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Solution of some problems of adjoining by reduction to the generalized riemann problem
SOLUTION OF SOME PROBLEMS OF ADJOINING BY REBUCTION TO THE GENERALIZED RIEMANN PROBLEM (RESBENIE NEKOTORYKR ZADACS SOPRXAKRENIIA SVEDKNIRR K OBOBSBCHENNOI ZADACBE RIMANA) PMM
Vo1.27, No.2, 1963, pp.
E.V.
351-355
SKVORTSOV. 8. Kh. FARZAN and A. Ia. CXILAP (Kazan) (Received
July
5,
1962)
In this work, we understand bF the problem of adjoining, the problem of finding in some two-dimensional region D, the solution of the equation div(k grad p) = 0 under the condition that the coefficient k is a piecewise continuous function of the x, y coordinates. On the boundaries y where the coefficient k is discontinuous the following conditions of adjoining must be fulfilled
P+ = P->
k+(g)+=&)_
(1)
Here the subscripts minus and plus denote the limiting values of the function at the boundaries y of discontinuity; II is the normal to y. The solution function p(x, y) has singularities of the logarithmic type in the region D, and if D has a boundary r, the function p(x, y) must satisfy on the r boundary conditions of the first, second, or third kind. This problem has many applications. For example, in underground hydromechanics a function p, which satisfies the conditions given above, determines the pressure field in a piece-wise inhomogeneous oil-containing layer subjected to water pressure and to the linear law of ffltration; in the electromagnetic theory, the function p yields the statistfcal distribution of temperature in a piece-wise nonuniform heat conducting medium. The proposed problem is reduced by the method presented in flf and t21 to a singular integral equation (or a system of equations) for the determination of the solution function p(x, y) on y. The
519
520
Skvortsov,
E.V.
resulting
equation
problem
[41 by the
Hadamard type.
be easily
problems
of
adjoining
on the
takes
on a value p has
2.
value
circle
3.
The region
k,
=
A(q,, k is
(bly
4. tion
=
y<
p)
the the
y
D is
the
region
is
D is
k is point
two
of
solution obtained
of
we shall physics
conduction,
We shall
D_,
k
in which the
6 D,,
func-
a circle
of
<
the
1,
y is
radius;
region
the
+ b2x
the
the
k
point
coefficient
p = 0.
- p
+ cly)
In the
at
Im t < 0)
function
+ blx
yo).
unit
a singularity
- a < x < 6,
k2 = (a2
k = k2 =
where
with the real axis. In the z = x + iy), the coefficient
by (Iz(
In the
singularity
circle,
region
The equa-
< 8.
a f and
x <
P(X,
a, y)
- p f has a
D_(a < x < 6, - p f
+ c~Y)~.
On the
boundary
of
have
problems inclusion usefulness
problems
of
been
in this
solved
before
by methods
article
makes it
and correctness
adjoining
of
our
by comparing
possible
our new approach results
with
earlier.
Let us consider
forms
is
these the
heat
the real axis. in which k
D,,
A(x,,,yo)
this
p has
kl = (al
A(xo, k
demonstrate
of
of
function
x = a.
for
Finally.
y is
a logarithmic
of
coincides Im z > 0,
a rectangle: y is
Their
areas
exterior
D_ given
from ours.
the
concrete
following:
p = 0.
The first
to
the
half-plane
point
and p has
the
interior
different
those
lower
Riemann problem
Among the
work are
Cauchy-
the boundary y is the circumThe region D+ is the interior of
When (~1 = 1,
coefficient
us to
cases.
Riemann
the
plane;
radius.
and the
+ c~)~.
function
entire
= const.
D_
at the
the
0 the
the unit
coefficient
singularity
of
singularity.
k = k,
boundary
generalized
generalized
of
At a certain
circle which by (I z( < 1,
The region of
the
The boundary the upper half-plane
and the
= const.
+ Q2.
