INTEGRAL EQUATIONS
We shall illustrate the principles involved by considering the differential equa-tion
y′′(x)=f(x, y), (23.1)wheref(x, y) can be any function ofxandybut not ofy′(x). Equation (23.1)
thus represents a large class of linear and non-linear second-order differential
equations.
We can convert (23.1) into the corresponding integral equation by first inte-grating with respect toxto obtain
y′(x)=∫x0f(z, y(z))dz+c 1.Integrating once more, we find
y(x)=∫x0du∫u0f(z, y(z))dz +c 1 x+c 2.Provided we do not change the region in theuz-plane over which the double
integral is taken, we can reverse the order of the two integrations. Changing the
integration limits appropriately, we find
y(x)=∫x0f(z, y(z))dz∫xzdu+c 1 x+c 2 (23.2)=∫x0(x−z)f(z, y(z))dz+c 1 x+c 2 ; (23.3)this is a non-linear (for generalf(x, y))Volterraintegral equation.
It is straightforward to incorporate any boundary conditions on the solutiony(x) by fixing the constantsc 1 andc 2 in (23.3). For example, we might have the
one-point boundary conditiony(0) =aandy′(0) =b, for which it is clear that
we must setc 1 =bandc 2 =a.
23.2 Types of integral equation
From (23.3), we can see that even a relatively simple differential equation such
as (23.1) can lead to a corresponding integral equation that is non-linear. In this
chapter, however, we will restrict our attention tolinearintegral equations, which
have the general form
g(x)y(x)=f(x)+λ∫baK(x, z)y(z)dz. (23.4)In (23.4),y(x) is the unknown function, while the functionsf(x),g(x)andK(x, z)
are assumed known.K(x, z) is called thekernelof the integral equation. The
integration limitsaandbare also assumed known, and may be constants or
functions ofx,andλis a known constant or parameter.