Optimal decay for the compressible Navier-Stokes equations without additional smallness assumptions

Abstract

This work is concerned with the large time behavior of solutions to the barotropic compressible Navier-Stokes equations in Rd(d≥2). Precisely, it is shown that if the initial density and velocity additionally belong to some Besov space B-σ12,∞ with σ1∈ (1-d/2, 2d/p-d/2], then the Lp norm (the slightly stronger B0p,1 norm in fact) of global solutions admits the optimal decay t-d2( 12- 1p)-σ12 for t→+∞. In contrast to refined time-weighted approaches ([11,43]), a pure energy argument (independent of the spectral analysis) has been developed in more general Lp critical framework, which allows to remove the smallness of low frequencies of initial data. Indeed, bounding the evolution of B-σ12,∞-norm restricted in low frequencies is the key ingredient, whose proof mainly depends on non standard Lp product estimates with respect to different Sobolev embeddings. The result can hold true in case of large highly oscillating initial velocities.