International audienceIn the present paper, a stable Spectral Difference formulation on triangles is defined using a flux polynomial expressed in the Raviart-Thomas basis up to the sixth-order of accuracy. Compared to the literature on the Spectral Difference approach, the present work increases the order of accuracy that the stable formulation can deal with. The proposed scheme is based on a set of flux points defined in the paper. The sets of points leading to a stable formulation are determined using a Fourier stability analysis of the linear advection equation coupled with an optimization process. The proposed Spectral Difference formulation differs from the Flux Reconstruction method on hybrid grids: the distinction between the two app...
The overriding objective for this project is to develop an efficient and accurate method for capturi...
Navier–Stokes Bio-inspired flow a b s t r a c t A high-order spectral difference (SD) method has bee...
. This paper presents an asymptotically stable scheme for the spectral approximation of linear conse...
This thesis examines the extension of the Spectral Difference (SD) method on unstructured hybrid gri...
International audienceIn this paper, the Spectral Difference approach using Raviart-Thomas elements ...
This thesis examines the extension of the Spectral Difference (SD) method on unstructured hybrid gri...
High-order direct numerical simulations of transitional and turbulent fluid flows require smooth gri...
The purpose of this work is to describe in detail the development of the spectral difference Raviart...
The high-order methods is difficultly applied in various elements. The development of a 3D solver by...
A spectral difference (SD) solver using quadrilateral and hexahedral grids for the Navier-Stokes equ...
Global spectral methods often give exponential convergence rates and have high accuracy, but are uns...
The discontinuous spectral methods (Discontinuous Galerkin, Spectral Difference, Spec- tral Volume, ...
In the article, using the method of small perturbations, mathematical models of hydrodynamic ...
In the article, using the method of small perturbations, mathematical models of hydrodynamic ...
Thesis (Ph.D.)--Wichita State University, College of Liberal Arts and Sciences, Dept. of Mathematics...
The overriding objective for this project is to develop an efficient and accurate method for capturi...
Navier–Stokes Bio-inspired flow a b s t r a c t A high-order spectral difference (SD) method has bee...
. This paper presents an asymptotically stable scheme for the spectral approximation of linear conse...
This thesis examines the extension of the Spectral Difference (SD) method on unstructured hybrid gri...
International audienceIn this paper, the Spectral Difference approach using Raviart-Thomas elements ...
This thesis examines the extension of the Spectral Difference (SD) method on unstructured hybrid gri...
High-order direct numerical simulations of transitional and turbulent fluid flows require smooth gri...
The purpose of this work is to describe in detail the development of the spectral difference Raviart...
The high-order methods is difficultly applied in various elements. The development of a 3D solver by...
A spectral difference (SD) solver using quadrilateral and hexahedral grids for the Navier-Stokes equ...
Global spectral methods often give exponential convergence rates and have high accuracy, but are uns...
The discontinuous spectral methods (Discontinuous Galerkin, Spectral Difference, Spec- tral Volume, ...
In the article, using the method of small perturbations, mathematical models of hydrodynamic ...
In the article, using the method of small perturbations, mathematical models of hydrodynamic ...
Thesis (Ph.D.)--Wichita State University, College of Liberal Arts and Sciences, Dept. of Mathematics...
The overriding objective for this project is to develop an efficient and accurate method for capturi...
Navier–Stokes Bio-inspired flow a b s t r a c t A high-order spectral difference (SD) method has bee...
. This paper presents an asymptotically stable scheme for the spectral approximation of linear conse...