Optimal decay for the compressible MHD equations in the critical regularity framework

Abstract

In this paper, we study the large time behavior of solutions to the compressible magnetohydrodynamic equations in the Lp-type critical Besov spaces. Precisely, we show that if the initial data in the low frequencies additionally belong to some Besov space B2,∞-σ1 with σ1∈ (1-N/2, 2N/p-N/2], then the Bp,10 norm of the critical global solutions presents the optimal decay t-N2(12-1p)-σ12 for t→+∞. The pure energy argument without the spectral analysis is performed, which allows us to remove the usual smallness assumption of low frequencies.