Uniqueness Domains for L∞ Solutions of 2 × 2 Hyperbolic Conservation Laws

Abstract

For a genuinely nonlinear 2× 2 hyperbolic system of conservation laws, assuming that the initial data have small L∞ norm but possibly unbounded total variation, the existence of global solutions was proved in a classical paper by Glimm and Lax (1970). In general, the total variation of these solutions decays like t-1. Motivated by the theory of fractional domains for linear analytic semigroups, we consider here solutions with faster decay rate: Tot. Var. \u(t,·)\≤ C tα-1. For these solutions, a uniqueness theorem is proved. Indeed, as the initial data range over a domain of functions with \| u\| L∞ ≤1 small enough, solutions with fast decay yield a H\"older continuous semigroup. The H\"older exponent can be taken arbitrarily close to 1 by further shrinking the value of 1>0. An auxiliary result identifies a class of initial data whose solutions have rapidly decaying total variation.