Optimal error estimation for Petrov-Galerkin methods in two dimensions

## 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

We analyze the nonsymmetric discontinuous Galerkin methods (NIPG and IIPG) for linear elliptic and parabolic equations with a spatially varied coefficient in multiple spatial dimensions. We consider d-linear approximation spaces on a uniform rectangular mesh, but our results can be extended to smoot

We consider the equations governing the electrical and thermal behaviour of a semiconductor device in two dimensions. A non-standard Petrov-Galerkin method is used to obtain a discretisation of the equations for stationary problems. The resulting scheme is a generalization to the two-dimensional cas

Several authors have proposed an error estimation strategy for the finite element method applied to linear reactiondiffusion equations in two space dimensions based on an odd/even-order dichotomy principle. For odd-order approximations the estimates are computed directly. For even-order approximatio