Measure-Valued Solutions and Well-Posedness of Multi-Dimensional Conservation Laws in A Bounded Domain

Cezar I. Kondo and Philippe G. LeFloch

Abstract: We propose a general framework to establish the strong convergence of approximate solutions to multi-dimensional conservation laws in a bounded domain, provided uniform bounds on their $L^p$ norm and their entropy dissipation measures are available. To this end, existence, uniqueness, and compactness results are proven in a class of entropy measure-valued solutions, following DiPerna and Szepessy. The new features lie in the treatment of the boundary condition, which we are able to formulate by relying only on an $L^p$ uniform bound. This framework is applied here to prove the strong convergence of diffusive approximations of hyperbolic conservation laws.

Keywords: Conservation law; Entropy inequality; Measure-valued solution; Boundary condition; Well-posedness.

Classification (MSC2000): 35L65.; 76N10.

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