The Liouville theorem and linear operators satisfying the maximum principle

Abstract

A result by Courr\`ege says that linear translation invariant operators satisfy the maximum principle if and only if they are of the form L=Lσ,b+Lμ where Lσ,b[u](x)=tr(σ σT D2u(x))+b· Du(x) and Lμ[u](x)=∫ (u(x+z)-u-z· Du(x) 1|z| ≤ 1) \,d μ(z). This class of operators coincides with the infinitesimal generators of L\'evy processes in probability theory. In this paper we give a complete characterization of the translation invariant operators of this form that satisfy the Liouville theorem: Bounded solutions u of L[u]=0 in Rd are constant. The Liouville property is obtained as a consequence of a periodicity result that completely characterizes bounded distributional solutions of L[u]=0 in Rd. The proofs combine arguments from PDE and group theories. They are simple and short.