Communications in Mathematical Sciences

Volume 2 (2004)

Number 2

Coninuous Glimm-Type Functionals and Spreading of Rarefaction Waves

Pages: 213 – 236

DOI: http://dx.doi.org/10.4310/CMS.2004.v2.n2.a5

Authors

Philippe G. Lefloch

Andkonstantina Trivisa

Abstract

Several Glimm-type functionals for (piecewise smooth) approximate solutions of nonlinear hyperbolic systems have been introduced in recent years. In this paper, following a work by Baiti and Bressan on genuinely nonlinear systems we provide a framework to prove that such functionals can be extended to general functions with bounded variation and we investigate their lower semi-continuity properties with respect to the strong L1topology. In particular, our result applies to the functionals introduced by Iguchi-LeFloch and Liu-Yang for systems with general flux-functions, as well as the functional introduced by Baiti-LeFloch-Piccoli for nonclassical entropy solutions. As an illustration of the use of continuous Glimm-type functionals, we also extend a result by Bressan and Colombo for genuinely nonlinear systems, and establish an estimate on the spreading of rarefaction waves in solutions of hyperbolic systems with general flux-function.

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