Abstract. We present a systematic methodology to develop high order accurate numerical approaches for linear advection problems. These methods are based on evolving parts of the jet of the solution in time, and are thus called jet schemes. Through the tracking of characteristics and the use of suitable Hermite interpolations, high order is achieved in an optimally local fashion, i.e. the update for the data at any grid point uses information from a single grid cell only. We show that jet schemes can be interpreted as advect–and–project processes in function spaces, where the projection step minimizes a stability functional. Furthermore, this function space framework makes it possible to systematically inherit update rules for the higher der...
Abstract In this paper, we describe a comparison of two spatial discretization schemes for the advec...
The Jet Transport method has emerged as a powerful tool for the numerical integration of ordinary di...
Many interfacial phenomena in physical and biological systems are dominated by high order geometric ...
Abstract. We present a systematic methodology to develop high order ac-curate numerical approaches f...
We present a systematic methodology to develop high order accurate numerical approaches for linear a...
Abstract. We present two versions of third order accurate jet schemes, which achieve high order accu...
A simple, robust, mass-conserving numerical scheme for solving the linear advection equation is desc...
A numerical scheme for solving advection equations is presented. The scheme is derived from a ration...
The field of Computational Fluid Dynamics (CFD) is constantly finding new ways to improve simulation...
International audienceThis paper presents the general modified equation for a family of finite-diffe...
AbstractIn this paper we study the error propagation of numerical schemes for the advection equation...
Many interfacial phenomena in physical and biological systems are dominated by high order geometric ...
AbstractIn this study an explicit central difference approximation of the generalized leap-frog type...
We present a new limiter method for solving the advection equation using a high-order, finite-volume...
In the fourth installment of the celebrated series of five papers entitled "Towards the ultimate con...
Abstract In this paper, we describe a comparison of two spatial discretization schemes for the advec...
The Jet Transport method has emerged as a powerful tool for the numerical integration of ordinary di...
Many interfacial phenomena in physical and biological systems are dominated by high order geometric ...
Abstract. We present a systematic methodology to develop high order ac-curate numerical approaches f...
We present a systematic methodology to develop high order accurate numerical approaches for linear a...
Abstract. We present two versions of third order accurate jet schemes, which achieve high order accu...
A simple, robust, mass-conserving numerical scheme for solving the linear advection equation is desc...
A numerical scheme for solving advection equations is presented. The scheme is derived from a ration...
The field of Computational Fluid Dynamics (CFD) is constantly finding new ways to improve simulation...
International audienceThis paper presents the general modified equation for a family of finite-diffe...
AbstractIn this paper we study the error propagation of numerical schemes for the advection equation...
Many interfacial phenomena in physical and biological systems are dominated by high order geometric ...
AbstractIn this study an explicit central difference approximation of the generalized leap-frog type...
We present a new limiter method for solving the advection equation using a high-order, finite-volume...
In the fourth installment of the celebrated series of five papers entitled "Towards the ultimate con...
Abstract In this paper, we describe a comparison of two spatial discretization schemes for the advec...
The Jet Transport method has emerged as a powerful tool for the numerical integration of ordinary di...
Many interfacial phenomena in physical and biological systems are dominated by high order geometric ...