integral equation

On the other hand we don't want to make them integral equations.

He was also the author of a book on integral equations.

Also integral equations can be studied in the complex domain.

They represent the differential forms of the integral equations given above.

In 1911, Lalescu wrote the first book ever on integral equations.

First, the boundary value problem is formulated as an integral equation.

For theoretical purposes, the integral equation version is often very useful.

He founded the Integral equations and operator theory journal (1983).

He also wrote on algebraic geometry, number theory, and integral equations.

It is the operator corresponding to the Volterra integral equations.

He is known for finding methods to solve system of volterra integral equations.

The general theory of such integral equations is known as Fredholm theory.

This point of view turned out to be particularly useful for the study of differential and integral equations.

The first one is based upon the so-called complex Green's function and the reduction of the related boundary value problem to integral equations.

This method is for finding approximate solutions to differential and integral equations.

In mathematics, Fredholm theory is a theory of integral equations.

This integral is written in the form of a Fredholm integral equation.

The compressibility equation is one of the many integral equations in statistical mechanics.

This "boundary integral equation" contrasted with alternatives which required the direct solution at all points in space.

Multigrid methods can also be applied to integral equations, or for problems in statistical physics.

There is a close connection between differential and integral equations, and some problems may be formulated either way.

One central example of a linear inverse problem is provided by a Fredholm first kind integral equation.

Mathematically, Gauss's law takes the form of an integral equation:

Integral equations are important in many applications.

Bolza returned to Chicago for part of 1913 giving lecturers during the summer on function theory and integral equations.