(b2y
entire
Chilap
integrals
the obtained
in a number
plane.
8,);
In the
yo). k2
of
A.la.
to of
the
of
where
diameter of this region D,, given is
reduced
in this
D is
A(r,,
and
properties
= const,
k, kg
a circle
at a point const.
in turn the
considered
a logarithmic
of
Farran
two subregions:
The region
ference this
D is
D into
takes tion
of
obtained
The region
1.
divides
then
use
The solution
can then
It
is
R.Kh.
seek
show that
the
and mechanics underground the
first
a function
such
problems as the
of
hydromechanics one of p(x,
y)
the
of
arise
in many
electromagnetism,
and others.
four
in the
adjoining
theories
mentioned
regions
D,
problems. and D_ of
the
Problems
of
the
generalized
$
(2, Y) =
p+
P
Rienann
ydt
(8 (t
_
x)2
521
problem
(2)
G
ya +
+
5p Q)it - ydt
p- (2, Y) = - -+
(3)
%)a+ ya
-co
respectively. axis;
Here p(t)
G is
Green’s
stands
function C=&ln
The quantity
Q is
The solution of the tions (1) identically; following
integral
the
for
for
the unknown function
the
1
upper
(z -
2oY + (Y -
YO12
b -
zoja +
(Y +
YOP
the
source
intensity
of
assumed form satisfies the second one of equation
for
the
s P
4,
For the analytic
solution
0)
of
(t
kl + ks
equation
real
at the
point
A(%,,,
first one of the conditions yields
Q
d”,)P =
this
the these
determination
0;)
on the
half-plane
of
yo).
condithe
p(t):
~34 YO=
@-
we introduce
the
(5)
piece-wise
function
& y
Q, (4 =
P 0) g$
---a)
The limiting
values
of
this
function
and of
its
derivative
have
the
form
Here,
the
integral
Cauchy principal Cauchy-Hadamard the
following
in the
first
formula
or, with the introduction f.&+ -
is
to mean the
it is taken in the (5) is reduced to
of f#ll-
a new function =
the
simplest
The solution
Q?l”
P-
problem is
1
QYO
ni (/cl + k2) (I _
(k, t
nl
This
interpreted
formula equation
Riemann problem:
@‘+ tx) + @‘- tx) =
continuity.
is
while in the second value, sense. With the aid of (6).
of
given
kz) (x -
zo)2 +
ol(z),
(7
yo2
to
the
form
1 ~0)~+ yo*
determining by an integral
a function of
the
by its Cauchy
distype
522
E.V.
Skvortsov,
1
(4 =
Suppose of
of
Cauchy’
Farzan
A.Ia.
ni (kl + b) [(t --zo12
density
9(t)
and
Chilap
4” s
us denote
values
R.Kh.
= q+(t)
integral
that
are
s formula
we have
analytic
and 9-(t)
in D,
@‘1+ (4 = ‘p+ (4 + cp- (a),
4
by q(t).
where 9’(t)
+ 9-(t).
functions
Y021(t
and fl_.
ml- (z) = -
‘p-
are
Then,
the
boundary
on the
basis
(4 + cp- (-1
Since
QY~
cp(4 =
ni
(b
+
1 k2)
(t
-
Q
zoJ2
+
yo2
i
3
t-xo+iyo
1
i
1
2ni (ICI+ k2)
=
t-x0-iy,
-
then
@I+(Z)= since
and,
O’+ = Ol+,
s
P(X) =
Q
on the
PI+ (2, Y) = rt In accordance
the
2n (kl +
formulas
Cauchy’s
Y) =
2n
(2),
1
Direct
verification
In the
second
-
-
(6).
x0J2
that
+
~021
-I-
cd
we have
x012
+
Yo21+ cd
t-z
dt
we obtain
k2)
~0)~+ (Y f YOYI + c
(8) (9)
p- (2, Y) = p.- (2, Y)
the
functions
given
by (8)
and (9)
conditions.
problem
is
[(t
---a,
(k;+ In 1(x-
it
is
convenient i0,
z = rP, The solution
[ix
and (3).
