Asymptotic profile of a two-dimensional chemotaxis--Navier--Stokes system with singular sensitivity and logistic source

Abstract

The chemotaxis--Navier--Stokes system equation*0.1 \arrayll nt+u· ∇ n= n-∇·p ( n c∇ c)+n(r-μ n), ct+u· ∇ c= c-nc, ut+ (u· ∇) u= u+∇ P+n∇φ, ∇· u=0, array. equation* is considered in a bounded smooth domain ⊂ R2, where φ∈ W1,∞(), >0, r∈ R and μ> 0 are given parameters. It is shown that there exists a value μ*(,, r)≥ 0 such that whenever μ>μ*(,, r), the global-in-time classical solution to the system is uniformly bounded with respect to x∈ . Moreover, for the case r>0, (n,c, |∇ c|c,u) converges to ( r μ,0,0,0) in L∞()× L∞()× Lp()× L∞() for any p>1 exponentially as t→ ∞, while in the case r=0, (n,c, |∇ c|c,u) converges to (0,0,0,0) in (L∞())4 algebraically. To the best of our knowledge, these results provide the first precise information on the asymptotic profile of solutions in two dimensions.