A finite element method for Burgers' equation is studied. The method is analyzed using techniques from stabilized finite element methods and convergence to entropy solutions is proven under certain hypotheses on the artificial viscosity. In particular we assume that a discrete maximum principle holds. We then construct a nonlinear artificial viscosity that satisfies the assumptions required for convergence and that can be tuned to minimize artificial viscosity away from local extrema. The theoretical results are exemplified on a numerical exampl
AbstractIn this paper, we give a simple introduction to the devising of discontinuous Galerkin (DG) ...
We introduce a time-implicite Voronoi box based finite volume discretization for the initial-boundar...
The final publication is available at Springer via http://dx.doi.org/10.1007/s00211-016-0808-zFor th...
We extend our previous analysis of streamline diffusion finite element methods for hyperbolic system...
In this work, we propose a nonlinear stabilization technique for scalar conservation laws with impli...
In the present work, we consider the numerical approximation of the weak solutions of first-order sy...
[[abstract]]We study the rate of convergence of the viscous and numerical approximate solution to th...
Recently there have been numerous advances in the development of numerical algorithms to solve conse...
We propose an error analysis for a shock capturing finite element method for the Burgers' equation u...
In this presentation we attempt to stress two points of view on hyperbolic conservation laws: modeli...
Tese de doutoramento em Matemática (Análise Matemática), apresentada à Universidade de Lisboa atravé...
In the context of adjoint-based optimization, nonlinear conservation laws pose significant problems ...
A systematic procedure for constructing semidiscrete, second order accurate, variation diminishing, ...
Viscous Burgers' equations with a small viscosity are considered and convergence of vanishing v...
For the case of approximation of convection–diffusion equations using piecewise affine continuous fi...
AbstractIn this paper, we give a simple introduction to the devising of discontinuous Galerkin (DG) ...
We introduce a time-implicite Voronoi box based finite volume discretization for the initial-boundar...
The final publication is available at Springer via http://dx.doi.org/10.1007/s00211-016-0808-zFor th...
We extend our previous analysis of streamline diffusion finite element methods for hyperbolic system...
In this work, we propose a nonlinear stabilization technique for scalar conservation laws with impli...
In the present work, we consider the numerical approximation of the weak solutions of first-order sy...
[[abstract]]We study the rate of convergence of the viscous and numerical approximate solution to th...
Recently there have been numerous advances in the development of numerical algorithms to solve conse...
We propose an error analysis for a shock capturing finite element method for the Burgers' equation u...
In this presentation we attempt to stress two points of view on hyperbolic conservation laws: modeli...
Tese de doutoramento em Matemática (Análise Matemática), apresentada à Universidade de Lisboa atravé...
In the context of adjoint-based optimization, nonlinear conservation laws pose significant problems ...
A systematic procedure for constructing semidiscrete, second order accurate, variation diminishing, ...
Viscous Burgers' equations with a small viscosity are considered and convergence of vanishing v...
For the case of approximation of convection–diffusion equations using piecewise affine continuous fi...
AbstractIn this paper, we give a simple introduction to the devising of discontinuous Galerkin (DG) ...
We introduce a time-implicite Voronoi box based finite volume discretization for the initial-boundar...
The final publication is available at Springer via http://dx.doi.org/10.1007/s00211-016-0808-zFor th...