Various forms of numerical shock instabilities are known to plague many contact and shear preserving approximate Riemann solvers, including the popular Harten-Lax-van Leer with Contact (HLLC) scheme, during high speed flow simulations governed by the Euler system of equations. In this paper we propose a simple and inexpensive novel strategy to prevent the HLLC scheme from developing such spurious solutions without compromising on its linear wave resolution ability. The cure is primarily based on a reinterpretation of the HLLC scheme as a combination of its well-known diffusive counterpart, the HLL scheme, and an antidiffusive term responsible for its accuracy on linear wavefields. In our study, a linear analysis of this alternate form indic...
A common perspective on the numerical solution of the equation Euler equations for shock physics is ...
From the early stages of CFD, the computation of shocks using Finite Volume methods has been a very ...
The HLLEM approximate Riemann solver can capture discontinuities sharply, maintain positive definite...
A simple HLLE-type scheme is proposed for all Mach number flows. In the proposed scheme, no extra wa...
AbstractA hybrid numerical flux scheme is proposed by adapting the carbuncle-free modified Harten-La...
In this paper, a simple Harten, Lax and van Leer (HLL) type Riemann solver, capable of resolving con...
International audienceThe appearance of shock anomaly is a major unsolved problem for some low diffu...
The carbuncle phenomenon has been regarded as a spurious solution produced by most of contact-preser...
This article presents a new cell-centered numerical method for compressible flows on arbitrary unstr...
This article presents an all-Mach method for two-phase inviscid flow in the presence of surface tens...
This article presents an all-Mach method for two-phase inviscid flow in the presence of surface tens...
The HLL approximate Riemann solver is a reliable, fast and easy to implement tool for the under-reso...
This paper deals with the development of an improved Roe scheme that is free from the shock instabil...
Existing approximate Riemann solvers do not perform well when the grid is not aligned with strong sh...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/76146/1/AIAA-2008-3991-573.pd
A common perspective on the numerical solution of the equation Euler equations for shock physics is ...
From the early stages of CFD, the computation of shocks using Finite Volume methods has been a very ...
The HLLEM approximate Riemann solver can capture discontinuities sharply, maintain positive definite...
A simple HLLE-type scheme is proposed for all Mach number flows. In the proposed scheme, no extra wa...
AbstractA hybrid numerical flux scheme is proposed by adapting the carbuncle-free modified Harten-La...
In this paper, a simple Harten, Lax and van Leer (HLL) type Riemann solver, capable of resolving con...
International audienceThe appearance of shock anomaly is a major unsolved problem for some low diffu...
The carbuncle phenomenon has been regarded as a spurious solution produced by most of contact-preser...
This article presents a new cell-centered numerical method for compressible flows on arbitrary unstr...
This article presents an all-Mach method for two-phase inviscid flow in the presence of surface tens...
This article presents an all-Mach method for two-phase inviscid flow in the presence of surface tens...
The HLL approximate Riemann solver is a reliable, fast and easy to implement tool for the under-reso...
This paper deals with the development of an improved Roe scheme that is free from the shock instabil...
Existing approximate Riemann solvers do not perform well when the grid is not aligned with strong sh...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/76146/1/AIAA-2008-3991-573.pd
A common perspective on the numerical solution of the equation Euler equations for shock physics is ...
From the early stages of CFD, the computation of shocks using Finite Volume methods has been a very ...
The HLLEM approximate Riemann solver can capture discontinuities sharply, maintain positive definite...