We introduce an interface/coupling procedure for hyperbolic problems posed on time-dependent curved multi-domains. First, we transform the problem from Cartesian to boundary-conforming curvilinear coordinates and apply the energy method to derive well-posed and conservative interface conditions. Next, we discretize the problem in space and time by employing finite difference operators that satisfy a summation-by-parts rule. The interface condition is imposed weakly using a penalty formulation. We show how to formulate the penalty operators such that the coupling procedure is automatically adjusted to the movements and deformations of the interface, while both stability and conservation conditions are respected. The developed techniques are ...
Residual-free bubbles a b s t r a c t This paper presents a primal interface formulation that is der...
International audienceIn this lecture, we present some mathematical contributions in elasticity , wi...
We discuss well-posedness and stability of multi-physics problems by studying a model problem. By ap...
We introduce an interface/coupling procedure for hyperbolic problems posed on time-dependent curved ...
A time-dependent coordinate transformation of a constant coefficient hyperbolic system of equations ...
We construct stable, accurate and efficient numerical schemes for wave propagation and flow problems...
We discuss conservative and stable numerical approximations in summation-by-parts form for linear hy...
We develop a family of cut finite element methods of different orders based on the discontinuous Gal...
We discuss finite difference techniques for hyperbolic equations in non-trivial domains, as those th...
Abstract. We consider multi-physics computations where the Navier-Stokes equations of compressible f...
We combine existing discretization methods to obtain a simplified numerical formulation of partial d...
We combine existing summation-by-parts discretization methods to obtain a simplified numerical frame...
Abstract We present a high-order difference method for problems in elastodynamics in-volving the int...
A time-dependent coordinate transformation of a constant coeffcient hyperbolic equation which result...
A new weak boundary procedure for hyperbolic problems is presented. We consider high order finite di...
Residual-free bubbles a b s t r a c t This paper presents a primal interface formulation that is der...
International audienceIn this lecture, we present some mathematical contributions in elasticity , wi...
We discuss well-posedness and stability of multi-physics problems by studying a model problem. By ap...
We introduce an interface/coupling procedure for hyperbolic problems posed on time-dependent curved ...
A time-dependent coordinate transformation of a constant coefficient hyperbolic system of equations ...
We construct stable, accurate and efficient numerical schemes for wave propagation and flow problems...
We discuss conservative and stable numerical approximations in summation-by-parts form for linear hy...
We develop a family of cut finite element methods of different orders based on the discontinuous Gal...
We discuss finite difference techniques for hyperbolic equations in non-trivial domains, as those th...
Abstract. We consider multi-physics computations where the Navier-Stokes equations of compressible f...
We combine existing discretization methods to obtain a simplified numerical formulation of partial d...
We combine existing summation-by-parts discretization methods to obtain a simplified numerical frame...
Abstract We present a high-order difference method for problems in elastodynamics in-volving the int...
A time-dependent coordinate transformation of a constant coeffcient hyperbolic equation which result...
A new weak boundary procedure for hyperbolic problems is presented. We consider high order finite di...
Residual-free bubbles a b s t r a c t This paper presents a primal interface formulation that is der...
International audienceIn this lecture, we present some mathematical contributions in elasticity , wi...
We discuss well-posedness and stability of multi-physics problems by studying a model problem. By ap...