On the Estimates of the Density of Feynman-Kac Semigroups of α-Stable-like Processes

Abstract

Suppose that α ∈ (0,2) and that X is an α-stable-like process on d. Let F be a function on d belonging to the class Jd,α (see Introduction) and AtF be Σs tF(Xs-,Xs), t> 0, a discontinuous additive functional of X. With neither F nor X being symmetric, under certain conditions, we show that the Feynman-Kac semigroup \StF:t 0\ defined by StFf(x)=Ex(e-AtFf(Xt)) has a density q and that there exist positive constants C1,C2,C3 and C4 such that C1e-C2tt-dα(1 t1α|x-y|)d+α ≤ q(t,x,y) ≤ C3eC4tt-dα(1 t1α|x-y|)d+α for all (t,x,y)∈ (0,∞) × d × d.

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