Virtual elements for Maxwell's equations

02/01/2021

∙

We present a low order virtual element discretization for time dependent Maxwell's equations. Both the semi- and fully-discrete schemes are considered. We derive optimal a priori estimates and validate them on a set of numerical experiments.

READ FULL TEXT

Virtual elements for Maxwell's equations

Error Analysis of Virtual Element Methods for the Time-dependent Poisson-Nernst-Planck Equations

Parallel block preconditioners for virtual element discretizations of the time-dependent Maxwell equations

Virtual element methods for the three-field formulation of time-dependent linear poroelasticity

Analysis of algebraic flux correction for semi-discrete advection problems

A priori error estimates of two fully discrete coupled schemes for Biot's consolidation model

TetraFreeQ: tetrahedra-free quadrature on polyhedral elements

Mathematical Content Browsing for Print-Disabled Readers Based on Virtual-World Exploration and Audio-Visual Sensory substitution

Virtual elements for Maxwell's equations

Related Research

Error Analysis of Virtual Element Methods for the Time-dependent Poisson-Nernst-Planck Equations

Parallel block preconditioners for virtual element discretizations of the time-dependent Maxwell equations

Virtual element methods for the three-field formulation of time-dependent linear poroelasticity

Analysis of algebraic flux correction for semi-discrete advection problems

A priori error estimates of two fully discrete coupled schemes for Biot's consolidation model

TetraFreeQ: tetrahedra-free quadrature on polyhedral elements

Mathematical Content Browsing for Print-Disabled Readers Based on Virtual-World Exploration and Audio-Visual Sensory substitution