0x 2i (In
formula
shows that
the required
{In
k2)
s
P+ (5, Y) = PI+ (x, Y) + G,
satisfy
2n (/cl +
by formula
Q
x0) dx
~JC(hQf k2) IrnSi
with
PI* h
we find,
x0)2 + yo2 =
of
Q k2) -z - 1 ZO
ml- (2) =
To ’
= - a),-,
(x (2 -
basis
1
k*) z -
O’-
Q
n (kl + k2)
Thus,
-
2r, (k1 +
zo = roe
sought
in the
p+ (rr6) = 5.
c 0
p (4
use
the notation
,
form
2x
1
to
i -
1 - r2 2r cos (0 _ 6) +
r2
da +
G
(10)
of
Problems
the
generalized
Riemann
523
problem
(11)
where rzr$ C=&
The
second
equation
for
condition the
of
-zi
s
P
.
2rro COS (0 2rrO COS (0 -
adjoining
determination
of
2x
1
-
In -yoc
1
leads
=
(
2n (kr + ks)
0
The
integral
Radamard tion
o(z)
The IZI
on the
sense.
For
and
its
limiting
= 1,
left-hand
the
the
following
integral
1is
of
this
as
z
ro2 - 1 2r0 cos ($ - 00) + here
understood
equation
+ i)
r$ in
the
we introduce
(12)
Cauchya func-
derivative
values
are
side
solution
to
1 P
p(o)
Q
(4 dJ
sin” (5 -$)/F
00) + f3O)+
equal
of
o’(z).
approaches
the
circumference
to
Hence 277
1
da
4n
s
9)/Z] = -
sin” I(5 -
p (‘)
(@‘+ (0) + W- (0))
(13)
0
P(N The
equation
(12)
is
=
thus
w+ (0)
Solving
this
reduced
p(o)=Finally,
2n (kr + ks)
problem,
from
P+(r, 0) = -
(0) do (14)
0
Q @‘+ + @‘- =
w-
-
we obtain
(
to
the
Riemann
problem
1 - r,l 2r0 c0s (9 - OO)+
1-
by means
of
(14)
r$
the
-
i)
function
2n (/clQf ka) [In(o--J-)+ln(~--ZO)-lno]+c, (10)
n
and
(11)
we obtain
tklQ+In 1/r%+? k2)
-
2rro cos (O -
eo) + 1 + G + c
p(o)
E-V.
524
P- k‘
8) = -
-$$
R.Kh.
Skuortsou,
tinI’+ c/QQ+
-
ka)
In the problems harmonic functions
Fartan
2PP,
cos
and
(0 -
eo} +
ro= -
ln r) - i&Y&Inr+c
3 and 4 we pass from the functions
a*(~,
p*(s, y) by means of the substitutions
Q
p+1/&T- IL++
2x
p-v7&
Jfk;
The conditions
of adjoining
In problem 3,
the solution,
y) to
u-
(15)
”
where k, is the value of the coefficient
sought
Chila
A.la.
kI at the point
on y for
the functions
which satisfies
A(xo,
yo).
uf take the form
the conditions
(16).
iS
in the form
5 {
IL* (2, y) = f
(4
YU
(qy -
1 %)a + y%-
-1
1
(1 - zz)B+ r%’ 1 d.S
I
u-P, Y) = -
5
s
YU W
-1
Condition
leads
(17)
(T -
now to an integral
s -i l
1
u (4 - z
u (4
--
(T _
1 %)a
(1
-1
1
1 r)Z + ya -
-l
(I-Tz)a++ya
equation
&s 1dT-
Pi
(2 _
is Green’s
function
Let
introduce
us
for
20) (2 ;o) (a _
20-9 G-1)
the semicircle
the piece-wise
analytic
for
function
aZ
(19)
1 d*
U(Z)
ix (z, 20)
Here
G(2,4 = In tz
w
1 i/=0
=
0
(20)
Problems
and its
derivative
of
the
generalized
Riemann
525
problem
a’(z).
