The large-time behavior of solutions in the critical Lp framework for compressible viscous and heat-conductive gas flows

Abstract

The Lp theory for non-isentropic Navier-Stokes equations governing compressible viscous and heat-conductive gases is not yet proved completely so far, because the critical regularity cannot control all non linear coupling terms. In this paper, we pose an additional regularity assumption of low frequencies in Rd(d≥ 3), and then the sharp time-weighted inequality can be established, which leads to the time-decay estimates of global strong solutions in the Lp critical Besov spaces. Precisely, we show that if the initial data belong to some Besov space B-s12,∞ with s1∈ (1-d2, s0](s0 2dp-d2), then the Lp norm of the critical global solutions admits the time decay t-s12-d2(12-1p) (in particular, t-d2p if s1=s0), which coincides with that of heat kernel in the Lp framework. In comparison with DX2, the low-frequency regularity s1 can be improved to be the whole range.