Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(Darren Dugan) #1

23.3 Operator notation and the existence of solutions


In fact, we shall be concerned with various special cases of (23.4), which are

known by particular names. Firstly, ifg(x) = 0 then the unknown functiony(x)


appears only under the integral sign, and (23.4) is called a linear integral equation


of the first kind. Alternatively, ifg(x) = 1, so thaty(x) appears twice, once inside


the integral and once outside, then (23.4) is called a linear integral equationof


the second kind. In either case, iff(x) = 0 the equation is calledhomogeneous,


otherwiseinhomogeneous.


We can distinguish further between different types of integral equation by the

form of the integration limitsaandb. If these limits are fixed constants then the


equation is called aFredholmequation. If, however, the upper limitb=x(i.e. it


is variable) then the equation is called aVolterraequation; such an equation is


analogous to one with fixed limits but for which the kernelK(x, z)=0forz>x.


Finally, we note that any equation for which either (or both) of the integration


limits is infinite, or for whichK(x, z) becomes infinite in the range of integration,


is called asingularintegral equation.


23.3 Operator notation and the existence of solutions

There is a close correspondence between linear integral equations and the matrix


equations discussed in chapter 8. However, the former involve linear, integral rela-


tions between functions in an infinite-dimensional function space (see chapter 17),


whereas the latter specify linear relations among vectors in a finite-dimensional


vector space.


Since we are restricting our attention to linear integral equations, it will be

convenient to introduce the linear integral operatorK,whoseactiononan


arbitrary functionyis given by


Ky=

∫b

a

K(x, z)y(z)dz. (23.5)

This is analogous to the introduction in chapters 16 and 17 of the notationLto


describe a linear differential operator. Furthermore, we may define the Hermitian


conjugateK†by


K†y=

∫b

a

K∗(z, x)y(z)dz,

where the asterisk denotes complex conjugation and we have reversed the order


of the arguments in the kernel.


It is clear from (23.5) thatKis indeed linear. Moreover, sinceKoperates on

the infinite-dimensional space of (reasonable) functions, we may make an obvious


analogy with matrix equations and consider the action ofKon a functionfas


that of a matrix on a column vector (both of infinite dimension).


When written in operator form, the integral equations discussed in the pre-

vious section resemble equations familiar from linear algebra. For example, the

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