consideration was given the problem of a dielectric
gap separating the bodies.
�CHARGE TRANSFER UPON CONTACT BETWEEN
METALS AND INSULATORS
by
Donald Ora VanOstenburg
A THESIS
Submitted to the School for Advanced Graduate Studies
Michigan State University of Agriculture and
Applied Science in partial fulfillment of
the requirements for the degree of
DOCTOR OF PHILOSOPHY
Department of Physics and Astronomy
1956
�ProQuest Number: 10008531
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�ACKNOWLEDGMENT
The author wishes to thank Professor
D. J. Montgomery for the suggestion of the
problem and for his invaluable aid in its
solution.
�TABLE OF CONTENTS
PAGE
INTRODUCTION................................
1
PROPERTIES OF ELECTRONS IN SOLIDS, CHARGE
DENSITY, AND ELECTRICAL CONTACTS .
3
A.
B.
C.
Electrons in Solids ................
Charge Density......................
Basic Properties of Contacts .
3
METAL-METAL CONTACTS ......................
10
5
7
Charge Density in the Metal
Solution of Poisson’s Equation
10
12
METAL-INSULATOR CONTACTS...................
18
A.
B.
A.
B.
C.
D.
E.
General Behavior . . . . . . .
Case of Large Charge Transfer from
Metal to Insulator ................
1.
Solution of Poisson9s Equation .
2. Evaluation of the Quantities
eAv; , eAV^and 3
.
3. Calculation of the Surface
Charge Density ................
4. Calculation of the Volume
Charge Density ................
Case of Large Charge Transfer from
Insulator to Metal
................
1. Evaluation of the Quantities
eAVJ , eAVL , and j .............
2. Calculation of the Surface and
Volume Charge Density .
The Case of Small Charge Transfer
from Metal to Insulator.............
The Case of Small Charge Transfer
from Insulator to Metal.
.
19
22
24
26
28
29
32
33
34
37
.............
41
General Behavior ...................
Case of Small Charge Transfer.
Case of Large Charge Transfer.
41
41
45
INSULATOR-INSULATOR CONTACTS
A.
B.
C.
18
�iv
CHAPTER
VI.
PACE
APPLICATIONS.................................... L8
A.
B.
VII.
Other Features of Contacts.
Comparison with B-.xperiment.
. . .
. . .
C O N C L U S I O N S ..............................
REFERENCES CITED.
.
.
.
.
.
.
.
.
.
.
L8
50
57
58
�CHAPTER I
INTRODUCTION
Contact phenomena play an Important role in presentday physics.
It is convenient to make a division into time-
dependent and time-independent processes.
dependent type we have, for example,
Under the time-
the point contact and
the junction transistor where charge flows in more or less
steady fashion.
Under the time-independent type we have the
phenomena of contact potentials and static electrification.
This paper is concerned with only the last process.
We have made an attempt to explain some results of
static electrification as reported by Hersh and Montgomery[l]
and by Harper[2].
Various authors have calculated the equil
ibrium charge distribution between substances in contact for
several cases in the one-dimensional approximation, e .g. metalinsulatorC3]» metal-semiconductor[3,^ J, metal-metal[4],
Be
sides these cases we have considered insulator-insulator con
tacts and certain additional metal-insulator contacts.
The
direction of charge transfer is, of course, such as to equalize
the Fermi levels.
The order of magnitude of the charge and
of the effective depth of the charged region depends on the
relative position of the energy bands in contact.
Assuming
an energy-band structure for the substances, we have determined
�2
the sign of the charge transferred the charge density, field
strength, and potential variation with distance in the
materials.
The calculations are carried out by applying
Fermi-Dirac statistics in order to find the charge density.
We then solve Poisson°s equation in each region and match
the solutions at the boundary by means of suitable boundary
conditions.
This procedure gives us the necessary conditions
to determine the constants and, therefore, permits solution
of the problem.
The calculations show that ample charge is
transferred to explain some experimental data and so in these
cases it is unnecessary to invoke surface states or local
heating.
The calculations were carried out assuming the
bodies in immediate contact, the interpenetration of the
bodies being supposed deep enough so that the interior struc
ture need only be considered.
