Distributed Order Derivatives and Relaxation Patterns

Abstract

We consider equations of the form (D()u)(t)=-λ u(t), t>0, where λ >0, D() is a distributed order derivative, that is the Caputo-Dzhrbashyan fractional derivative of order α, integrated in α∈ (0,1) with respect to a positive measure . Such equations are used for modeling anomalous, non-exponential relaxation processes. In this work we study asymptotic behavior of solutions of the above equation, depending on properties of the measure .