Developing stable and robust high-order finite difference schemes requires mathematical formalism and appropriate methods of analysis. In this work, nonlinear entropy stability is used to derive provably stable high-order finite difference methods with formal boundary closures for conservation laws. Particular emphasis is placed on the entropy stability of the compressible Navier-Stokes equations. A newly derived entropy stable weighted essentially non-oscillatory finite difference method is used to simulate problems with shocks and a conservative, entropy stable, narrow-stencil finite difference approach is used to approximate viscous terms
High-order entropy-stable discontinuous Galerkin methods for the compressible Euler and Navier-Stoke...
The effect of reducing the formal order of accuracy of a finite-difference scheme in order to optimi...
The focus of the present research is on the analysis of local linear stability of high-order (includ...
Nonlinear entropy stability and a summation-by-parts framework are used to derive provably stable, p...
The entropy conservative, curvilinear, nonconforming, p-refinement algorithm for hyperbolic conserva...
Discrete approximations to hyperbolic systems of conservation laws are studied. The amount of numeri...
We present a streamline diffusion shock capturing spacetime discontinuous Galerkin (DG) method to ap...
Abstract. We construct a new family of entropy stable difference schemes which retain the precise en...
A central problem in computational fluid dynamics is the development of the numerical approximations...
In this paper, we propose a novel development in the context of entropy stable finite-volume/finite-...
Staggered grid, entropy stable discontinuous spectral collocation operators of any order are develop...
We present a high order accurate streamline-upwind/Petrov-Galerkin (SUPG) algorithm for the solution...
In this work a non-conservative balance law formulation is considered that encompasses the rotating,...
Entropy-Stable (ES) schemes have gathered considerable attention over the last decade, especially in...
In this paper, we present an entropy stable scheme for solving the compressible Navier-Stokes equat...
High-order entropy-stable discontinuous Galerkin methods for the compressible Euler and Navier-Stoke...
The effect of reducing the formal order of accuracy of a finite-difference scheme in order to optimi...
The focus of the present research is on the analysis of local linear stability of high-order (includ...
Nonlinear entropy stability and a summation-by-parts framework are used to derive provably stable, p...
The entropy conservative, curvilinear, nonconforming, p-refinement algorithm for hyperbolic conserva...
Discrete approximations to hyperbolic systems of conservation laws are studied. The amount of numeri...
We present a streamline diffusion shock capturing spacetime discontinuous Galerkin (DG) method to ap...
Abstract. We construct a new family of entropy stable difference schemes which retain the precise en...
A central problem in computational fluid dynamics is the development of the numerical approximations...
In this paper, we propose a novel development in the context of entropy stable finite-volume/finite-...
Staggered grid, entropy stable discontinuous spectral collocation operators of any order are develop...
We present a high order accurate streamline-upwind/Petrov-Galerkin (SUPG) algorithm for the solution...
In this work a non-conservative balance law formulation is considered that encompasses the rotating,...
Entropy-Stable (ES) schemes have gathered considerable attention over the last decade, especially in...
In this paper, we present an entropy stable scheme for solving the compressible Navier-Stokes equat...
High-order entropy-stable discontinuous Galerkin methods for the compressible Euler and Navier-Stoke...
The effect of reducing the formal order of accuracy of a finite-difference scheme in order to optimi...
The focus of the present research is on the analysis of local linear stability of high-order (includ...