equation (2) can be reduced to the With the aid of these functions, generalized Riemann problem of finding a piece-wise analytic function from conditions given on the real axis
ia@+ (x)
@‘+(x) + a’+ (4 +
(0” (xj + iacft- (2) -
= -
-$-CD+ (xj =
-
$- W(x)
cp’- (2) +
afif (2)
for
(+)
+ $f
Isl
for I x I>
1
where f (4
for
=
(x_;o;i+yo.
2iyo
-
1% (a?
+
(20~ +
yo?
!/OS) -
ro1* +
$4
Solving this problem, and making use of the formulas the limiting values of the function (0 on y, we find
of Sokhotskii that. for
IA < 1 u (2) = F (z) -
BXco9 ax -
Ba sin a2
where B
F (1) + F (2 cos a
=
1
co9 ff (z -
F (4
SYO
expx0” +
-
I
yea cosa(z-
PO
C-V
c
a1 (‘r/(x -
(x
~a-1
+
exp
x
2
w0
u. (x -
sin
-
20)
bo’
Y#
cos
a
a”
( V
(+ -
+
II
tar’
-
YO 1
Yo”) + I
+
-
s*sl 20) +
-
z-
Q tx
xola
-4
y”*
$0) +
n
un-’ -
L 6-V
“-_5
b-~0)
60’ + Yo’)’-
Yo
x0’ + yes co9
YO*-
(z-20)*+
n.n! -
+
2 sin a
1/
zo) Ina
20)
x0)*
20)~
u
F PI - F(-
Ba =
’
zO)In 0 V(Z -
- sin a (x +
1)
ZO
310 I
-
aroS I (soa+ y,l,l) n X
(x - 20)boa+ y’o) YO
n
Here. the summation on n (and later on m) is performed from 1 to m. Omitting the details, which are analogous to the preceding ones, we now give the result for the fourth problem
526
E.V.
Skvortsov,
xx
Ll.Kh.
Farzan
I)%
(-
m2 j rJa +
/ p”
a2Pn (~1 +
hr0
+
A.Ia.
Chilap
mrc (~0 + a) 2a
.
$
s’n
4Q (d + CZY)
‘4- (5, Y) =
and
2
I
p4~~+--2)m
~1~0)
I*
x
inn (8 -
sin inn (Y + PI / 31 sin Inn (~0 + P) I281 (d + c2Y)2cochnn (6 - a) _-n
X
C(c + ClY) coth ?+
c +
ClY
33
I 33
4
/ 331
X
e + fy (c + av) Js
l)mm sin ma (% + a) m2/aa + na/ pa 2a 1 (-
xX where
c = a1 + blu,
d =
aa +
bzr,
e =
cbl -dbl,
f = blcl -
hs
BIBLIOGRAPHY 1.
Chilap,
A. Ia.,
K zadache
neodnorodnykh fields gas 2.
in No.
Chilap, plaste layer). Kazan.
3.
Chikin,
4.
1,
polia
problem
nonhomogeneous
of
davlenii
v kusochno-
determining
layers).
IZV.
the
Pressure
UUZOV, Neft’
i
1961.
A. Ia.,
Pole
davlenii
(Pressure
field
Otchetnaia
v kusochno-neodnorodnom in a piece-wise
nauchnaia
sektorial’nom
nonhomogeneous
konferentsia
Kazansk.
sector un-ta
za 1961.
1962. L. A.,
Osobye
nykh
problem
and of
Gakhov,
(On the
piece-wise
integral’ un-ta
ob opredelenii
plastakh
Vol.
113,
sluchai
kraevoi
zadachi
Rimana
uravnenii
(Special
cases
of
Riemann’
singular
integral
equations).
Uch.
No.
