An Integral Equation Method for the Flow in an Infinite Tunnel

The eigenvalue problem for the Laplace operator is numerical investigated using the boundary integral equation (BIE) formulation. Three methods of discretization are given and illustrated with numerical examples.

## Abstract We present a mathematical model for transport current carrying superconductors in terms of a boundary value problem for the Laplace equation. A uniqueness and existence result is given via a boundary integral equation method in a Hölder space setting. It's numerical solution is describe

We present a new time-symmetric evolution formula for the scalar wave equation. It is simply related to the classical D'Alembert or spherical means representations, but applies equally well in two space dimensions. It can be used to develop stable, robust numerical schemes on irregular meshes.

## flow. With N points in the discretization of the boundary, direct inversion of the resulting linear systems requires We present a class of integral equation methods for the solution of biharmonic boundary value problems, with applications to two-O(N 3 ) operations. Most iterative methods, on th