Uniform convergence and preconditioning method for mortar mixed element method for nonselfadjoint and indefinite problems

The purpose of this paper is to prove the existence, uniqueness and uniform convergence of the solutions of so-called projection nonconforming and mixed element methods and the equivalence between projection nonconforming element method and mixed element method with nonquasi-uniform partition for no

In this paper, two mortar versions of the so-called projection nonconforming and the mixed element methods are proposed, respectively, for nonselfadjoint and indefinite second-order elliptic problems. It is proven that the mortar mixed element method is equivalent to the mortar projection nonconform

In this paper, the existence, uniqueness and convergence of the solutions of nonconforming and mixed methods with non-quasi-uniform partition are proven for nonselfadjoint and indefinite second-order elliptic problems under minimal regularity assumption, moreover, uniform convergence of the solution

In this paper, the existence, uniqueness and uniform convergence of the solution of the Carey nonconforming element with non-quasi-uniform partitions is proved for non-self-adjoint and inde"nite secondorder elliptic problems under a minimal regularity assumption. Furthermore, the optimal error estim