The convergence properties of a class of high-order semi-Lagrangian schemes for pure advection equations are studied here in the framework of the theory of viscosity solutions. We review the general convergence results for discrete-time approximation schemes belonging to that class and we prove some a priori estimates in $L^\infty$ and $L^2$ for the rate of convergence of fully discrete schemes. We prove then that a careful coupling of time and space discretizations can allow large time steps in the numerical integration still preserving the accuracy of the solutions. Several examples of schemes and numerical tests are presented
We analyse the properties of a semi-Lagrangian scheme for the approximation of the Mean Curvature Mo...
We compare in this paper two major implementations of large time-step schemes for advection equation...
Classical Semi-Lagrangian schemes have the advantage of allowing large time steps, but fail in gener...
In this paper, a second order Semi-Lagrangian numerical method for the discretiza-tion of the advect...
We study the discretization of linear transient transport problems for differential forms on bounded...
AbstractIn this paper we study the error propagation of numerical schemes for the advection equation...
This article is devoted to the construction of a new class of semi-Lagrangian (SL) schemes with impl...
We propose a class of semi-Lagrangian methods of high approximation order in space and time, based o...
In this survey we present some semi-Lagrangian schemes for the approximation of weak solutions of fi...
We propose a second order, fully semi-Lagrangian method for the numerical solution of systems of adv...
In this survey we present some semi-Lagrangian schemes for the approximation of weak solutions of fi...
In this paper, we apply semi-Lagrangian discontinuous Galerkin (SLDG) methods for linear hyperbolic ...
We compare in this paper two major implementations of large time-step schemes for advection equation...
We propose a second order, fully semi-Lagrangian method for the numerical solution of systems of adv...
Following a previous result stating their equivalence under constant advection speed, Semi-Lagrangia...
We analyse the properties of a semi-Lagrangian scheme for the approximation of the Mean Curvature Mo...
We compare in this paper two major implementations of large time-step schemes for advection equation...
Classical Semi-Lagrangian schemes have the advantage of allowing large time steps, but fail in gener...
In this paper, a second order Semi-Lagrangian numerical method for the discretiza-tion of the advect...
We study the discretization of linear transient transport problems for differential forms on bounded...
AbstractIn this paper we study the error propagation of numerical schemes for the advection equation...
This article is devoted to the construction of a new class of semi-Lagrangian (SL) schemes with impl...
We propose a class of semi-Lagrangian methods of high approximation order in space and time, based o...
In this survey we present some semi-Lagrangian schemes for the approximation of weak solutions of fi...
We propose a second order, fully semi-Lagrangian method for the numerical solution of systems of adv...
In this survey we present some semi-Lagrangian schemes for the approximation of weak solutions of fi...
In this paper, we apply semi-Lagrangian discontinuous Galerkin (SLDG) methods for linear hyperbolic ...
We compare in this paper two major implementations of large time-step schemes for advection equation...
We propose a second order, fully semi-Lagrangian method for the numerical solution of systems of adv...
Following a previous result stating their equivalence under constant advection speed, Semi-Lagrangia...
We analyse the properties of a semi-Lagrangian scheme for the approximation of the Mean Curvature Mo...
We compare in this paper two major implementations of large time-step schemes for advection equation...
Classical Semi-Lagrangian schemes have the advantage of allowing large time steps, but fail in gener...