Explosion by Killing and Maximum Principle in Symmetric Markov Processes

Abstract

Keller and Lenz KL define a concept of stochastic completeness at infinity (SCI) for a regular symmetric Dirichlet form (,). We show that (SCI) can be characterized probabilistically by using the predictable part ζp of the life time ζ of the symmetric Markov process X=( Px,Xt) generated by (,), that is, (SCI) is equivalent to x(ζ=ζp<∞)=0. We define a concept, explosion by killing (EK), by x(ζ=ζi<∞)=1. Here ζi is the totally inaccessible part of ζ. We see that (EK) is equivalent to (SCI) and x(ζ=∞)=1. Let X res be the resurrected process generated by the resurrected form, a regular Dirichlet form constructed by removing the killing part from (, ). Extending work of Masamune and Schmidt (MS), we show that (EK) is also equivalent to the ordinary conservation property of time changed process of X res by Akt, where the Akt is the positive continuous additive functional in the Revuz correspondence to the killing measure k in the Beurling-Deny formula (Theorem ma-sh). We consider the maximum principle for Schr\"odinger-type operator μ=-μ. Here is the self-adjoint operator associated with (,) %with non-local part and μ is a Green-tight Kato measure. Let λ(μ) be the principal eigenvalue of the trace of (,) relative to μ. We prove that if (EK) holds, then λ(μ)>1 implies a Liouville property that every bounded solution to μ u=0 is zero quasi-everywhere and that the refined maximum principle in the sense of Berestycki-Nirenberg-Varadhan BNV holds for μ if and only if λ(μ)>1 (Theorem RMP).