Asymptotic Behavior of Polynomially Bounded Solutions of Linear Fractional Differential Equations

Abstract

In this paper we study the asymptotic behavior of solutions of fractional differential equations of the form DαCu(t)=Au(t)+f(t) on the half line, where DαCu(t) is the derivative of the function u in Caputo's sense, A is generally an unbounded closed operator, f is polynomially bounded. To this end we develop a spectral theory for functions of polynomial growth on the half line. Our main result claims that if u is mild solution of the Cauchy problem such that h 0 t 0 \| u(t+h)-u(t)\|/(1+t)n=0, and t 0 \| u(t)\| /(1+t)n <∞, then, t∞ u(t)/(1+t)n =0 provided that the spectral set (A,α ) i is countable, where (A,α ) is defined to be the set of complex numbers such that λα -1 (λα -A)-1 is analytic in a neighborhood of , and u satisfies some ergodic