We discuss conservative and stable numerical approximations in summation-by-parts form for linear hyperbolic problems with variable coefficients. An extended setting, where the boundary or interface may or may not be included in the grid, is considered. We prove that conservative and stable formulations for variable coefficient problems require a boundary and interface conforming grid and exact numerical mimicking of integration-by-parts. Finally, we comment on how the conclusions from the linear analysis carry over to the nonlinear setting.Funding agencies: VINNOVA [2013-01209]</p
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Numerical solvers of initial boundary value problems will exhibit instabilities and loss of accuracy...
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We report a stability and convergence analysis for some simplified well-balanced Finite Volume solve...
We combine existing discretization methods to obtain a simplified numerical formulation of partial d...
Many physical phenomena can be described mathematically by means of partial differential equations. ...
We discuss conservative and stable numerical approximations in summation-by-parts form for linear hy...
Non-conforming numerical approximations offer increased flexibility for applications that require hi...
This report investigates the general theory and methodology of high resolution numerical schemes for...
In the hyperbolic community, discontinuous Galerkin (DG) approaches are mainly applied when finite el...
We consider the coupling of parabolic problems discretized using difference operators on summation-b...
A time-dependent coordinate transformation of a constant coefficient hyperbolic system of equations ...
This paper deals with the numerical approximation of linear and non linear hyperbolic problems. We a...
We discuss finite difference techniques for hyperbolic equations in non-trivial domains, as those th...
We introduce an interface/coupling procedure for hyperbolic problems posed on time-dependent curved ...
It is shown that for quasi-linear hyperbolic systems of the conservation form Wt =- F =- AWE, it is ...
Numerical solvers of initial boundary value problems will exhibit instabilities and loss of accuracy...
In this paper we provide a new approach for constructing non-reflecting boundary conditions. The bou...
We report a stability and convergence analysis for some simplified well-balanced Finite Volume solve...
We combine existing discretization methods to obtain a simplified numerical formulation of partial d...
Many physical phenomena can be described mathematically by means of partial differential equations. ...