Error Estimates on a New Nonlinear Galerkin Method Based on Two-Grid Finite Elements

## Following the original idea of Pierre Lade&e introduced in 1975, we develop hereafter a mathematical framework for studying an explicit error bound in a finite element method. We focus on conforming methods and we give a general 2D strategy in order to obtain an up-grade of the finite element s

With the exponential increase in computing power, modelers of coastal and oceanic regions are capable of simulating larger domains with increased resolution. Typically, these models use graded meshes wherein the size of the elements can vary by orders of magnitude. However, with notably few exceptio

In this paper, we develop a finite volume element method with affine quadratic bases on right quadrangular prism meshes for three-dimensional elliptic boundary value problems. The optimal H 1 -norm error estimate of second order accuracy is proved under certain assumptions about the meshes. Numeric