On the Convergence Rate of Vanishing Viscosity Approximations

Abstract

Given a strictly hyperbolic, genuinely nonlinear system of conservation laws, we prove the a priori bound \|u(t,·)-u(t,·)\|1= (1)(1+t)· || on the distance between an exact BV solution u and a viscous approximation u, letting the viscosity coefficient 0. In the proof, starting from u we construct an approximation of the viscous solution u by taking a mollification u*φ and inserting viscous shock profiles at the locations of finitely many large shocks, for each fixed . Error estimates are then obtained by introducing new Lyapunov functionals which control shock interactions, interactions between waves of different families and by using sharp decay estimates for positive nonlinear waves.

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