Stepanov ergodic perturbations for nonautonomous evolution equations in Banach spaces

Abstract

In this work, we prove the existence and uniqueness of μ-pseudo almost automorphic solutions for some class of semilinear nonautonomous evolution equations of the form: u'(t)=A(t)u(t)+f(t,u(t)),\; t∈R where (A(t))t∈ R is a family of closed densely defined operators acting on a Banach space X that generates a strongly continuous evolution family which has an exponential dichotomy on R. The nonlinear term f: R × X X is just μ-pseudo almost automorphic in Stepanov sense in t and Lipshitzian with respect to the second variable. For illustration, an application is provided for a class of nonautonomous reaction diffusion equations on R.