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EXISTENCE RESULT FOR THE COUPLING PROBLEM OF TWO SCALAR CONSERVATION LAWS WITH RIEMANN INITIAL DATA

BENJAMIN BOUTIN

CEA-Saclay, DEN/DANS/DM2S/SFME/LETR, Gif-sur-Yvette Cedex, 91191, France

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CHRISTOPHE CHALONS

CEA-Saclay, DEN/DANS/DM2S/SFME/LETR, Gif-sur-Yvette Cedex, 91191, France

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PIERRE-ARNAUD RAVIART

UMR 7598 Laboratoire Jacques-Louis Lions, CNRS & Université Pierre et Marie Curie-Paris 6, Boîte Courrier 187, 75252 Paris Cedex 05, France

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https://doi.org/10.1142/S0218202510004817Cited by:10 (Source: Crossref)

Abstract

This paper is devoted to the coupling problem of two scalar conservation laws through a fixed interface located for instance at x = 0. Each scalar conservation law is associated with its own (smooth) flux function and is posed on a half-space, namely x < 0 or x > 0. At interface x = 0 we impose a coupling condition whose objective is to enforce in a weak sense the continuity of a prescribed variable, which may differ from the conservative unknown (and the flux functions as well). We prove the existence of a solution to the coupled Riemann problem using a constructive approach. The latter allows in particular to highlight interesting features like non-uniqueness of both continuous and discontinuous (at interface x = 0) solutions. The behavior of some numerical scheme is also investigated.

Keywords:

AMSC: 35L50, 35L65, 65M12, 76M12

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