Asymptotic behavior and representation of solutions to a Volterra kind of equation with a singular kernel

Abstract

Let A be a densely defined closed, linear ω-sectorial operator of angle θ∈ [0,π2) on a Banach space X for some ω∈ R. We give an explicit representation (in terms of some special functions) and study the precise asymptotic behavior as time goes to infinity of solutions to the following diffusion equation with memory: u'(t)=Au(t)+( Au)(t), \, t >0, u(0)=u0, associated with the (possible) singular kernel (t)=α e-β ttμ-1(μ),\;\;t>0, where α∈, α 0, β 0 and 0<μ 1.