No consideration was given the
problem of a dielectric gap separating the bodies, although
it is believed that this will have an appreciable effect in
reducing the magnitude of charge transferred.
�CHAPTER II
PROPERTIES OF ELECTRONS IN SOLIDS, CHARGE
DENSITY, AND ELECTRICAL CONTACTS
A.
Electrons In Solids [53
The first theory of electrons in solids was given in
1900 by Drude.
He assumed that electrons in a metal were
free and form an electron "gas" in a container.
This
simple model oredicts the law of Wiedemann and Franz that
the ratio of the thermal conductivity K to the electrical
conductivity n*
(tightly bound),
is the effective mass of the electron and in (2) fl
is the energy at the top of the band; t) is Planck's
divided by 2_7f .
constant
When the energy of an electron is given by
(l) we have a normal energy band of standard form.
It re
presents the behavior of nearly free electrons (and in
�5
addition tightly bound electrons near the bottom of an
energy band).
When the energy is given by (2), we have an
inverted band of standard form.
It represents the behavior
of tightly bound electrons near the top of an energy band.
If we take into account the exchange energy the term[9J
JL
k
I
+ k
must be subtracted from (1) and (2). k
being the magnitude
of the propagation vector corresponding to maximum energy,
and e the electronic charge.
The exchange energy has this
form when the electrons are perfectly free and are consider
ed as a degenerate Fermi gas filling all states up to a max
imum level with two electrons of opposite spin.
The calculations that we wish to make require a know
ledge of the electron charge density.
This in turn depends
upon the density of electronic states into which electrons
may enter.
Hence, we discuss the density of electronic
states.
B.
Charge Density
The volume of phase space occupied by N electrons
confined to a spatial volume V and occuoying a volume in
momentum space
is
[lOj.
Quantum statistical mechanics
tells us that the volume of the smallest cell in phase space
associated with an electron of given spin direction is equal
to h ? ,
The number of cells is therefore given by \
We define
j
^
to be the number of energy levels per unit
�6
volume (for one direction of electron spin) lying in the
range cA £
at E.
This gives
^
■p. in terms of the propagation vector k we have,
(E)^E -
Expressing
since p
f<^%
^ k *
For free electrons k-space fills up with spherical symmetry
and so the volume in k-space contained between two concentric
spheres of radii
k and k + d k is ^ukoik
. , .-
Hnh'Jk
Thus,
/
^ /T
Substituting from(l)and
\ and #4k ^ tylf
k,
, ,
^
(2) the value of kin terms of E, we
have for the density of
states
for bands of standard and in
verted form respectively,
(3) m(E)j£
w
(e)c>E -- f a (
If each allowed state were occupied by an electron we would
integrate the proper expression for the density of
states
over the required energy region in order to determine the
number density of electrons in that range.
Electrons, how
ever, obey Fermi-Dirac statistics, and we must multiply the
density of states by the Fermi-Dirac distribution function,
given by
/✓_) _
I_________
�7
where E Is the energy of the state in question and J the
Fermi level. Here k is
Boltzmann's constant, and T again
the absolute temperature.
The number density of electrons
in a range (a, b) is given by an expression of the form
r **
J /n (£)"/ (E) (^(E
a
Multiplying the number density by the charge on the electron
gives the charge density.
These concepts will be applied in
the next and later chapters where we consider in detail the
charge distribution at contacts.
C.
Basic Properties of Contacts
As is well known, when two bodies are placed in con
tact charge tends to flow so as to equalize their Fermi
levels.
This give rise to charge layers of opposite sign in
the two bodies.
In Figures 1, 2, k 9 5» 6, 7, and 8 we see
energy level diagrams of bodies before and after contact.
Before contact the levels are shown constant up to the edge
of the crystal.
After contact, as a result of the transfer
red charge, the potential energy of an electron within the
crystal will change, the levels shifting accordingly.
The
total shift from one substance to the next is e
where A Vf is the total shift in the electrostatic potential
of an electron In the substance on the left and A Vz
the
corresponding quantity for the substance on the right.
In the insulator we are concerned with the energy Y
released when an electron at rest outside the crystal is
o
�8
taken into the lowest level in the uppermost nearly empty
band.
