A Widder's type Theorem for the heat equation with nonlocal diffusion

Abstract

The main goal of this work is to prove that every non-negative strong solution u(x,t) to the problem ut+(-)α/2u=0 \ for (x,t)∈Rn×(0,T), 0<α<2, can be written as u(x,t)=∫RnPt(x-y)u(y,0)\, dy, where Pt(x)=1tn/αP(xt1/α), and P(x):=∫Rneix·-||αd. This result shows uniqueness in the setting of non-negative solutions and extends some classical results for the heat equation by D. V. Widder in W0 to the nonlocal diffusion framework.