Intrinsic Contractivity of Feynman-Kac Semigroups for Symmetric Jump Processes with Infinite Range Jumps

Abstract

Let (Xt)t 0 be a symmetric strong Markov process generated by non-local regular Dirichlet form (D,(D)) as follows equation* split & D(f,g)=∫d∫d(f(x)-f(y))(g(x)-g(y)) J(x,y)\,dx\,dy, f,g∈ (D) split equation* where J(x,y) is a strictly positive and symmetric measurable function on d× d. We study the intrinsic hypercontractivity, intrinsic supercontractivity and intrinsic ultracontractivity for the Feynman-Kac semigroup TVt(f)(x)=x((-∫0tV(Xs)\,ds)f(Xt)),\,\, x∈d, f∈ L2(d;dx). In particular, we prove that for J(x,y)|x-y|-d-α\|x-y| 1\+e-|x-y|\|x-y|> 1\ with α ∈ (0,2) and V(x)=|x|λ with λ>0, (TtV)t 0 is intrinsically ultracontractive if and only if λ>1; and that for symmetric α-stable process (Xt)t0 with α ∈ (0,2) and V(x)=λ(1+|x|) with some λ>0, (TtV)t 0 is intrinsically ultracontractive (or intrinsically supercontractive) if and only if λ>1, and (TtV)t 0 is intrinsically hypercontractive if and only if λ1. Besides, we also investigate intrinsic contractivity properties of (TtV)t 0 for the case that |x| ∞V(x)<∞.