Your search keyword '"Shock instability"' showing total 3 results

1. A Shock Stabilization of the HLLC Riemann Solver for the Carbuncle Instability.

Author

Baumgart, Alexandra, Jones, Samuel W., Edelmann, Philipp V. F., and Dolence, Joshua C.

Abstract

The HLLC approximate Riemann solver improves upon the HLL Riemann solver by resolving contact discontinuities. This is a particularly desirable property for multi-material codes in which problems usually contain material interfaces. However, the HLLC solver is known to suffer from the carbuncle phenomenon, a numerical instability most apparent at grid-aligned shocks in multi-dimensional simulations. Many problems of interest, including high energy-density physics applications, require the accurate resolution of both material interfaces and hydrodynamic shocks. A variety of methods have been developed to cure this instability, with varying degrees of complexity. The objective of this work is to describe a simple approach to modify the HLLC Riemann solver and prevent the carbuncle instability. The method is then demonstrated for assorted two-dimensional test problems known to exhibit the shock instability. The performance of the new solver is compared with that of the standard HLL and HLLC Riemann solvers. [ABSTRACT FROM AUTHOR]

Published

2024

2. A carbuncle cure for the Harten-Lax-van Leer contact (HLLC) scheme using a novel velocity-based sensor.

Author

Vevek, U. S., Zang, B., and New, T. H.

Subjects

*DETECTORS, *CURING, *DATA structures, *EULER equations

Abstract

A hybrid numerical flux scheme is proposed by adapting the carbuncle-free modified Harten-Lax-van Leer contact (HLLCM) scheme to smoothly revert to the Harten-Lax-van Leer contact (HLLC) scheme in regions of shear. This hybrid scheme, referred to as the HLLCT scheme, employs a novel, velocity-based shear sensor. In contrast to the non-local pressure-based shock sensors often used in carbuncle cures, the proposed shear sensor can be computed in a localized manner meaning that the HLLCT scheme can be easily introduced into existing codes without having to implement additional data structures. Through numerical experiments, it is shown that the HLLCT scheme is able to resolve shear layers accurately without succumbing to the shock instability. [ABSTRACT FROM AUTHOR]

Published

2021

3. Cures for expansion shock and shock instability of Roe scheme based on momentum interpolation mechanism.

Author

Li, Xuesong, Ren, Xiaodong, and Gu, Chunwei

Subjects

*MECHANICAL shock, *EXPANSION of solids, *MOMENTUM (Mechanics), *INTERPOLATION, *CURING

Abstract

The common defects of the Roe scheme are the non-physical expansion shock and shock instability. By removing the momentum interpolation mechanism (MIM), an improved method with several advantages has been presented to suppress the shock instability. However, it cannot prevent the expansion shock and is incompatible with the traditional curing method for expansion shock. To solve the problem, the traditional curing mechanism is analyzed. Effectiveness of the traditional curing method is discussed, and several defects are identified, one of which leads to incompatibility between curing shock instability and expansion shock. Consequently, an improved Roe scheme is proposed, which is with low computational costs, concise, easy to implement, and robust. More importantly, the proposed scheme can simultaneously solve the problem of shock instability and expansion shock without additional costs. [ABSTRACT FROM AUTHOR]

Published

2018