F. D. , Kraevye
10,
i singuliarnykh s boundary zap.
value
Kazansk.
1953.
zadachi
(Roundary
Value
Problems).
GIFML,
1958.
Translated
by H.P.T.
Vo1.27, No.2, 1963, pp.
E.V.
351-355
SKVORTSOV. 8. Kh. FARZAN and A. Ia. CXILAP (Kazan) (Received
July
5,
1962)
In this work, we understand bF the problem of adjoining, the problem of finding in some two-dimensional region D, the solution of the equation div(k grad p) = 0 under the condition that the coefficient k is a piecewise continuous function of the x, y coordinates. On the boundaries y where the coefficient k is discontinuous the following conditions of adjoining must be fulfilled
P+ = P->
k+(g)+=&)_
(1)
Here the subscripts minus and plus denote the limiting values of the function at the boundaries y of discontinuity; II is the normal to y. The solution function p(x, y) has singularities of the logarithmic type in the region D, and if D has a boundary r, the function p(x, y) must satisfy on the r boundary conditions of the first, second, or third kind. This problem has many applications. For example, in underground hydromechanics a function p, which satisfies the conditions given above, determines the pressure field in a piece-wise inhomogeneous oil-containing layer subjected to water pressure and to the linear law of ffltration; in the electromagnetic theory, the function p yields the statistfcal distribution of temperature in a piece-wise nonuniform heat conducting medium. The proposed problem is reduced by the method presented in flf and t21 to a singular integral equation (or a system of equations) for the determination of the solution function p(x, y) on y. The
519
520
Skvortsov,
E.V.
resulting
equation
problem
[41 by the
Hadamard type.
be easily
problems
of
adjoining
on the
takes
on a value p has
2.
value
circle
3.
The region
k,
=
A(q,, k is
(bly
4. tion
=
y<
p)
the the
y
D is
the
region
is
D is
k is point
two
of
solution obtained
of
we shall physics
conduction,
We shall
D_,
k
in which the
6 D,,
func-
a circle
of
<
the
1,
y is
radius;
region
the
+ b2x
the
the
k
point
coefficient
p = 0.
- p
+ cly)
In the
at
Im t < 0)
function
+ blx
yo).
unit
a singularity
- a < x < 6,
k2 = (a2
k = k2 =
where
with the real axis. In the z = x + iy), the coefficient
by (Iz(
In the
singularity
circle,
region
The equa-
< 8.
a f and
x <
P(X,
a, y)
- p f has a
D_(a < x < 6, - p f
+ c~Y)~.
On the
boundary
of
have
problems inclusion usefulness
problems
of
been
in this
solved
before
by methods
article
makes it
and correctness
adjoining
of
our
by comparing
possible
our new approach results
with
earlier.
Let us consider
forms
is
these the
heat
the real axis. in which k
D,,
A(x,,,yo)
this
p has
kl = (al
A(xo, k
demonstrate
of
of
function
x = a.
for
Finally.
y is
a logarithmic
of
coincides Im z > 0,
a rectangle: y is
Their
areas
exterior
D_ given
from ours.
the
concrete
following:
p = 0.
The first
to
the
half-plane
point
and p has
the
interior
different
those
lower
Riemann problem
Among the
work are
Cauchy-
the boundary y is the circumThe region D+ is the interior of
When (~1 = 1,
coefficient
us to
cases.
Riemann
the
plane;
radius.
and the
+ c~)~.
function
entire
= const.
D_
at the
the
0 the
the unit
coefficient
singularity
of
singularity.
k = k,
boundary
generalized
generalized
of
At a certain
circle which by (I z( < 1,
The region of
the
The boundary the upper half-plane
and the
= const.
+ Q2.
(b2y
entire
Chilap
integrals
the obtained
in a number
plane.
