Convergence and stability in balanced norms of finite element methods on Shishkin meshes for reaction-diffusion problems

## Abstract We consider the numerical approximation of singularly perturbed reaction‐diffusion problems over two‐dimensional domains with smooth boundary. Using the __h__ version of the finite element method over appropriately designed __piecewise uniform__ (Shishkin) meshes, we are able to __unifo

The bilinear finite element methods on appropriately graded meshes are considered both for solving singular and semisingular perturbation problems. In each case, the quasi-optimal order error estimates are proved in the -weighted H 1 -norm uniformly in singular perturbation parameter , up to a logar

## Abstract The numerical approximation by a lower‐order anisotropic nonconforming finite element on appropriately graded meshes are considered for solving semisingular perturbation problems. The quasi‐optimal‐order error estimates are proved in the ε‐weighted __H__^1^‐norm valid uniformly, up to a