Global existence and optimal decay estimates of strong solutions to the compressible viscoelastic flows

Abstract

This paper is dedicated to the global existence and optimal decay estimates of strong solutions to the compressible viscoelastic flows in the whole space Rn with any n≥2. We aim at extending those works by Qian \& Zhang and Hu \& Wang to the critical Lp Besov space, which is not related to the usual energy space. With aid of intrinsic properties of viscoelastic fluids as in QZ1, we consider a more complicated hyperbolic-parabolic system than usual Navier-Stokes equations. We define "two effective velocities", which allows us to cancel out the coupling among the density, the velocity and the deformation tensor. Consequently, the global existence of strong solutions is constructed by using elementary energy approaches only. Besides, the optimal time-decay estimates of strong solutions will be shown in the general Lp critical framework, which improves those decay results due to Hu \& Wu such that initial velocity could be large highly oscillating.