This quantity is the analog of the electron affinity
A for a free molecule.
energy
V 0 necessary
We are concerned also with the
to remove an electron from the highest
level of the uppermost nearly filled band.
This quantity
is the analog of the ionization potential I for a free mole
cule.
The quantity X Q is usually called "electron affinity"
in solid state
literature* but we prefer some designation
differentiating it from the quantity A for a free molecule.
The quantity
does not seem to have been called "ioniza
tion potential," however, the reasons for such a designation
are just as good as those for "electron affinity."
sent we do not wish
At pre
to introduce a new terminology, nor
continue to use what to us is undesirable, and so shall try
to get by with the use of symbols only.
concerned with the energy ^
In the metal we are
released when an electron at
rest outside the crystal is taken to the Fermi level, or
absorbed when an electron Is taken from the Fermi level to
a point outside the crystal.
In a sense
^ may be considered
the analog of either the electron affinity or the ionization
potential for a free molecule.
name, work function.
It has been given the special
We are also concerned with the energy
of an electron at the bottom of the half-filled band in the
metal and designate this by UJQ .
In the figures the energy parametersof the substance
on the left contain the subscript one, and the substance on
the right contain
the subscript two;
For example, Figure 1
�9
represents a raetal-metal contact in which the charge flows
from metal 2 to metal 1.
As a result the levels in 1 are
shifted upward by an amount <2 ^ ^
an amount
.
while those in
Near the contact
2 downward
the energy of an electron
is not constant, and so the variation is designated by i/J,
and
in the two metals respectively.
The reference level is
taken with respect to the shifted levels.
volving insulators we take X' and
energy parameters.
In contacts in
to indicate
variable
Further details are given in the remain
ing chapters of this paper.
�CHAPTER III
METAL-METAL CONTACTS
A,
Charge Density In the Metal
Owing to the large density of states of a metal we
would expect the transferred charge to reside in a small
spatial region.
Suppose the metals placed in contact have
the relative energy band structure shown in Figure 1.
Electrons flow from right to left causing the metal on the
left to become negatively charged, the one on the right
positively charged.
To see in more detail the charge distribution and
potential energy variation we turn to a discussion of the
net charge density and solve PoissonII8 equation for the
potential.
The electron charge density is
oo
14
cO
(^) - ~ l c j / (e)/nj£)cl£
~U)
-2-ejj~ te)m_(C)ei£
~ 00
^ te a l/
and the positive charge density is
P
(#) =
f f£)
f
(s)^j£)ct£
=Zzjf^ (£)/*\J£)cJ£ +
(f)^E)oiEi
~oO
~
0Uf-tC<3^
being a distribution function for the positve charge
It is a step function
_c /r ) - ( 0
I
00
> £ ?T
X > £ y <*>'
�The factor 2 accounts forthe two directions of spin.
Assuming that electrons are not excited out of the lower
bands in the metal, the first terms in each expression for
P (*0
are equal but of opposite sign.
Insofar as the
electrons in a metal form a degenerate gas[ll] even at room
temperature, we may replace
(£) by the step function
Combining the two expressions substituting the values of
the net total charge density in the metal Is
/
‘t £AL//
/
The integral
(£)ot£
represents the number density of
j ^*a K
positive charge.
This is constant before and after contact
(no ionic current); therefore, we can change the lower
limit to cAJol+e.AVx.
We get, using (3) P* 6,
�12
We take /nJE) =/^_(e) because we
look at /n(£)
density of states for numbers of particles.
variables in each integral to X
X
=
£
- (u j
0|
Changing
=
an(i
1/),respectively, we have
1*
i
+
i t
p, M
as a
eav J
=
h
=
t|W'
This expression represents the net charge density in
metal 1 as an intrinsic function of distance,
occurring in the variable
UJf(V) .
the distance
We are now ready to com
pute the potential energy variation of an electron in the
metal by means of Poissonfls equation.
B.
Solution of Polsson 8s Equation
We are to solve
cf^
where V is the electrostatic potential and £
constant of free space.
derived in A we see
the dielectric
Substituting the charge density
�13
of U>
/>»
'
cU(
Let
7r.
u>,- - e V/
hl )
being the potential energy of an electron.
y,
*
j
+<^\/),
X
= J-('uj»,+e/SV'J.
and then,
= T-r f
31' ~ 1
A
Placing
X
i
_
A
( Ay,
2 ®fy(
cA /v-
/
L /Xy.V
JL
Z
-
k.
