High-order accurate p-multigrid discontinuous Galerkin solution of the Euler equations

## Abstract We study the efficient use of the discontinuous Galerkin finite element method for the computation of steady solutions of the Euler equations. In particular, we look into a few methods to enhance computational efficiency. In this context we discuss the applicability of two algorithmical

Stokes equations. The space discretization of the inviscid terms of the Navier-Stokes equations is constructed fol-This paper deals with a high-order accurate discontinuous finite element method for the numerical solution of the compressible lowing the ideas described in the works of Cockburn et Nav

Two compact higher-order methods are presented for solving the Euler equations in two dimensions. The flow domain is discretized by triangles. The methods use a characteristic-based approach with a cell-centered finite volume method. Polynomials of order 0 through 3 are used in each cell to represen

## Abstract A higher‐order discontinuous enrichment method (DEM) with Lagrange multipliers is proposed for the efficient finite element solution on unstructured meshes of the advection–diffusion equation in the high Péclet number regime. Following the basic DEM methodology, the usual Galerkin polyn