Mathematical Methods for Physics and Engineering : A Comprehensive Guide

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INTEGRAL EQUATIONS


we may write thenth-order approximation as


yn(x)=f(x)+

∑n

m=1

λm

∫b

a

Km(x, z)f(z)dz. (23.35)

The solution to the original integral equation is then given by y(x)=

limn→∞yn(x),provided the infinite series converges. Using (23.35), this solution


may be written as


y(x)=f(x)+λ

∫b

a

R(x, z;λ)f(z)dz, (23.36)

where theresolvent kernelR(x, z;λ) is given by


R(x, z;λ)=

∑∞

m=0

λmKm+1(x, z). (23.37)

Clearly, the resolvent kernel, and hence the series solution, will converge

providedλis sufficiently small. In fact, it may be shown that the series converges


in some domain of|λ|provided the original kernelK(x, z) is bounded in such a


way that


|λ|^2

∫b

a

dx

∫b

a

|K(x, z)|^2 dz < 1. (23.38)

Use the Neumann series method to solve the integral equation

y(x)=x+λ

∫ 1


0

xzy(z)dz. (23.39)

Following the method outlined above, we begin with the crude approximationy(x)≈
y 0 (x)=x. Substituting this under the integral sign in (23.39), we obtain the next approxi-
mation


y 1 (x)=x+λ

∫ 1


0

xzy 0 (z)dz=x+λ

∫ 1


0

xz^2 dz=x+

λx
3

,


Repeating the procedure once more, we obtain


y 2 (x)=x+λ

∫ 1


0

xzy 1 (z)dz

=x+λ

∫ 1


0

xz

(


z+

λz
3

)


dz =x+

(


λ
3

+


λ^2
9

)


x.

For this simple example, it is easy to see that by continuing this process the solution to
(23.39) is obtained as


y(x)=x+

[


λ
3

+


(


λ
3

) 2


+


(


λ
3

) 3


+···


]


x.

Clearly the expression in brackets is an infinite geometric series with first termλ/3and

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