A Galerkin procedure for diffusion equations with boundary integral conditions

A one-dimensiorzt drift-diffasion mechai-fi~,,m combined with special boundary conditions is investigated. Thi~ mechanism may be used to de~:ribe the b\_'haviour of mobile ions with surface trapping. The problem is solved numerically wi.th an inte-gr~differential equation and with a double integral

The solution of an initial-boundary value problem for bending of a piecewise-homogeneous thermoelastic plate with transverse shear deformation is represented as various combinations of single-layer and double-layer time-dependent potentials. The unique solvability of the boundary integral equations

## Abstract A hypersingular boundary integral equation of the first kind on an open surface piece Γ is solved approximately using the Galerkin method. As boundary elements on rectangles we use continuous, piecewise bilinear functions which vanish on the boundary of Γ. We show how to compensate for

## Abstract We present __a priori__ and __a posteriori__ estimates for the error between the Galerkin and a discretized Galerkin method for the boundary integral equation for the single layer potential on the square plate. Using piecewise constant finite elements on a rectangular mesh we study the