V-cycle Galerkin-multigrid methods for nonconforming methods for nonsymmetric and indefinite problems

In an earlier paper, we developed a convergence theory for a class of multigrid methods applied to differential boundary value problems, where the differential operator is self-adjoint and positive definite. The multigrid structure assumed a variational setting (although it applies to finite differ

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, 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