One-dimensional gas dynamics equations of a polytropic gas in Lagrangian coordinates: Symmetry classification, conservation laws, difference schemes

Dorodnitsyn V. A.; Kozlov R.; Meleshko S. V.

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One-dimensional gas dynamics equations of a polytropic gas in Lagrangian coordinates: Symmetry classification, conservation laws, difference schemes

机译：拉格朗日坐标中的多向气体的一维气体动力学方程：对称性分类，守恒律，差分方案

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A comprehensive analysis of the one-dimensional gas dynamics equations of a polytropic gas in Lagrangian coordinates is performed. One of the representations of these equations in Lagrangian coordinates is given by a single second-order partial differential equation. Symmetries of this equation are analyzed using the entropy for the group classification. Noether's theorem is applied for constructing conservation laws. The obtained conservation laws are represented in the gas dynamics variables in Lagrangian coordinates and in Eulerian coordinates as well. Invariant and conservative difference schemes are discussed for the basic adiabatic case. (C) 2019 Elsevier B.V. All rights reserved.

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《Communications in Nonlinear Science and Numerical Simulation》 |2019年第7期|201-218|共18页
作者
Dorodnitsyn V. A.; Kozlov R.; Meleshko S. V.;
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作者单位

Russian Acad Sci, Keldysh Inst Appl Math, Miusskaya Pl 4, Moscow 125047, Russia;

Norwegian Sch Econ, Dept Business & Management Sci, Helleveien 30, N-5045 Bergen, Norway;

Suranaree Univ Technol, Inst Sci, Sch Math, Nakhon Ratchasima 30000, Thailand;

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正文语种 eng
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关键词
Lagrangian gas dynamics; Lie point symmetries; Lie group classification; Conservation law; Noether's theorem; Numerical scheme;

机译：拉格朗日气体动力学;黎点对称性;黎族分类;守恒律;Noether定理;数值格式;

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1. One-dimensional gas dynamics equations of a polytropic gas in Lagrangian coordinates: Symmetry classification, conservation laws, difference schemes [J] . Dorodnitsyn V. A., Kozlov R., Meleshko S. V. Communications in Nonlinear Science and Numerical Simulation . 2019,第Jula期

机译：拉格朗日坐标的多维气体动力学方程：对称分类，保护法，差异方案
2. GROUP ANALYSIS OF THE ONE-DIMENSIONAL GAS DYNAMICS EQUATIONS IN LAGRANGIAN COORDINATES AND CONSERVATION LAWS [J] . Kaewmanee C., Meleshko S. V Journal of Applied Mechanics and Technical Physics . 2020,第2期

机译：拉格朗日坐标与保护法的一维气体动力学方程的组分析
3. Conservation laws of the one-dimensional equations of relativistic gas dynamics in Lagrangian coordinates [J] . Nakpim W., Meleshko S. V. International journal of non-linear mechanics . 2020,第Sepa期

机译：拉格朗日坐标中相对论气体动力学一维方程的保护规律
4. Conservation Laws of the One-Dimensional Isentropic Gas Dynamics Equations in Lagrangian Coordinates [C] . Evgeniy I. Kaptsov, Sergey V. Meleshko International Conferece on Modern Treatment of Symmetries, Differential Equations and Applications . 2019

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5. NONLOCAL LINEAR SECOND-ORDER "EQUATIONS OF MOTION" AND THEIR BALANCE LAWS AND CONSERVATION LAWS: A TECHNIQUE BYPASSING LAGRANGIANS. [D] . GOULD, LAURENCE IRA. 1982

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6. Derivation of an electron-transport rate equation energy-conservation equations and a luminescence-flux equation of algal and plant photosynthesis [O] . 1979

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7. One-dimensional gas dynamics equations of a polytropic gas in Lagrangian coordinates: Symmetry classification, conservation laws, difference schemes [O] . V.A. Dorodnitsyn, R. Kozlov, S.V. Meleshko 2019

机译：拉格朗日坐标的多维气体动力学方程：对称分类，保护法，差异方案
8. Lagrangian Approach to Evolution Equations: Symmetries and Conservation Laws [R] . Ibragimov, N. H., Kolsrud, T. 2003

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One-dimensional gas dynamics equations of a polytropic gas in Lagrangian coordinates: Symmetry classification, conservation laws, difference schemes

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