Vanishing viscosity limit for n× n hyperbolic system of conservation laws in 1-d with nonlinear viscosity: Part-I Uniform BV estimates

Abstract

We consider the following parabolic approximation for hyperbolic system of conservation laws in 1-D with non-singular viscosity matrix B(u) and A(u) strictly hyperbolic, \[ut+A(u)ux=(B(u)ux)x.\] We prove global in time uniform BV bound for solution to this parabolic system when >0 provided that the initial data is small in BV and the matrix A(u) and B(u) commutate. Moreover, in the case where the system is conservative, we show that the sequence (u)>0 admits a limit u, which is the unique global weak solution to the limiting strictly hyperbolic system. We provide a concrete application of this result in the study of the visco-dispersive limit of the Navier-Stokes-Korteweg system.