Integrating from J/fW
to
- 1:
the value of y f where /%
dJi
, /J y \'
y;
^y, \
y, u)
„
A t )‘ M
(
,
? *
*
*
I* '''*
-y« >-]
7.
- CO
�14
£
K
/
L
I s
s
u
1I 1( At
I s
XX
-Jyoi
K
Now
a *
- y , -y oi *
A
= 7'0<
,, » *y_, _
-X,Of
where
^
£
- 1
S
u ,ei - u ; , ,
j +
v 0J
=
j+ ^
o/
= ^'/s
Oi
Our equation becomes
Since for a metal
A y t i^ j j
we may expand the first
y.Oi
terrn^ obtaining
fob
cJ .*■
X-
=
K y (j'i r1- * '
*■
neglecting higher order terms.
But
and
y,
=
<^7. =
yoi
+ a_>,
<7 AJ,
L
so
(
and
7 7
^
=
I K ,
f
=
1
Jf, x
*
�15
where we must take the positive sign.
- 0
Integrating from
to rpi
Ay,(*)
s'*
3
/ A tX
T /
- i/M V
k
lu
t
‘
A y/
ajm
A ylc+)
X
A j/'
]/ i K
-
+ ,
&y, f»)
&y, (*)
(o)
Now
Ayto) =
e
C-J W
y/o)
x, X,1' #
~ y o<(v) = e AV,
. a positive
quantity:
y, - y
= Zsjy,
0
= - K
- p
.
/
Thus,
yU.
=
- e
^
C
^
, we have
D,rinl"e ^ ’ J T k T 7 ‘
(5)
J.
w,-w„, = -
(
£ ''/
1^
z. (y)
We proceed in exactly the same manner to find the
charge density and potential energy variation in metal 2.
We find that
Oc>z~ <^>01 ~
where e A V ^
_
it
’
^
^ ^ ^ d.
(A 2- °/
<3h d
£z -
tj
1/ z
/
^
* -X*
is negative^and the negative sign in the expo
nent is used since /p is positive.
�16
To evaluate the unknowns e A Y 3 c-AV * and
5
* we
match the two solutions at the boundary by means of the con
dition that the field strength must be continuous across the
boundary^ and that at infinity m oi
= J
These conditions give respectively
A V
J,
_
'
and
ujcii
or
4Jo
teAV;
- w lttc
and
.
J.z
+
<-f2 = A-l +eAV/
1.
If we assume the effective mass to be the same in metal 1
as in 2, and
i
AV
and
-- AX
X,
Taking
^
£ AA € . then
/
i. -■
/y ^
^ -\ £±1/ y '6-
^
Xf
2. ^
'
x Z e.v. ,
.
*j
^
70i=Je./..„
- ~^ .l 3 e . v: t
A z ~ ' 9e
_ ,//
c a Vl
c a ^ - eil/t =
e£Vz=
^
eAV
=•
- Poi - 2 . 1 3 ,
-Losy
)
/. /7£
i
i
and
J*
=
^
.6?
*
^
tC hV|
- ~ 51 o i V y.,
If the energy bands are such that the Fermi level in
metal 1 is above that of metal 2 the charge flows in the op
posite direction.
same manner.
The calculations proceed in exactly the
�h~
Ll I
<
hUJ
Energy-Band
<
Schematic
Diagram:
f\l
1.
CONTACT
Metal-Metal
AFTER
Contac
ILU
Fierure
BEFORE
CONTACT
-J
h“
Ui
<
Axxx
//
<
ol
�CHAPTER IV
METAL-INSULATOR CONTACTS
A.
G-eneral Behavior
We now consider four cases of metal-insulator con
tacts.
Figure 2 represents the contact between a metal and
an insulator when before contact the Fermi level in the metal
lies above the Fermi level in the insulator, and when the
Fermi level in the metal lies above the bottom of an empty
band in the insulator.
Then electrons can spill from the
half-filled band in the metal into the empty band in the
insulator.
