EXISTENCE OF GLOBAL SMOOTH SOLUTIONS FOR TWO IMPORTANT NONSTRICTLY QUASILINEAR HYPERBOLIC SYSTEMS

In this paper, we study the global smooth solutions of the Cauchy problem for two important nonstrictly quasilinear hyperbolic systems, i.e., the isentropic gas dynamics system in Euler coordinates (I) and the rotational degeneracy of hyperbolic systems of conservation laws (II). sufficient conditio...

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Bibliographic Details
Published in	Acta mathematica scientia Vol. 15; no. 1; pp. 48 - 57
Main Author	朱长江赵会江
Format	Journal Article
Language	English
Published	Elsevier Ltd 1995
Subjects	a priori estimates estimates global global smooth solution hyperbolic Nonstrictly Nonstrictly quasilinear hyperbolic system priori quasilinear smooth solution system global smooth solution a priori estimates Nonstrictly quasilinear hyperbolic system
Online Access	Get full text
ISSN	0252-9602 1572-9087
DOI	10.1016/S0252-9602(18)30022-5

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Summary:	In this paper, we study the global smooth solutions of the Cauchy problem for two important nonstrictly quasilinear hyperbolic systems, i.e., the isentropic gas dynamics system in Euler coordinates (I) and the rotational degeneracy of hyperbolic systems of conservation laws (II). sufficient conditions which guarantee the existence of global smooth solutions of the Cauchy problems (I) and (II) are obtained by employing the characteristic method.
Bibliography:	Zhu Changjiang;Zhao Huijang(Wuhan Inst.of Math.Sci,Chin.Acad.of Sci, Wuhan 430071,China.) 42-1227/O
ISSN:	0252-9602 1572-9087
DOI:	10.1016/S0252-9602(18)30022-5