First- and second-order finite volume methods for the one-dimensional nonconservative Euler system

Clain, Stéphane; Rochette, David

doi:10.1016/j.jcp.2009.07.038

Cited by 29 publications

(19 citation statements)

References 33 publications

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“…There is a considerable literature devoted to the investigation of the Euler equations in a duct with variable cross section, for example Liu [12,13], as well as Andrianov and Warnecke [1]. For more related works, see [2,3,6,9,14,16,11,18], and the references cited therein.…”

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confidence: 99%

Exact Riemann Solutions to Compressible Euler Equations in Ducts With Discontinuous Cross-Section

Han

Hantke

Warnecke

2012

J. Hyper. Differential Equations

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Abstract. We determine completely the exact Riemann solutions for the system of Euler equations in a duct with discontinuous varying cross-section. The crucial point in solving the Riemann problem for hyperbolic system is the construction of the wave curves. To address the difficulty in the construction due to the nonstrict hyperbolicity of the underlying system, we introduce the L-M and R-M curves in the velocity-pressure phase plane. The behaviors of the L-M and R-M curves for six basic cases are fully analyzed. Furthermore, we observe that in certain cases the L-M and R-M curves contain the bifurcation which leads to the non-uniqueness of the Riemann solutions. Nevertheless, all possible Riemann solutions including classical as well as resonant solutions are solved in a uniform framework for any given initial data.

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confidence: 99%

Exact Riemann Solutions to Compressible Euler Equations in Ducts With Discontinuous Cross-Section

Han

Hantke

Warnecke

2012

J. Hyper. Differential Equations

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“…7 The discretization of Equations (1) is carried out with the Godunov method 15 on an arbitrary moving Eulerian grid. 7 The discretization of Equations (1) is carried out with the Godunov method 15 on an arbitrary moving Eulerian grid.…”

Section: Baseline Numerical Modelmentioning

confidence: 99%

A generalized Rusanov method for the Baer‐Nunziato equations with application to DDT processes in condensed porous explosives

Men’shov

Serezhkin

2017

Numerical Methods in Fluids

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Summary The paper addresses a numerical approach for solving the Baer‐Nunziato equations describing compressible 2‐phase flows. We are developing a finite‐volume method where the numerical flux is approximated with the Godunov scheme based on the Riemann problem solution. The analytical solution to this problem is discussed, and approximate solvers are considered. The obtained theoretical results are applied to develop the discrete model that can be treated as an extension of the Rusanov numerical scheme to the Baer‐Nunziato equations. Numerical results are presented that concern the method verification and also application to the deflagration‐to‐detonation transition (DDT) in porous reactive materials.

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“…В настоящей работе представлены основные положения этой модели и численный метод решения системы определяющих уравнений осесимметричного внутрибаллистического процесса. Полученная система уравнений относится к так называемым в литературе неконсервативным уравнениям Эйлера [6,7]. Неконсервативные члены в уравнениях возникают из-за соплового эффекта, связанного с неравномерным распределением по пространству объемной доли твердой компоненты.…”

Section: Introductionunclassified

Mathematical modeling of the axisymmetric internal ballistics processes

Semenov¹,

Men’shov

Nemtsev³

2017

KIAM Prepr.

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First- and second-order finite volume methods for the one-dimensional nonconservative Euler system

Cited by 29 publications

References 33 publications

Exact Riemann Solutions to Compressible Euler Equations in Ducts With Discontinuous Cross-Section

Exact Riemann Solutions to Compressible Euler Equations in Ducts With Discontinuous Cross-Section

A generalized Rusanov method for the Baer‐Nunziato equations with application to DDT processes in condensed porous explosives

Mathematical modeling of the axisymmetric internal ballistics processes

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