Boundedness and homogeneous asymptotics for a fractional logistic Keller-Segel equations

Abstract

In this paper we consider a d-dimensional (d=1,2) parabolic-elliptic Keller-Segel equation with a logistic forcing and a fractional diffusion of order α ∈ (0,2). We prove uniform in time boundedness of its solution in the supercritical range α>d(1-c), where c is an explicit constant depending on parameters of our problem. Furthermore, we establish sufficient conditions for \|u(t)-u∞\|L∞→0, where u∞ 1 is the only nontrivial homogeneous solution. Finally, we provide a uniqueness result.