Stochastic completeness and L1-Liouville property for second-order elliptic operators

Abstract

Let P be a linear, second-order, elliptic operator with real coefficients defined on a noncompact Riemannian manifold M and satisfies P1=0 in M. Assume further that P admits a minimal positive Green function in M. We prove that there exists a smooth positive function defined on M such that M is stochastically incomplete with respect to the operator P := \, P , that is, \[ ∫M kPM(x, y, t) \ dy < 1 ∀ (x, t) ∈ M × (0, ∞), \] where kPM denotes the minimal positive heat kernel associated with P. Moreover, M is L1-Liouville with respect to P if and only if M is L1-Liouville with respect to P. In addition, we study the interplay between stochastic completeness and the L1-Liouville property of the skew product of two second-order elliptic operators.