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In [[mathematics]], '''Fredholm theory''' is a theory of [[integral equation]]s. In the narrowest sense, Fredholm theory concerns itself with the solution of the [[Fredholm integral equation]]. In a broader sense, the abstract structure of Fredholm's theory is given in terms of the [[spectral theory]] of [[Fredholm operator]]s and [[Fredholm kernel]]s on [[Hilbert space]]. The theory is named in honour of [[Erik Ivar Fredholm]].
 
==Overview==
The following sections provide a casual sketch of the place of Fredholm theory in the broader context of [[operator theory]] and [[functional analysis]]. The outline presented here is broad, whereas the difficulty of formalizing this sketch is, of course, in the details.
 
==Homogeneous equations==
Much of Fredholm theory concerns itself with finding solutions for the [[integral equation]]
:<math>g(x)=\int_a^b K(x,y) f(y)\,dy.</math>
 
This equation arises naturally in many problems in [[physics]] and mathematics, as the inverse of a [[differential equation]]. That is, one is asked to solve the differential equation
:<math>Lg(x)=f(x)</math>
 
where the function ''f'' is given and ''g'' is unknown. Here, ''L'' stands for a linear [[differential operator]]. For example, one might take ''L'' to be an [[elliptic operator]], such as
:<math>L=\frac{d^2}{dx^2}\,</math>
 
in which case the equation to be solved becomes the [[Poisson equation]]. A general method of solving such equations is by means of [[Green's function]]s, namely, rather than a direct attack, one instead attempts to solve the equation
:<math>LK(x,y) = \delta(x-y)</math>
 
where <math>\delta(x)</math> is the [[Dirac delta function]]. The desired solution to the differential equation is then written as
:<math>g(x)=\int K(x,y) f(y)\,dy.</math>
 
This integral is written in the form of a [[Fredholm integral equation]]. The function <math>K(x,y)</math> is variously known as a Green's function, or the [[integral transform|kernel of an integral]]. It is sometimes called the '''nucleus''' of the integral, whence the term [[nuclear operator]] arises.
 
In the general theory, ''x'' and ''y'' may be points on any [[manifold]]; the [[real number line]] or ''m''-dimensional [[Euclidean space]] in the simplest cases. The general theory also often requires that the functions belong to some given [[function space]]: often, the space of [[square-integrable function]]s is studied, and [[Sobolev space]]s appear often.
 
The actual function space used is often determined by the solutions of the [[eigenvalue]] problem of the differential operator; that is, by the solutions to
:<math>L\psi_n(x)=\omega_n \psi_n(x)</math>
 
where the <math>\omega_n</math> are the eigenvalues, and the <math>\psi_n(x)</math> are the eigenvectors. The set of eigenvectors span a [[Banach space]], and, when there is a natural [[inner product]], then the eigenvectors span a [[Hilbert space]], at which point the [[Riesz representation theorem]] is applied. Examples of such spaces are the [[orthogonal polynomials]] that occur as the solutions to a class of second-order [[ordinary differential equation]]s.
 
Given a Hilbert space as above, the kernel may be written in the form
:<math>K(x,y)=\sum_n \frac{\psi_n^*(x) \psi_n(y)} {\omega_n}</math>
 
where <math>\psi_n^*</math> is the [[dual space|dual]] to <math>\psi_n</math>. In this form, the object <math>K(x,y)</math> is often called the [[Fredholm operator]] or the [[Fredholm kernel]]. That this is the same kernel as before follows from the [[complete space|completeness]] of the basis of the Hilbert space, namely, that one has
:<math>\delta(x-y)=\sum_n \psi_n^*(x) \psi_n(y).</math>
 
Since the <math>\omega_n</math> are generally increasing, the resulting eigenvalues of the operator <math>K(x,y)</math> are thus seen to be decreasing towards zero.
 
