Transformations of gas dynamics equations and basis operators of a admitted 11-dimensional Lie algebra. Multiphase Systems. 15 (2020) 3–4. 217–222 (in Russian).
Transformations of gas dynamics equations and basis operators of a admitted 11-dimensional Lie algebra
Siraeva D.T.∗, Yulmukhametova Y.V.∗,∗∗
∗Mavlyutov Institute of Mechanics UFRC RAS, Ufa, Russia
∗∗Ufa State Aviation Technical University, Ufa, Russia
Abstract
In this paper, the gas dynamics equations are considered. The system is closed by a general equation of state.
This equations describe a model of an inviscid non-heat-conducting gas motion in the absence of external force
fields and external energy sources. The system is invariant under the 11-parameter group with the corresponding
11-dimensional Lie algebra. The gas dynamics equations, equations of motion, and basis operators of the Lie algebra
are written in Cartesian, Cylindrical, and Spherical coordinate systems. The steps involved when changing the
coordinate system are illustrated in detail.
Keywordsgas dynamics equations,
cylindrical coordinate system,
spherical coordinate system,
operators of 11-dimensional Lie algebra
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