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Article type: Research Article
Authors: Zhang, Yua; * | Zhang, Yanyanb | Wang, Jinhuanc
Affiliations: [a] Department of Mathematics, Yunnan Normal University, Kunming 650500, P.R. China. E-mail: yuzhang13120@126.com | [b] College of Mathematics and Statistics, Xinyang Normal University, Xinyang 464000, P.R. China. E-mail: zyy@xynu.edu.cn | [c] Department of Mathematics and Information Science, Tangshan Normal University, Tangshan 063000, P.R. China. E-mail: w.j.h.0004@126.com
Correspondence: [*] Corresponding author. E-mail: yuzhang13120@126.com.
Abstract: By introducing an isentropic Euler system with a new version of extended Chaplygin gas equation of state, we study two kinds of occurrence mechanism on the phenomenon of concentration and the formation of delta shock waves in the zero-exponent limit of solutions to the extended Chaplygin gas equations as the two exponents tend to zero wholly or partly. The Riemann problem is first solved. Then, we show that, as both the two exponents tend to zero, that is, the extended Chaplygin gas pressure tends to a constant, any two-shock-wave Riemann solution of the extended Chaplygin gas equations converges to a delta-shock solution to the zero-pressure flow system, and the intermediate density between the two shocks tends to a weighted δ-measure which forms a delta shock wave; any two-rarefaction-wave Riemann solution tends to a two-contact-discontinuity solution to the zero-pressure flow system, and the nonvacuum intermediate state in between tends to a vacuum. It is also shown that, as one of the exponents goes to zero, namely, the extended Chaplygin gas pressure approaches to some special generalized Chaplygin gas pressure, any two-shock-wave Riemann solution tends to a delta-shock solution to the generalized Chaplygin gas equations.
Keywords: Isentropic Euler equations, extended Chaplygin gas, generalized Chaplygin gas, delta shock wave, Riemann problem, zero-exponent limit
DOI: 10.3233/ASY-201609
Journal: Asymptotic Analysis, vol. 122, no. 1-2, pp. 35-67, 2021
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