We combine an Eulerian–Lagrangian approach and multiresolution analysis to develop unconditionally stable, explicit, multilevel methods for multidimensional linear hyperbolic equations. The derived schemes generate accurate numerical solutions even if large time steps are used. Furthermore, these schemes have the capability of carrying out adaptive compression without introducing mass balance error. Computational results are presented to show the strong potential of the numerical methods developed
This work describes an unsplit, second-order accurate algorithm for multidimensional systems of hype...
AbstractIn this paper we first briefly review the very high order ADER methods for solving hyperboli...
This paper constructs multirate time discretizations for hyperbolic conservation laws that allow dif...
We combine an Eulerian–Lagrangian approach and multiresolution analysis to develop unconditionally s...
We present an Eulerian-Lagrangian localized adjoint method (ELLAM) scheme for initial-boundary value...
A large CFL algorithm is presented for the explicit, finite volume solution of hyperbolic systems of...
The numerics of hyperbolic conservation laws, e.g., the Euler equations of gas dynamics, shallow wat...
This paper provides a review about a family of non oscillatory and parameter free finite element typ...
A new class of numerical methods called Active Flux (AF) is investigated for nonlinear hyperbolic co...
In this paper we present a new family of efficient high order accurate direct Arbitrary-Lagrangian-E...
It is well known that explicit methods are subject to a restriction on the time step. This restricti...
First and second order explicit difference schemes are derived for a three dimensional hyperbolic sy...
AbstractThis work describes an unsplit, second-order accurate algorithm for multidimensional systems...
We propose a modified adaptive multiresolution scheme for solving d-dimensional hyperbolic conservat...
AbstractA systematic procedure is proposed and implemented for the design of nonstandard finite diff...
This work describes an unsplit, second-order accurate algorithm for multidimensional systems of hype...
AbstractIn this paper we first briefly review the very high order ADER methods for solving hyperboli...
This paper constructs multirate time discretizations for hyperbolic conservation laws that allow dif...
We combine an Eulerian–Lagrangian approach and multiresolution analysis to develop unconditionally s...
We present an Eulerian-Lagrangian localized adjoint method (ELLAM) scheme for initial-boundary value...
A large CFL algorithm is presented for the explicit, finite volume solution of hyperbolic systems of...
The numerics of hyperbolic conservation laws, e.g., the Euler equations of gas dynamics, shallow wat...
This paper provides a review about a family of non oscillatory and parameter free finite element typ...
A new class of numerical methods called Active Flux (AF) is investigated for nonlinear hyperbolic co...
In this paper we present a new family of efficient high order accurate direct Arbitrary-Lagrangian-E...
It is well known that explicit methods are subject to a restriction on the time step. This restricti...
First and second order explicit difference schemes are derived for a three dimensional hyperbolic sy...
AbstractThis work describes an unsplit, second-order accurate algorithm for multidimensional systems...
We propose a modified adaptive multiresolution scheme for solving d-dimensional hyperbolic conservat...
AbstractA systematic procedure is proposed and implemented for the design of nonstandard finite diff...
This work describes an unsplit, second-order accurate algorithm for multidimensional systems of hype...
AbstractIn this paper we first briefly review the very high order ADER methods for solving hyperboli...
This paper constructs multirate time discretizations for hyperbolic conservation laws that allow dif...