A Centered Second-Order Finite Volume Scheme for the Heterogeneous Maxwell Equations in Three Dimensions on Arbitrary Unstructured Meshes

We present a simple globally second order scheme inspired by ghost cell approaches to solve compressible inviscid flows [4].. In the fluid domain, away from the boundary, we use

This method is based on a classical finite volume approach, but the values used to compute the fluxes at the cell interfaces near the solid boundary are determined so to satisfy

A crystal–chemical control has been suggested as the decisive factor for the formation of Au-rich porphyry copper deposits with high Au/Cu ratio, based on experiments showing a

[51] proposed a fourth-order finite volume method on structured grids based on the Pad´ e technique and several very high-order schemes have been developed involving compact stencils

In both cases (nonlinear centered and upstream weighting schemes), we prove the convergence of a penalized version of the scheme to a weak solution of the problem... As we noted in

We present a new finite volume scheme based on the Polynomial Reconstruction Operator (PRO-scheme) for the linear convection diffusion problem with structured and unstructured

Abstract The Multi-dimensional Optimal Order Detection (MOOD) method is an original Very High-Order Finite Volume (FV) method for conservation laws on unstructured meshes.. The

Abstract We propose a sixth-order staggered finite volume scheme based on polynomial reconstructions to achieve high accurate numerical solutions for the incompressible Navier-