On pseudo almost Periodic Solutions of the parabolic-elliptic Keller-Segel systems

TL;DR

This paper establishes the existence, uniqueness, and exponential stability of pseudo almost periodic solutions for the parabolic-elliptic Keller-Segel system on bounded domains, extending results to hyperbolic manifolds.

Contribution

It introduces a novel approach to analyze pseudo almost periodic solutions of the Keller-Segel system using semigroup estimates and fixed point methods.

Findings

Proved well-posedness of linear and semilinear systems.

Established exponential stability of solutions.

Extended results to hyperbolic manifold settings.

Abstract

In this paper we investigate the existence, uniqueness and exponential stability of pseudo almost periodic (PAP-) mild solutions of the parabolic-elliptic (P-E) Keller-Segel system on a bounded domain $\Omega\in \mathbb{R}^n$ with smooth boundary. First, the well-posedness of the corresponding linear system is established by using the smoothing estimates of the Neumann heat semigroup on $\Omega$. Then, the existence of PAP-mild solution of linear system is done by proving a Massera-type principle. Next, we obtain the well-posedness of such solutions for semilinear system by using the results of linear system and fixed point arguments. The exponential stability is proven by using again the estimates of the Neumann heat semigroup. Finally, we discuss also such results for the case of the Keller-Segel system on the framework of real hyperbolic manifolds.