==Inhomogeneous equations==
The inhomogenous Fredholm integral equation
:<math>f(x)=- \omega \phi(x) + \int K(x,y) \phi(y)\,dy</math>
 
may be written formally as
:<math>f = (K-\omega) \phi</math>
 
which has the formal solution
:<math>\phi=\frac{1}{K-\omega} f.</math>
 
A solution of this form is referred to as the [[resolvent formalism]], where the resolvent is defined as the operator
:<math>R(\omega)= \frac{1}{K-\omega I}.</math>
 
Given the collection of eigenvectors and eigenvalues of ''K'', the resolvent may be given a concrete form as
:<math>R(\omega; x,y) = \sum_n \frac{\psi_n^*(y)\psi_n(x)}{\omega_n - \omega}</math>
 
with the solution being
:<math>\phi(x)=\int R(\omega; x,y) f(y)\,dy.</math>
 
A necessary and sufficient condition for such a solution to exist is one of [[Fredholm's theorem]]s. The resolvent is commonly expanded in powers of <math>\lambda=1/\omega</math>, in which case it is known as the [[Liouville-Neumann series]]. In this case, the integral equation is written as
:<math>g(x)= \phi(x) - \lambda \int K(x,y) \phi(y)\,dy</math>
 
and the resolvent is written in the alternate form as
:<math>R(\lambda)= \frac{1}{I-\lambda K}.</math>
 
==Fredholm determinant==
The [[Fredholm determinant]] is commonly defined as
:<math>\det(I-\lambda K) = \exp \left[
-\sum_n \frac{\lambda^n}{n} \operatorname{Tr}\, K^n \right]</math>
 
where
:<math>\operatorname{Tr}\, K = \int K(x,x)\,dx</math>
 
and
:<math>\operatorname{Tr}\, K^2 = \iint K(x,y) K(y,x) \,dx\,dy</math>
 
and so on. The corresponding [[Riemann zeta function|zeta function]] is
:<math>\zeta(s) = \frac{1}{\det(I-s K)}.</math>
 
The zeta function can be thought of as the determinant of the [[Resolvent formalism|resolvent]].
 
The zeta function plays an important role in studying [[dynamical systems]]. Note that this is the same general type of zeta function as the [[Riemann zeta function]]; however, in this case, the corresponding kernel is not known. The existence of such a kernel is known as the [[Hilbert–Pólya conjecture]].
 
==Main results==
The classical results of the theory are [[Fredholm's theorem]]s, one of which is the [[Fredholm alternative]].
 
One of the important results from the general theory are that the kernel is a [[compact operator]] when the space of functions are [[equicontinuous]].
 
A related celebrated result is the [[Atiyah–Singer index theorem]], pertaining to index (dim ker – dim coker) of elliptic operators on [[compact manifold]]s.
 
==History==
Fredholm's 1903 paper in ''Acta Mathematica'' is considered to be one of the major landmarks in the establishment of [[operator theory]]. [[David Hilbert]] developed the abstraction of [[Hilbert space]] in association with research on integral equations prompted by Fredholm's (amongst other things).
 
==References==
* E.I. Fredholm, "Sur une classe d'equations fonctionnelles", ''Acta Mathematica'', '''27'''  (1903) pp.&nbsp;365–390.
* D.E. Edmunds and W.D. Evans (1987), ''Spectral theory and differential operators,'' Oxford University Press. ISBN 0-19-853542-2.
* {{springer|id=f/f041440|title=Fredholm kernel|author=B.V. Khvedelidze, G.L. Litvinov}}
* Bruce K. Driver, "[http://math.ucsd.edu/~driver/231-02-03/Lecture_Notes/compact.pdf Compact and Fredholm Operators and the Spectral Theorem]", ''Analysis Tools with Applications'', Chapter 35, pp.&nbsp;579–600.
* Robert C. McOwen, "[http://projecteuclid.org/Dienst/UI/1.0/Summarize/euclid.pjm/1102780323 Fredholm theory of partial differential equations on complete Riemannian manifolds]", ''Pacific J. Math.''  '''87''', no. 1 (1980), 169–185.
 
==See also==
 
*[[Green's functions]]
*[[Spectral theory]]
 
[[Category:Functional analysis]]

Revision as of 20:55, 11 October 2013

In mathematics, Fredholm theory is a theory of integral equations. In the narrowest sense, Fredholm theory concerns itself with the solution of the Fredholm integral equation. In a broader sense, the abstract structure of Fredholm's theory is given in terms of the spectral theory of Fredholm operators and Fredholm kernels on Hilbert space. The theory is named in honour of Erik Ivar Fredholm.

Overview

The following sections provide a casual sketch of the place of Fredholm theory in the broader context of operator theory and functional analysis. The outline presented here is broad, whereas the difficulty of formalizing this sketch is, of course, in the details.

