Well-posedness of the Viscous Boussinesq System in Besov Spaces of Negative Order Near Index s=-1

Abstract

This paper is concerned with well-posedness of the Boussinesq system. We prove that the n (n2) dimensional Boussinesq system is well-psoed for small initial data (u0,θ0) (∇·u0=0) either in (B-1∞,1B-1,1∞,∞)×B-1p,r or in B-1,1∞,∞×B-1,εp,∞ if r∈[1,∞], ε>0 and p∈(n2,∞), where Bs,εp,q (s∈R, 1≤ p,q≤∞, ε>0) is the logarithmically modified Besov space to the standard Besov space Bsp,q. We also prove that this system is well-posed for small initial data in (B-1∞,1B-1,1∞,∞)×(B-1n2,1B-1,1n2,∞).