8,);
In the
yo). k2
of
A.la.
to of
the
of
where
diameter of this region D,, given is
reduced
in this
D is
A(r,,
and
properties
= const,
k, kg
a circle
at a point const.
in turn the
considered
a logarithmic
of
Farran
two subregions:
The region
ference this
D is
D into
takes tion
of
obtained
The region
1.
divides
then
use
The solution
can then
It
is
R.Kh.
seek
show that
the
and mechanics underground the
first
a function
such
problems as the
of
hydromechanics one of p(x,
y)
the
of
arise
in many
electromagnetism,
and others.
four
in the
adjoining
theories
mentioned
regions
D,
problems. and D_ of
the
Problems
of
the
generalized
$
(2, Y) =
p+
P
Rienann
ydt
(8 (t
_
x)2
521
problem
(2)
G
ya +
+
5p Q)it - ydt
p- (2, Y) = - -+
(3)
%)a+ ya
-co
respectively. axis;
Here p(t)
G is
Green’s
stands
function C=&ln
The quantity
Q is
The solution of the tions (1) identically; following
integral
the
for
for
the unknown function
the
1
upper
(z -
2oY + (Y -
YO12
b -
zoja +
(Y +
YOP
the
source
intensity
of
assumed form satisfies the second one of equation
for
the
s P
4,
For the analytic
solution
0)
of
(t
kl + ks
equation
real
at the
point
A(%,,,
first one of the conditions yields
Q
d”,)P =
this
the these
determination
0;)
on the
half-plane
of
yo).
condithe
p(t):
~34 YO=
@-
we introduce
the
(5)
piece-wise
function
& y
Q, (4 =
P 0) g$
---a)
The limiting
values
of
this
function
and of
its
derivative
have
the
form
Here,
the
integral
Cauchy principal Cauchy-Hadamard the
following
in the
first
formula
or, with the introduction f.&+ -
is
to mean the
it is taken in the (5) is reduced to
of f#ll-
a new function =
the
simplest
The solution
Q?l”
P-
problem is
1
QYO
ni (/cl + k2) (I _
(k, t
nl
This
interpreted
formula equation
Riemann problem:
@‘+ tx) + @‘- tx) =
continuity.
is
while in the second value, sense. With the aid of (6).
of
given
kz) (x -
zo)2 +
ol(z),
(7
yo2
to
the
form
1 ~0)~+ yo*
determining by an integral
a function of
the
by its Cauchy
distype
522
E.V.
Skvortsov,
1
(4 =
Suppose of
of
Cauchy’
Farzan
A.Ia.
ni (kl + b) [(t --zo12
density
9(t)
and
Chilap
4” s
us denote
values
R.Kh.
= q+(t)
integral
that
are
s formula
we have
analytic
and 9-(t)
in D,
@‘1+ (4 = ‘p+ (4 + cp- (a),
4
by q(t).
where 9’(t)
+ 9-(t).
functions
Y021(t
and fl_.
ml- (z) = -
‘p-
are
Then,
the
boundary
on the
basis
(4 + cp- (-1
Since
QY~
cp(4 =
ni
(b
+
1 k2)
(t
-
Q
zoJ2
+
yo2
i
3
t-xo+iyo
1
i
1
2ni (ICI+ k2)
=
t-x0-iy,
-
then
@I+(Z)= since
and,
O’+ = Ol+,
s
P(X) =
Q
on the
PI+ (2, Y) = rt In accordance
the
2n (kl +
formulas
Cauchy’s
Y) =
2n
(2),
1
Direct
verification
In the
second
-
-
(6).
x0J2
that
+
~021
-I-
cd
we have
x012
+
Yo21+ cd
t-z
dt
we obtain
k2)
~0)~+ (Y f YOYI + c
(8) (9)
p- (2, Y) = p.- (2, Y)
the
functions
given
by (8)
and (9)
conditions.
problem
is
[(t
---a,
(k;+ In 1(x-
it
is
convenient i0,
z = rP, The solution
[ix
and (3).
