We present a strategy for solving time-dependent problems on grids with local refinements in time using different time steps in different regions of space. We discuss and analyze two conservative approximations based on finite volume with piecewise constant projections and domain decomposition techniques. Next we present an iterative method for solving the composite-grid system that reduces to solution of standard problems with standard time stepping on the coarse and fine grids. At every step of the algorithm, conservativity is ensured. Finally, numerical results illustrate the accuracy of the proposed methods
The problem of generating local mesh refinements when solving time dependent partial differential eq...
We present a fully adaptive numerical scheme for evolutionary PDEs in Cartesian geometry based on a ...
International audienceLocally refined meshes impose severe stability constraints on explicit time-st...
We present a strategy for solving time-dependent problems on grids with local refinements in time us...
We present a strategy for solving time-dependent problems on grids with local refinements in time us...
Résumé. Nous présentons une stratégie avec raffinement local en temps pour la résolution de pro...
A new generalized local time-step scheme is introduced to improve the computational efficiency of th...
We discuss how to introduce local time-step refinements in a sequential implicit method for multipha...
International audienceIn this paper, two local time stepping schemes of order two and three in time ...
Simulation of multiphase flow in natural subsurface formations include selection of time-step size, ...
The solutions of partial differential equations (PDEs) describing physical phenomena are often chara...
We present a method for solving partial differential equations characterized by highly localized pro...
One focus of this dissertation is to construct a large time step Finite Volume Method for computing ...
We present a new class of very-high-order finite volume schemes for the time dependent convection-d...
Mixed flows in closed conduits are characterized by waves, celerity values of which lie within a ran...
The problem of generating local mesh refinements when solving time dependent partial differential eq...
We present a fully adaptive numerical scheme for evolutionary PDEs in Cartesian geometry based on a ...
International audienceLocally refined meshes impose severe stability constraints on explicit time-st...
We present a strategy for solving time-dependent problems on grids with local refinements in time us...
We present a strategy for solving time-dependent problems on grids with local refinements in time us...
Résumé. Nous présentons une stratégie avec raffinement local en temps pour la résolution de pro...
A new generalized local time-step scheme is introduced to improve the computational efficiency of th...
We discuss how to introduce local time-step refinements in a sequential implicit method for multipha...
International audienceIn this paper, two local time stepping schemes of order two and three in time ...
Simulation of multiphase flow in natural subsurface formations include selection of time-step size, ...
The solutions of partial differential equations (PDEs) describing physical phenomena are often chara...
We present a method for solving partial differential equations characterized by highly localized pro...
One focus of this dissertation is to construct a large time step Finite Volume Method for computing ...
We present a new class of very-high-order finite volume schemes for the time dependent convection-d...
Mixed flows in closed conduits are characterized by waves, celerity values of which lie within a ran...
The problem of generating local mesh refinements when solving time dependent partial differential eq...
We present a fully adaptive numerical scheme for evolutionary PDEs in Cartesian geometry based on a ...
International audienceLocally refined meshes impose severe stability constraints on explicit time-st...