Error estimates for a single-phase quasilinear stefan problem in one space dimension

Based on a Landau-type transformation, both continuous and discrete in time L 2 -Galerkin methods are applied to a single-phase Stefan-type problem in one space dimension. Optimal rates of convergence in L 2 , L ∞ , and H 1 -norms are derived and computational results are presented.

## For suitable and F, we prove that all classical solutions of the quasilinear wave equation RR !( ( V )) V "F(), with initial data of compact support, develop singularities in "nite time. The assumptions on and F include in particular the model case O>, for q\*2, and "$1. The starting point of

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

The purpose of the paper is to give an a priori convergence estimate for the hp-adaptive boundary element method. The method is used to solve an exterior Hehnholtz boundary-value problem with the Robin's boundary condition in the three-dimensional space. The mathematical model describes an acoustic