A posteriori error estimation with the finite element method of lines for a nonlinear parabolic equation in one space dimension

We analyze an a posteriori error estimator for nonlinear parabolic differential equations in several space dimensions. The spatial discretization is carried out using the p-version of the finite element method. The error estimates are obtained by solving an elliptic problem at the desired times when

In this paper, three a posteriori error estimators of the error in the semidiscrete ®nite element solution (discrete in space and continuous in time) of parabolic partial dierential equations are analyzed. This approach is based on a posteriori error estimators for the elliptic PDEs. It is proven th

Using the abstract framework of [R. Verfürth, Math. Comput. 62, 445-475 (1996)], we analyze a residual a posteriori error estimator for space-time finite element discretizations of parabolic PDEs. The estimator gives global upper and local lower bounds on the error of the numerical solution. The fin