Add to ORKGtextabstractThis paper contains a convergence analysis for the method of Stabilizing Corrections, which is an internally consistent splitting scheme for initial-boundary value problems. To obtain more accuracy and a better treatment of explicit terms several extensions are regarded and analyzed. The relevance of the theoretical results is tested for convection-diffusion-reaction equations
A stabilized finite element method for solving systems of convection-diffusion-reaction equations is...
We discuss stabilized Galerkin approximations in a new framework, widening the scope from the usual ...
We consider implicit and semi-implicit time-stepping methods for finite element approximations of si...
htmlabstractWe present modifications of the second-order Douglas stabilizing corrections method, whi...
In this technical note a general procedure is described to construct internally consistent splittin...
The aim of this paper is to study discretizations of convection-diffusion-reaction equations using s...
The classical convection-diffusion-reaction equation has the unphysical property that if a sudden ch...
n this paper we recall a stabilization technique for finite element methods for convection-diffusion...
In this note we consider splitting methods based on linear multistep methods and stabilizing correc...
Spectral deferred correction is a flexible technique for constructing high-order, stiffly-stable tim...
Iterative Splitting Methods for Differential Equations explains how to solve evolution equations via...
Many numerical methods for systems of convection–diffusion equations are based on an operator splitt...
Many numerical methods for systems of convection-diffusion equations are based upon an operator spli...
We discuss stabilized Galerkin approximations in a new framework, widening the scope from the usual ...
In this article we study the convergence and the error bound for the solution of the convection diff...
A stabilized finite element method for solving systems of convection-diffusion-reaction equations is...
We discuss stabilized Galerkin approximations in a new framework, widening the scope from the usual ...
We consider implicit and semi-implicit time-stepping methods for finite element approximations of si...
htmlabstractWe present modifications of the second-order Douglas stabilizing corrections method, whi...
In this technical note a general procedure is described to construct internally consistent splittin...
The aim of this paper is to study discretizations of convection-diffusion-reaction equations using s...
The classical convection-diffusion-reaction equation has the unphysical property that if a sudden ch...
n this paper we recall a stabilization technique for finite element methods for convection-diffusion...
In this note we consider splitting methods based on linear multistep methods and stabilizing correc...
Spectral deferred correction is a flexible technique for constructing high-order, stiffly-stable tim...
Iterative Splitting Methods for Differential Equations explains how to solve evolution equations via...
Many numerical methods for systems of convection–diffusion equations are based on an operator splitt...
Many numerical methods for systems of convection-diffusion equations are based upon an operator spli...
We discuss stabilized Galerkin approximations in a new framework, widening the scope from the usual ...
In this article we study the convergence and the error bound for the solution of the convection diff...
A stabilized finite element method for solving systems of convection-diffusion-reaction equations is...
We discuss stabilized Galerkin approximations in a new framework, widening the scope from the usual ...
We consider implicit and semi-implicit time-stepping methods for finite element approximations of si...