An undetermined time-dependent coefficient in a fractional diffusion equation

Abstract

In this work, we consider a FDE (fractional diffusion equation) C Dtα u(x,t)-a(t)L u(x,t)=F(x,t) with a time-dependent diffusion coefficient a(t). For the direct problem, given an a(t), we establish the existence, uniqueness and some regularity properties with a more general domain and right-hand side F(x,t). For the inverse problem--recovering a(t), we introduce an operator K one of whose fixed points is a(t) and show its monotonicity, uniqueness and existence of its fixed points. With these properties, a reconstruction algorithm for a(t) is created and some numerical results are provided to illustrate the theories.