C1 macroelements in adaptive finite element methods

An a posteriori error analysis for Boussinesq equations is derived in this article. Then we compare this new estimate with a previous one developed for a regularized version of Boussinesq equations in a previous work.

In this paper a family of higher-order quadrilaterals for the finite element analysis of plane elasticity problems are developed, using the displacement method formulation. The number of nodes and the number of elements are fixed, and refinement is achieved by adding derivatives of the nodal displac

This paper presents an adaptive ®nite element method to solve forced convective heat transfer. Solutions are obtained in primitive variables using a high-order ®nite element approximation on unstructured grids. Two general-purpose error estimators are developed to analyse ®nite element solutions and

## Abstract One version of the stochastic finite element method involves representing the solution with respect to a basis in the space of random variables and evaluating the co‐ordinates of the solution with respect to this basis by relying on Hilbert space projections. The approach results in an