( ω , c ) $(\omega ,c)$ -periodic solutions for a class of fractional integrodifferential equations

Abstract

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Abstract In this paper we investigate the following fractional order in time integrodifferential problem D t α u ( t ) + A u ( t ) = f ( t , u ( t ) ) + ∫ − ∞ t k ( t − s ) g ( s , u ( s ) ) d s , t ∈ R . $$ \mathbb{D}_{t}^{\alpha}u(t)+Au(t)=f \bigl(t,u(t) \bigr)+ \int _{-\infty}^{t} k(t-s)g \bigl(s,u(s) \bigr)\,ds, \quad t \in \mathbb{R}. $$ Here, D t α $\mathbb{D}_{t}^{\alpha}$ is the Caputo derivative. We obtain results on the existence and uniqueness of ( ω , c ) $(\omega ,c)$ -periodic mild solutions assuming that −A generates an analytic semigroup on a Banach space X and f, g, and k satisfy suitable conditions. Finally, an interesting example that fits our framework is given.

Keywords

• ( ω , c ) $(\omega ,c)$ -periodic mild solutions
• Fractional integrodifferential equations
• Nonlocal Cauchy problem
• Fractional powers