On the identification of source term in the heat equation from sparse data

Abstract

We consider the recovery of a source term f(x,t)=p(x)q(t) for the nonhomogeneous heat equation in × (0,∞) where is a bounded domain in R2 with smooth boundary ∂ from overposed lateral data on a sparse subset of ∂×(0,∞). Specifically, we shall require a small finite number N of measurement points on ∂ and prove a uniqueness result; namely the recovery of the pair (p,q) within a given class, by a judicious choice of N=2 points. Naturally, with this paucity of overposed data, the problem is severely ill-posed. Nevertheless we shall show that provided the data noise level is low, effective numerical reconstructions may be obtained.