Eigenvalue approximation by the finite element method

## Abstract In this paper, we analyze the biharmonic eigenvalue problem by two nonconforming finite elements, __Q__ and __E Q__. We obtain full order convergence rate of the eigenvalue approximations for the biharmonic eigenvalue problem based on asymptotic error expansions for these two nonconform

In this paper the Carey non-conforming ®nite element is considered for solving eigenvalue problems of the second-order elliptic operator. Based on an interpolation postprocessing, high-accuracy estimates of both eigenfunctions and eigenvalues are obtained: Here, P 2 2h is an interpolation operator,

The Method of Weighted Residuals (MWR) is a powerful tool in solving boundary value problems. A particular MWR is the "collocation method". The main theme of this paper is eigenvalue calculations with the collocation method. The bench mark problems considered are second andfourth order dtflerential