Error estimates for mixed finite element methods for nonlinear parabolic problems

## Abstract We treat the finite volume element method (FVE) for solving general second order elliptic problems as a perturbation of the linear finite element method (FEM), and obtain the optimal __H__^1^ error estimate, __H__^1^ superconvergence and __L__^__p__^ (1 < __p__ ≤ ∞) error estimates betw

## Abstract In this article a standard mortar finite element method and a mortar element method with Lagrange multiplier are used for spatial discretization of a class of parabolic initial‐boundary value problems. Optimal error estimates in __L__^__∞__^(__L__^2^) and __L__^__∞__^(__H__^1^)‐norms fo

## Abstract In this article we construct and analyze a mixed finite volume method for second‐order nonlinear elliptic problems employing __H__(div; Ω)‐conforming approximations for the vector variable and completely discontinuous approximations for the scalar variable. The main attractive feature o