On the generalized Feynman-Kac transformation for nearly symmetric Markov processes

Abstract

Suppose X is a right process which is associated with a non-symmetric Dirichlet form (E,D(E)) on L2(E;m). For u∈ D(E), we have Fukushima's decomposition: u(Xt)-u(X0)=Mut+Nut. In this paper, we investigate the strong continuity of the generalized Feynman-Kac semigroup defined by Putf(x)=Ex[eNutf(Xt)]. Let Qu(f,g)=E(f,g)+E(u,fg) for f,g∈ D(E)b. Denote by J1 the dissymmetric part of the jumping measure J of (E,D(E)). