In numerical simulations, problems stemming from aerodynamics pose many challenges for the method used. Some of these are addressed in this thesis, such as the fluid interacting with objects, the presence of shocks, and various types of boundary conditions. Scenarios of the kind mentioned above are described mathematically by initial boundary value problems (IBVPs). We discretize the IBVPs using high order accurate finite difference schemes on summation by parts form (SBP), combined with weakly imposed boundary conditions, a technique called simultaneous approximation term (SAT). By using the energy method, stability can be shown. The weak implementation is compared to the more commonly used strong implementation, and it is shown that the w...
International audienceEmbedded boundary methods for CFD (Computational Fluid Dynamics) simplify a nu...
Abstract. We consider multi-physics computations where the Navier-Stokes equations of compressible f...
Close to solid walls, at high Reynolds numbers, fluids may develop steep gradients which requirea fi...
In numerical simulations, problems stemming from aerodynamics pose many challenges for the method us...
In this thesis, the numerical solution of time-dependent partial differential equations (PDE) is stu...
The present thesis describes the development of a computational method for the numerical simulation ...
Partial differential equations (PDEs) are used to model various phenomena in nature and society, ran...
This paper analyses the accuracy and numerical stability of coupling procedures in aeroelastic model...
High order accurate finite difference methods for hyperbolic and parabolic initial boundary value pr...
We construct stable, accurate and efficient numerical schemes for wave propagation and flow problems...
In this thesis, stable and efficient hybrid methods which combine high order finite difference metho...
Part I: We consider the numerical solution of the Navier-Stokes equations governing the unsteady ...
For simulations of highly complex geometries, frequently encountered in many fields of science and e...
In multi physics computations, where a compressible fluid is coupled with a linearly elastic solid, ...
Aeroelastic stability analyses in transonic regime require the adoption of accurate aerodynamic mode...
International audienceEmbedded boundary methods for CFD (Computational Fluid Dynamics) simplify a nu...
Abstract. We consider multi-physics computations where the Navier-Stokes equations of compressible f...
Close to solid walls, at high Reynolds numbers, fluids may develop steep gradients which requirea fi...
In numerical simulations, problems stemming from aerodynamics pose many challenges for the method us...
In this thesis, the numerical solution of time-dependent partial differential equations (PDE) is stu...
The present thesis describes the development of a computational method for the numerical simulation ...
Partial differential equations (PDEs) are used to model various phenomena in nature and society, ran...
This paper analyses the accuracy and numerical stability of coupling procedures in aeroelastic model...
High order accurate finite difference methods for hyperbolic and parabolic initial boundary value pr...
We construct stable, accurate and efficient numerical schemes for wave propagation and flow problems...
In this thesis, stable and efficient hybrid methods which combine high order finite difference metho...
Part I: We consider the numerical solution of the Navier-Stokes equations governing the unsteady ...
For simulations of highly complex geometries, frequently encountered in many fields of science and e...
In multi physics computations, where a compressible fluid is coupled with a linearly elastic solid, ...
Aeroelastic stability analyses in transonic regime require the adoption of accurate aerodynamic mode...
International audienceEmbedded boundary methods for CFD (Computational Fluid Dynamics) simplify a nu...
Abstract. We consider multi-physics computations where the Navier-Stokes equations of compressible f...
Close to solid walls, at high Reynolds numbers, fluids may develop steep gradients which requirea fi...