Harmonic functions for recurrent symmetric α-stable processeses with non-local perturbations
Abstract
Let M be the recurrent symmetric (relativistic) α-stable process on Rd. Let Hμ + F (:= H + μ + F) be a Schr\"odinger type operator with local and non-local perturbations μ and F. If μ and F satisfy suitable conditions associated with Kato class, we prove the existence of ground state for a Schr\"odinger type operator relating to Hμ + F. Furthermore, we prove the ground state becomes a probabilistically harmonic function of the Schr\"odinger operator generated by Hμ + F.
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