Hence, large charge is lost by the metal from a
small spatial region, and a large amount gained by the in
sulator within a small spatial region.
Figure ^ is the case where before contact the Fermi
level in the metal lies below the Fermi level in the insul
ator and
where the top of a filled band of the insulator
lies above the Fermi level in the metal.
Electrons can
spill from the filled band in the insulator to the half-filled
band in the metal.
Much charge is lost by the Insulator from
a small spatial region, and much gained by the metal within
a small spatial region.
Figure 5 is the case discussed by Mott and Gurney[3]
when in isolation the Fermi level in the metal lies above
�the Fermi level in the insulator, and when the bottom of
the empty band of the insulator lies above the Fermi level
in the metal.
Electrons escape by thermal agitation from
the filled band in the metal to the empty band of the insul
ator.
Small charge is lost by the metal in a small spatial
region and the same amount gained by the insulator in a large
spatial region.
Figure 6 represents the contact when in isolation the
Fermi level in the metal lies below the Fermi level in the
inBulator, and when the top of the filled band of the insul
ator lies below the Fermi level in the metal.
Electrons
escape from the insulator only by thermal agitation from the
filled band in the
metal.
insulator to the
half-filled bandin the
Small charge is lost by the insulator
from a large
spatial region and an equal charge gained by the metal within
a small spatial region.
Calculations which verify these
statements are made in the remaining portion of this chapter.
B.
Case of Large Charge Transfer from Metal to Insulator
From Figure
in the insulator
yi+cA'/l
2 we see that the electron charge density
is given by
X Z * e & v.
2.
/n (E){f£)
U) - -
(tjlif
f
= fj
Fj_ ft-[) -Fj (f)) .
ll "
"
>
-
Letting
y z - K-*
fl [-
oo
the field strength vanishes (by conservation of charge),
we have
U) (F
tf
J {
where
t^eri ~ ^z.
°l
/Y-'
d£
Introducing the relation
5 cO ,
>7
[iz]
pi (^)
t J F3 (°),
=
and integration from o to x we see
/
,
where
UL
_C^s''J, C z
L t T
U ^ = o ) = ctvl- C^
z-
*■
U»i ' ^
£
^
J
-
From Figure 2 we see that K and (J07_ are negative and
is positive, and that they are in the order y 4 U0 <
.
The function /“^ (
) increases rapidly for positive values
/
/
of
, but is small for negative value of U v . If we stay
sufficiently far from U02_ we may retain only the last term
in the denominator.
We have then
U
[/v, 'z oj
T
where Uz ^ U0l-£
» £
being a positive quantity.
This
gives us an intrinsic expression for the potential as a
function of distance in the insulator.
�24
From equation (5) of Chapter II we have the corres
ponding equation for the metal
(if) /*. . ^
M
{St-Zo)
where & A V { is negative.
Equations (3) and (4) contain the unknowns cAVt
and c a Vl ,
They are determined by the conditions that
at the contact the field strength is continuous and that at
infinity
=J
2.
ir^
-J0l - 3 ,
Evaluation of the Quantities eAV, ,eAViand 5
From equation (3) we find that
\
(5 )
_
=_ ^ /7 #| ,/ h j i 4
1J
+ e A / j / tT]
2
’ 'i
/£- O
where we have taken the positive sign since the slope is
everywhere positive; and from (4)
(6 )
J L-°( I
_
- ca
Vt
From our conditions at infinity
(7 )
(8)
= T
Oi
and
ifO I t e. a
or
£ AV, - e ^ l /
v
, - y„.
= s
SO
(9)
=
'Ui
+ 7 0J. ,
�Assuming 3 to lie half way between the bands, we
have jV ^
-
(12)
or
,
where
A
(3
= "T
tV t i
/2.n 1.1c
and
B
-
h°).
( ir iU
'
This equation may be solved graphically for A|
and hence e h V ^ .
electron, and set
,
We take f o r ^ t h e normal mass of the
^
- / , and
V01 =
T = 300° K, R value of
assumed for half the band width (as would be
—8
the value for sodium).
This gives
= .673 x 10
cm and
-
6.26
x 10^ cm _1,
whence B = 2.38 and A = 2.38^3.
For a specific example.