0x 2i (In
formula
shows that
the required
{In
k2)
s
P+ (5, Y) = PI+ (x, Y) + G,
satisfy
2n (/cl +
by formula
Q
x0) dx
~JC(hQf k2) IrnSi
with
PI* h
we find,
x0)2 + yo2 =
of
Q k2) -z - 1 ZO
ml- (2) =
To ’
= - a),-,
(x (2 -
basis
1
k*) z -
O’-
Q
n (kl + k2)
Thus,
-
2r, (k1 +
zo = roe
sought
in the
p+ (rr6) = 5.
c 0
p (4
use
the notation
,
form
2x
1
to
i -
1 - r2 2r cos (0 _ 6) +
r2
da +
G
(10)
of
Problems
the
generalized
Riemann
523
problem
(11)
where rzr$ C=&
The
second
equation
for
condition the
of
-zi
s
P
.
2rro COS (0 2rrO COS (0 -
adjoining
determination
of
2x
1
-
In -yoc
1
leads
=
(
2n (kr + ks)
0
The
integral
Radamard tion
o(z)
The IZI
on the
sense.
For
and
its
limiting
= 1,
left-hand
the
the
following
integral
1is
of
this
as
z
ro2 - 1 2r0 cos ($ - 00) + here
understood
equation
+ i)
r$ in
the
we introduce
(12)
Cauchya func-
derivative
values
are
side
solution
to
1 P
p(o)
Q
(4 dJ
sin” (5 -$)/F
00) + f3O)+
equal
of
o’(z).
approaches
the
circumference
to
Hence 277
1
da
4n
s
9)/Z] = -
sin” I(5 -
p (‘)
(@‘+ (0) + W- (0))
(13)
0
P(N The
equation
(12)
is
=
thus
w+ (0)
Solving
this
reduced
p(o)=Finally,
2n (kr + ks)
problem,
from
P+(r, 0) = -
(0) do (14)
0
Q @‘+ + @‘- =
w-
-
we obtain
(
to
the
Riemann
problem
1 - r,l 2r0 c0s (9 - OO)+
1-
by means
of
(14)
r$
the
-
i)
function
2n (/clQf ka) [In(o--J-)+ln(~--ZO)-lno]+c, (10)
n
and
(11)
we obtain
tklQ+In 1/r%+? k2)
-
2rro cos (O -
eo) + 1 + G + c
p(o)
E-V.
524
P- k‘
8) = -
-$$
R.Kh.
Skuortsou,
tinI’+ c/QQ+
-
ka)
In the problems harmonic functions
Fartan
2PP,
cos
and
(0 -
eo} +
ro= -
ln r) - i&Y&Inr+c
3 and 4 we pass from the functions
a*(~,
p*(s, y) by means of the substitutions
Q
p+1/&T- IL++
2x
p-v7&
Jfk;
The conditions
of adjoining
In problem 3,
the solution,
y) to
u-
(15)
”
where k, is the value of the coefficient
sought
Chila
A.la.
kI at the point
on y for
the functions
which satisfies
A(xo,
yo).
uf take the form
the conditions
(16).
iS
in the form
5 {
IL* (2, y) = f
(4
YU
(qy -
1 %)a + y%-
-1
1
(1 - zz)B+ r%’ 1 d.S
I
u-P, Y) = -
5
s
YU W
-1
Condition
leads
(17)
(T -
now to an integral
s -i l
1
u (4 - z
u (4
--
(T _
1 %)a
(1
-1
1
1 r)Z + ya -
-l
(I-Tz)a++ya
equation
&s 1dT-
Pi
(2 _
is Green’s
function
Let
introduce
us
for
20) (2 ;o) (a _
20-9 G-1)
the semicircle
the piece-wise
analytic
for
function
aZ
(19)
1 d*
U(Z)
ix (z, 20)
Here
G(2,4 = In tz
w
1 i/=0
=
0
(20)
Problems
and its
derivative
of
the
generalized
Riemann
525
problem
a’(z).
equation (2) can be reduced to the With the aid of these functions, generalized Riemann problem of finding a piece-wise analytic function from conditions given on the real axis
ia@+ (x)
@‘+(x) + a’+ (4 +
(0” (xj + iacft- (2) -
= -
-$-CD+ (xj =
-
$- W(x)
cp’- (2) +
afif (2)
for
(+)
+ $f
Isl
for I x I>
1
where f (4
for
=
(x_;o;i+yo.
