A Liouville-type theorem for Schr\"odinger operators

Abstract

In this paper we prove a sufficient condition, in terms of the behavior of a ground state of a symmetric critical operator P1, such that a nonzero subsolution of a symmetric nonnegative operator P0 is a ground state. Particularly, if Pj:=-+Vj, for j=0,1, are two nonnegative Schr\"odinger operators defined on ⊂eq Rd such that P1 is critical in with a ground state φ, the function 0 is a subsolution of the equation P0u=0 in and satisfies ||≤ Cφ in , then P0 is critical in and is its ground state. In particular, is (up to a multiplicative constant) the unique positive supersolution of the equation P0u=0 in . Similar results hold for general symmetric operators, and also on Riemannian manifolds.

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