Open AccessLimits of Riemann Solutions to the Relativistic Euler Systems for Chaplygin Gas as Pressure Vanishes
Author(s) -
Gan Yin,
Kyungwoo Song
Publication year - 2013
Publication title -
abstract and applied analysis
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.228
H-Index - 56
eISSN - 1687-0409
pISSN - 1085-3375
DOI - 10.1155/2013/296361
Subject(s) - polytropic process , chaplygin gas , barotropic fluid , shock wave , riemann problem , euler system , riemann hypothesis , euler's formula , rarefaction (ecology) , euler equations , mathematics , discontinuity (linguistics) , shock (circulatory) , mathematical analysis , mathematical physics , physics , classical mechanics , mechanics , quantum mechanics , medicine , biology , dark energy , species diversity , ecology , cosmology
Vanishing pressure limits of Riemann solutions to relativistic Euler system for Chaplygin gas are identified and analyzed in detail. Unlike the polytropic or barotropic gas case, as the parameter decreases to a critical value, the two-shock solution converges firstly to a delta shock wave solution to the same system. It is shown that, as the parameter decreases, the strength of the delta shock increases. Then as the pressure vanishes ultimately, the solution is nothing but the delta shock wave solution to the zero pressure relativistic Euler system. Meanwhile, the two-rarefaction wave solution and the solution containing one-rarefaction wave and one-shock wave tend to the vacuum solution and the contact discontinuity solution to the zero pressure relativistic Euler system, respectively
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