Characterization of nonlocal diffusion operators satisfying the Liouville theorem. Irrational numbers and subgroups of Rd

Abstract

We investigate the characterization of generators L of L\'evy processes satisfying the Liouville theorem: Bounded functions u solving L[u]=0 are constant. These operators are degenerate elliptic of the form L=Lσ,b+Lμ for some local part Lσ,b[u]=tr(σ σT D2u)+b · Du and nonlocal part Lμ[u](x)=∫ (u(x+z)-u(x)-z · Du(x) 1|z| ≤ 1) \, d μ(z), where μ ≥ 0 is a so-called L\'evy measure possibly unbounded for small z. In this paper, we focus on the pure nonlocal case σ=0 and b=0, where we assume in addition that μ is symmetric which corresponds to self-adjoint pure jump L\'evy operators L=Lμ. The case of general L\'evy operators L=Lσ,b+Lμ will be considered in the forthcoming paper AlDTEnJa18. In our setting, we show that Lμ[u]=0 if and only if u is periodic wrt the subgroup generated by the support of μ. Therefore, the Liouville property holds if and only if this subgroup is dense, and in space dimension d=1 there is an equivalent condition in terms of irrational numbers. In dimension d ≥ 1, we have a clearer view of the operators not satisfying the Liouville theorem whose general form is precisely identified. The proofs are based on arguments of propagation of maximum.