2iyo
-
1% (a?
+
(20~ +
yo?
!/OS) -
ro1* +
$4
Solving this problem, and making use of the formulas the limiting values of the function (0 on y, we find
of Sokhotskii that. for
IA < 1 u (2) = F (z) -
BXco9 ax -
Ba sin a2
where B
F (1) + F (2 cos a
=
1
co9 ff (z -
F (4
SYO
expx0” +
-
I
yea cosa(z-
PO
C-V
c
a1 (‘r/(x -
(x
~a-1
+
exp
x
2
w0
u. (x -
sin
-
20)
bo’
Y#
cos
a
a”
( V
(+ -
+
II
tar’
-
YO 1
Yo”) + I
+
-
s*sl 20) +
-
z-
Q tx
xola
-4
y”*
$0) +
n
un-’ -
L 6-V
“-_5
b-~0)
60’ + Yo’)’-
Yo
x0’ + yes co9
YO*-
(z-20)*+
n.n! -
+
2 sin a
1/
zo) Ina
20)
x0)*
20)~
u
F PI - F(-
Ba =
’
zO)In 0 V(Z -
- sin a (x +
1)
ZO
310 I
-
aroS I (soa+ y,l,l) n X
(x - 20)boa+ y’o) YO
n
Here. the summation on n (and later on m) is performed from 1 to m. Omitting the details, which are analogous to the preceding ones, we now give the result for the fourth problem
526
E.V.
Skvortsov,
xx
Ll.Kh.
Farzan
I)%
(-
m2 j rJa +
/ p”
a2Pn (~1 +
hr0
+
A.Ia.
Chilap
mrc (~0 + a) 2a
.
$
s’n
4Q (d + CZY)
‘4- (5, Y) =
and
2
I
p4~~+--2)m
~1~0)
I*
x
inn (8 -
sin inn (Y + PI / 31 sin Inn (~0 + P) I281 (d + c2Y)2cochnn (6 - a) _-n
X
C(c + ClY) coth ?+
c +
ClY
33
I 33
4
/ 331
X
e + fy (c + av) Js
l)mm sin ma (% + a) m2/aa + na/ pa 2a 1 (-
xX where
c = a1 + blu,
d =
aa +
bzr,
e =
cbl -dbl,
f = blcl -
hs
BIBLIOGRAPHY 1.
Chilap,
A. Ia.,
K zadache
neodnorodnykh fields gas 2.
in No.
Chilap, plaste layer). Kazan.
3.
Chikin,
4.
1,
polia
problem
nonhomogeneous
of
davlenii
v kusochno-
determining
layers).
IZV.
the
Pressure
UUZOV, Neft’
i
1961.
A. Ia.,
Pole
davlenii
(Pressure
field
Otchetnaia
v kusochno-neodnorodnom in a piece-wise
nauchnaia
sektorial’nom
nonhomogeneous
konferentsia
Kazansk.
sector un-ta
za 1961.
1962. L. A.,
Osobye
nykh
problem
and of
Gakhov,
(On the
piece-wise
integral’ un-ta
ob opredelenii
plastakh
Vol.
113,
sluchai
kraevoi
zadachi
Rimana
uravnenii
(Special
cases
of
Riemann’
singular
integral
equations).
Uch.
No.
F. D. , Kraevye
10,
i singuliarnykh s boundary zap.
value
Kazansk.
1953.
zadachi
(Roundary
Value
Problems).
GIFML,
1958.
Translated
by H.P.T.