Homogeneous equations

Much of Fredholm theory concerns itself with finding solutions for the integral equation

g(x)=abK(x,y)f(y)dy.

This equation arises naturally in many problems in physics and mathematics, as the inverse of a differential equation. That is, one is asked to solve the differential equation

Lg(x)=f(x)

where the function f is given and g is unknown. Here, L stands for a linear differential operator. For example, one might take L to be an elliptic operator, such as

L=d2dx2

in which case the equation to be solved becomes the Poisson equation. A general method of solving such equations is by means of Green's functions, namely, rather than a direct attack, one instead attempts to solve the equation

LK(x,y)=δ(xy)

where δ(x) is the Dirac delta function. The desired solution to the differential equation is then written as

g(x)=K(x,y)f(y)dy.

This integral is written in the form of a Fredholm integral equation. The function K(x,y) is variously known as a Green's function, or the kernel of an integral. It is sometimes called the nucleus of the integral, whence the term nuclear operator arises.

In the general theory, x and y may be points on any manifold; the real number line or m-dimensional Euclidean space in the simplest cases. The general theory also often requires that the functions belong to some given function space: often, the space of square-integrable functions is studied, and Sobolev spaces appear often.

The actual function space used is often determined by the solutions of the eigenvalue problem of the differential operator; that is, by the solutions to

Lψn(x)=ωnψn(x)

where the ωn are the eigenvalues, and the ψn(x) are the eigenvectors. The set of eigenvectors span a Banach space, and, when there is a natural inner product, then the eigenvectors span a Hilbert space, at which point the Riesz representation theorem is applied. Examples of such spaces are the orthogonal polynomials that occur as the solutions to a class of second-order ordinary differential equations.

Given a Hilbert space as above, the kernel may be written in the form

K(x,y)=nψn*(x)ψn(y)ωn

where ψn* is the dual to ψn. In this form, the object K(x,y) is often called the Fredholm operator or the Fredholm kernel. That this is the same kernel as before follows from the completeness of the basis of the Hilbert space, namely, that one has

δ(xy)=nψn*(x)ψn(y).

Since the ωn are generally increasing, the resulting eigenvalues of the operator K(x,y) are thus seen to be decreasing towards zero.

Inhomogeneous equations

The inhomogenous Fredholm integral equation

f(x)=ωϕ(x)+K(x,y)ϕ(y)dy

may be written formally as

f=(Kω)ϕ

which has the formal solution

ϕ=1Kωf.

A solution of this form is referred to as the resolvent formalism, where the resolvent is defined as the operator

R(ω)=1KωI.

Given the collection of eigenvectors and eigenvalues of K, the resolvent may be given a concrete form as

R(ω;x,y)=nψn*(y)ψn(x)ωnω

with the solution being

ϕ(x)=R(ω;x,y)f(y)dy.

A necessary and sufficient condition for such a solution to exist is one of Fredholm's theorems. The resolvent is commonly expanded in powers of λ=1/ω, in which case it is known as the Liouville-Neumann series. In this case, the integral equation is written as

g(x)=ϕ(x)λK(x,y)ϕ(y)dy

and the resolvent is written in the alternate form as

R(λ)=1IλK.

Fredholm determinant

The Fredholm determinant is commonly defined as

det(IλK)=exp[nλnnTrKn]

where

TrK=K(x,x)dx

and

TrK2=K(x,y)K(y,x)dxdy

and so on. The corresponding zeta function is

ζ(s)=1det(IsK).

The zeta function can be thought of as the determinant of the resolvent.

The zeta function plays an important role in studying dynamical systems. Note that this is the same general type of zeta function as the Riemann zeta function; however, in this case, the corresponding kernel is not known. The existence of such a kernel is known as the Hilbert–Pólya conjecture.

Main results

The classical results of the theory are Fredholm's theorems, one of which is the Fredholm alternative.

One of the important results from the general theory are that the kernel is a compact operator when the space of functions are equicontinuous.

A related celebrated result is the Atiyah–Singer index theorem, pertaining to index (dim ker – dim coker) of elliptic operators on compact manifolds.

History

Fredholm's 1903 paper in Acta Mathematica is considered to be one of the major landmarks in the establishment of operator theory. David Hilbert developed the abstraction of Hilbert space in association with research on integral equations prompted by Fredholm's (amongst other things).

References

See also