Fredholm integral equation

In mathematics, the Fredholm integral equation introduced by Ivar Fredholm gives rises to a Fredholm operator. From the point of view of functional analysis it therefore has a well-understood abstract eigenvalue theory. In this case that is supported by a computational theory, including the Fredholm determinants .

An inhomogeneous Fredholm equation of the first kind is written:

$g(t)=\int_a^b K(t,s)f(s)\,ds$

and the problem is, given the continuous kernel function K(t,s), and the function g(t), to find the function f(s).

An inhomogeneous Fredholm equation of the second kind is essentially a form of the eigenvalue problem for the above equation:

$f(t)=\lambda\int_a^bK(t,s)f(s)\,ds + g(t)$

and the problem is again, given the kernel K(t,s), and the function g(t), find the function f(s). The kernel K is a compact operator (to show this one relies on equicontinuity). It therefore has a spectral theory that can be understood in terms of a discrete spectrum of eigenvalues that tend to 0. This underlies the theory of the equation.

External link

Integral Equations at EqWorld: The World of Mathematical Equations.

Bibliography

A.D. Polyanin and A.V. Manzhirov, Handbook of Integral Equations, CRC Press, Boca Raton, 1998.

Categories: Equations

The contents of this article are licensed from Wikipedia.org under the GNU Free Documentation License. How to see transparent copy

Encyclopedia

Dictionary

Quotes

Fredholm integral equation

External link

Bibliography

The Online Encyclopedia and Dictionary

Encyclopedia

Dictionary

Quotes

Fredholm integral equation

External link

Bibliography