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Main Authors: Siraeva, Dilara, Kogan, Irina A.
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2510.01415
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author Siraeva, Dilara
Kogan, Irina A.
author_facet Siraeva, Dilara
Kogan, Irina A.
contents This paper is a contribution to the symmetry analysis of the gas dynamics system in the vein of the ''podmodeli'' (submodels) program outlined by Ovsyannikov (1994). We consider the case of the special state equation, prescribing pressure to be the sum of entropy and an arbitrary function of density. Such a system has a 12-dimensional symmetry Lie algebra. This work advances the study of its four-dimensional subalgebras, continuing the work started in Siraeva (2024). For a large subset of not previously considered, non-similar four-dimensional subalgebras from an optimal list in Siraeva (2014), we compute a complete set of generating invariants. For one of the subalgebras, we construct a partially symmetry-reduced system. We explicitly solve this reduced system (submodel). This leads to new families of explicit solutions of the original system. We analyze the trajectories of these solutions. Additionally, we match each of the subalgebras considered in this paper with its isomorphism class, planting a seed for future study of the hierarchy of the reduced systems.
format Preprint
id arxiv_https___arxiv_org_abs_2510_01415
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Symmetry analysis and new partially invariant solutions for the gas dynamics system with a special equation of state
Siraeva, Dilara
Kogan, Irina A.
Analysis of PDEs
35B06, 35A30
This paper is a contribution to the symmetry analysis of the gas dynamics system in the vein of the ''podmodeli'' (submodels) program outlined by Ovsyannikov (1994). We consider the case of the special state equation, prescribing pressure to be the sum of entropy and an arbitrary function of density. Such a system has a 12-dimensional symmetry Lie algebra. This work advances the study of its four-dimensional subalgebras, continuing the work started in Siraeva (2024). For a large subset of not previously considered, non-similar four-dimensional subalgebras from an optimal list in Siraeva (2014), we compute a complete set of generating invariants. For one of the subalgebras, we construct a partially symmetry-reduced system. We explicitly solve this reduced system (submodel). This leads to new families of explicit solutions of the original system. We analyze the trajectories of these solutions. Additionally, we match each of the subalgebras considered in this paper with its isomorphism class, planting a seed for future study of the hierarchy of the reduced systems.
title Symmetry analysis and new partially invariant solutions for the gas dynamics system with a special equation of state
topic Analysis of PDEs
35B06, 35A30
url https://arxiv.org/abs/2510.01415