�26
BO
p = Ztl
and
A
= G>“)
}oo | -eAK-f)4T]~F[--(Xx'feAK ' A t Jj
where
Letting
K T { £ - ( \ ■'C*V2 -J-) .
^
* 1
\ tc Al/t - J
W
? t = 2t/ A T -;
�30
Integrating with the boundary conditions that as 4.
the field strength vanishes, we have
121
(£j -
.1
;
Introducing the relatlon[12]
j F ± ( r])d'i + —
3
=-
**
Ir
^
(fi),
V
and integrating from o to x we see
/
2AA'
^ f*
I «■
\t
h ri (Y+tJ)-jFi (y-'feJ-jfl fSf«)+M(-fJj
where
q _ e&Vu
t01
Tr
Here the positive root is extraneous, and we discard it.
If we restrict the upper limit to ^
- f0l -t £
where £ ? o
and is sufficiently large, we may retain only the first
term giving
(3)
h (r + fJ/J *
_
C.AVi
We now have an expression for the potential versus
distance in the insulator.
From Chapter III equation (5) we have the corres
ponding equation for the metal
(J*)
^
= J, - A
We solve f o r e A l / and c
c o h e r e now e_AV, is positive
in equation (3) and (4) by the
condition that at the boundary the field strength must be
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below Fermi Lev^l
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Schematic Energy-Band Diagram;
Fermi Level of Metal
Insulator, lop of Filled Bend of Insulator abov® Top
CONTACT
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continuous and that at infinity
(5)
f
'ai
-f c A [/ r J
dud
I
1.
-i
= J ,
Evaluation of the Quantities e^i/, t e ^ ^ a n d 1 .
From equation (2)
(6 )
-
I
^rjJ
/? [ X X=
f
and
u0l_- -s.frZ.v,,
ot = .2.3
Knowing the shift of ootential and the position of
the Fermi level at equilibrium, we are ready to calculate
the surface and volume charge density in the insulator.
2.
Calculation of the Surface and Volume Charge
Density. As in part 3 of Section B we have for the surface
charge density
kT
W
s
(z f l V
f
z r
,
,1
I F r J f I r i UJp
‘
.
<* ,7h
The variable t has the same values here as in part 3 of
Section B since ^
, therefore, the results are identical
�3^
to those in Table I on page 28 except the charge has the
opposite sign.
The volume charge density has the form
which is also identical with the result of part k of Sec
tion B.
Table II, in the same section is applicable with
the charge of opposite sign.
D.
The Case of Small Charge Transfer from Metal to Insulator
In this example, Figure 5, electrons escape by thermal
agitation from the filled band in the metal to the empty band
of the insulator.
A small amount of charge is lost by the
metal in a small spatial region, and the same amount is gain
ed by the insulator In a large spatial region.
Applying Fermi-DIrac statistics to the energy band
structure we again arrive at the expression
(1 )
for the volume charge density.
Letting X
for Poissonl|s equation
and f
For a specific case let us take
v
£ e /r
If =-//€.k
(pw '
Z-
- ~ * V we have
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5.
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CONTACT
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Schematic Fnergy-Fand Diagram:
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AFTER
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Fermi Level of Metal above Fermi Level
of Metal below Empty Band of Insulator
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We see from the figure that f and
with If*- f
are negative quantities
for all x,and so we may neglect the first term in
the expression for the charge density provided we are not too
far from the contact, giving for Poisson,ls equation
= - g
Since /
/! (!) .
is negative we may also use the series representa-
tion[l2] for /u ( 0
and obtain
n
ti
S- /
If f
S
Is sufficiently large and negative, we may approximate
the series by retaining only the first term.
The error
is about(.6% If f ~~k, and negligibly
small for f-
the greatest value of f
our example.
occurring in
-ZO »
We finally have
=
- 2
j
i-
e f
A
= -g n ( \ ) .
Solving in the usual manner subject to the condition that
at infinity the field strength vanishes, we find
(2)
where
Xu - ATJ^[(Cj-y# +2J
r
=
3^
-('AVrfyr
—
e.
j
j,
D, - C
JrT
(3)
where
For the metal we have
OOf - (jj0i — -
di 1/ C
^1
^
~^
Is negative.
