English

A Liouville-type theorem for Schr\"odinger operators

Analysis of PDEs 2007-05-23 v2 Spectral Theory

Abstract

In this paper we prove a sufficient condition, in terms of the behavior of a ground state of a symmetric critical operator P1P_1, such that a nonzero subsolution of a symmetric nonnegative operator P0P_0 is a ground state. Particularly, if Pj:=Δ+VjP_j:=-\Delta+V_j, for j=0,1j=0,1, are two nonnegative Schr\"odinger operators defined on ΩRd\Omega\subseteq \mathbb{R}^d such that P1P_1 is critical in Ω\Omega with a ground state ϕ\phi, the function ψ0\psi\nleq 0 is a subsolution of the equation P0u=0P_0u=0 in Ω\Omega and satisfies ψCϕ|\psi|\leq C\phi in Ω\Omega, then P0P_0 is critical in Ω\Omega and ψ\psi is its ground state. In particular, ψ\psi is (up to a multiplicative constant) the unique positive supersolution of the equation P0u=0P_0u=0 in Ω\Omega. Similar results hold for general symmetric operators, and also on Riemannian manifolds.

Keywords

Cite

@article{arxiv.math/0512431,
  title  = {A Liouville-type theorem for Schr\"odinger operators},
  author = {Yehuda Pinchover},
  journal= {arXiv preprint arXiv:math/0512431},
  year   = {2007}
}

Comments

14 pages, the main result was improved, and a few more applications were added