Decay of large solutions around shocks to multi-D viscous conservation law with strictly convex flux

Abstract

We consider a planar viscous shock for a scalar viscous conservation law with a strictly convex flux in multi-dimensional setting, where the transversal direction is periodic. We first show the contraction property for any solutions evolving from a large bounded initial perturbation in L2 of the viscous shock. The contraction holds up to a dynamical shift, and it is measured by a weighted relative entropy. This result for the contraction extends the existing result in 1D Kang19 to the multi-dimensional case. As a consequence, if the large bounded initial L2-perturbation is also in L1, then the large perturbation decays of rate t-1/4 in L2, up to a dynamical shift that is uniformly bounded in time. This is the first result for the quantitative estimate converging to a planar shock under large perturbations.