We make use of the boundary conditions at the contact
as before in order to solve for the unknowns' eA\/ , a n d e A V ^ .
�37
It can be shown that t/^Vl is negligible compared with eAl/
We can then take
J ^
^
and
e z>l/ -
~~
z
.
~ 2- 2-3e i/
The surface charge density is computed in the usual manner:
w
w
-
with*
U
x
i r - f z
= c
( o)
/
=
3
,
^ 'J
^ ^
roj - ^ _ c^,i/ - - f.
oi
S'Td7c out C*n toS /
«•
4,
/OWi .
The volume charge density is
(si p, w - - ^ ( z g a f r a ) /
-
“ «.(*) =
[ r { h - r ) - r i (r)j .
PoIssones equation becomes
n
where T£_--C l/ > f - - { X ^
and
&TT \ L(z^kT)
=
-j—
\— ^ — J
We solve In the same manner as
Section D,except
that we
neglect the second term in (l)
compared with the first,
obtaining
(2)
IT = - ft T
=
with
L
Q
+ (£i)%]
' kl
e
A
{s%z°)
and
= P(\)QX .
.
(&V-VAkT
C *
J
t
*'/$t
For the metal
where
we have O'- tuffi- - e
l/ c
(•*■ £ o)
is positive.
Making use of the boundary conditions as before, we
solve for cAl/
and e A
ible compared with e h l ^
example, take
then
^
.
As
in Section
, and so jf ^
c - Jc .v.
e AV£ - J - lg7 +_|T =
- / ev/"
^
is neglig
. As a specific
s
*“
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Figure
CONTACT
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6.
AFTER
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ZD
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Schematic Fnergy-Band Diagram:
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The surface and volume charge densities follow the
same form as those of Section D with the exception that the
charge is of opposite sign.
It is, therefore, not worth
while to discuss this case further here.
�CHAPTER V
INSULATOR-INSULATOR CONTACTS
A.
General Behavior
In this chapter we discuss two cases of lnsulator-
insulator contacts.
The energy band structure is represent
ed in Figures 7 and 8.
Figure 7 illustrates conditions
where electrons can escape from the left-hand insulator to
the right-hand one only by thermal agitation from a filled
band into an empty band at higher energy.
charge
(perhaps 10"”
Hence, small
statcoulombs /cm2 ) is lost by the left-
hand insulator from a large spatial region (perhaps 10
fi
n
A )
and an equal charge gained by the right-hand insulator within
a large spatial region.
B’igure 8 is the case where electrons
can spill from the filled band of the left-hand material into
the empty band of the right-hand material.
Large charge, say
k
2
10
statcoulombs /cm , is lost by the left-hand insulator
from a small spatial region, say
10 A°, and equal and oppo
site charge is gained by the right-hand material in a small
spatial region.
The following calculations give the quanti
tative data of the previous arguments.
B.
Case of Small Charge Transfer
The insulator on the right has a band structure
identical with that of the insulator in Figure 5.
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We have, therefore, a volume charge density
(1)
^
= y,7 e
[
(1-r)
ff)J
- /p
The solution of Poisson®s equation is
(2 )
where
J)
and
B2.
=
=
r
a
1
J
r(k)
_ -3*
1
7 T e
*
The insulator on the left has
lar to
~feAV/*
a band
that of theinsulator in Figure
structure simi
6.The volume
density is
(3)
f / V - //Te
f^JLL'j’'^/T r>,_
- P ffjj
^
and the solution of Poisson“s equation is
/.
(A)
= -ZkTJy,[-(C^
r,
2> * e
where
and
B
=
/
'■y
t
P,J >
r
J C' ~
(*£*)
3,
{cA^' s)/* T
7r &
A P (\)
/
'
After equilibrium has been reached we see from
Figure 7 that at infinity
(5)
(6)
and
+
- |T - J
,
charge
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Fermi Level of Insulator 1 above Fermi Level
Insulator 1 below Lmpty Band of Insulator D
h-
Schematic Energy-Band Diagram:
of Insulator ?» Filled Band of
AFTER
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Figure
BEFORE
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These equations along with the condition at the
boundary that the field strength must be continuous deter
mine the unknowns
and eA\/ .
From (2) and (3) respectively
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