Uniqueness of inverse source problems for time-fractional diffusion equations with singular functions in time

Abstract

We consider a fractional diffusion equations of order α∈(0,1) whose source term is singular in time: (∂tα+A)u(x,t)=μ(t)f(x), (x,t)∈×(0,T), where μ belongs to a Sobolev space of negative order. In inverse source problems of determining f| by the data u|ω×(0,T) with a given subdomain ω⊂ or μ|(0,T) by the data u|\x0\×(0,T) with a given point x0∈, we prove the uniqueness by reducing to the case μ∈ L2(0,T). The key is a transformation of a solution to an initial-boundary value problem with a regular function in time.