Periodic Solutions of the parabolic-elliptic Keller-Segel system on whole spaces

Abstract

In this paper, we investigate to the existence and uniqueness of periodic solutions for the parabolic-elliptic Keller-Segel system on whole spaces detailized by Euclidean space Rn\,\,( where n ≥slant 4) and real hyperbolic space Hn\,\, (where n ≥slant 2). We work in framework of scritical spaces such as on weak-Lorentz space Ln2,∞(Rn) to obtain the results for Keller-Segel system on Rn and on Lp2(Hn) for n<p<2n to obtain the ones on Hn. Our method is based on the dispersive and smoothing estimates of the heat semigroup and fixed point arguments. This work provides also a fully comparison between the asymptotic behaviours of periodic mild solutions of Keller-Segel system obtained in Rn and the one in Hn.