Liouville type theorem and kinetic formulation for 2x2 systems of conservation laws

Abstract

We study L∞ entropy solutions to 2× 2 systems of conservation laws. We show that, if a uniformly convex entropy exists, these solutions satisfy a pair of kinetic equations (nonlocal in velocity), which are then shown to characterize all solutions with finite entropy production. Next, we prove a Liouville-type theorem for genuinely nonlinear systems, which is the main result of the paper. This implies in particular that for every finite entropy solution, every point (t,x) ∈ R+× R J is of vanishing mean oscillation, where J ⊂ R+× R is a set of Hausdorff dimension at most 1.

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