Boundedness and large time behavior in a higher-dimensional Keller--Segel system with singular sensitivity and logistic source

Abstract

This paper focuses on the following Keller-Segel system with singular sensitivity and logistic source \arrayll ut= u-∇·(uv∇ v)+ au-μ u2, x∈ , t>0, vt= v- v+u, x∈ , t>0 array.() in a smoothly bounded domain ⊂RN(N≥1), with zero-flux boundary conditions, where a>0,μ>0 and >0 are given constants. If is small enough, then, for all reasonable regular initial data, a corresponding initial-boundary value problem for () possesses a global classical solution (u, v) which is bounded in ×(0,+∞). Moreover, if μ is large enough, the solution (u, v) exponentially converges to the constant stationary solution (aμ , aμ ) in the norm of L∞() as t→∞. To the best of our knowledge, this new result is the first analytical work for the boundedness and asymptotic behavior of Keller--Segel system with singular sensitivity and logistic source in higher dimension case (N≥3).