Compact almost automorphic solutions for semilinear parabolic evolution equations

Abstract

In this paper, using the subvariant functional method due to Favard Favard, we prove the existence of aunique compact almost automorphic solution for a class of semilinear evolution equations in Banach spaces. More specifically, we improve the assumptions in CieuEzz, we show that the almost automorphy of the coefficients in a weaker sense (Stepanov almost automorphy of order 1≤ p <∞) is enough to obtain solutions that are almost automorphic in a strong sense (Bochner almost automorphy). We distinguish two cases, p=1 and p>1. Moreover, we propose to study a class of reaction-diffusion problems.