On the h-p version of the boundary element method for Symm's integral equation on polygons

## Abstract This paper applies the technique of the __h__–__p__ version to the boundary element method for boundary value problems on non‐smooth, plane domains with piecewise analytic boundary and data. The exponential rate of convergence of the boundary element Galerkin solution is proved when a g

## 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 The paper is the second in the series addressing the __h‐p__ version of the finite element method for parabolic equations. The present paper addresses the case when in both variables, the spatial and time, the __h‐p__ version is used. Error estimation is given and numerical computations

The paper is the first in the series addressing the h-p version of the finite element method for parabolic equations. The h-p version is applied to both time and space variables. The present paper addresses the case when in time the p-version with one single time element is used. Error estimation is

The conventional boundary integral equation in two dimensions is non-equivalent to its corresponding boundary value problem when the scale in the fundamental solution reaches its degenerate scale values. An equivalent boundary integral equation was recently derived. This equation has the same soluti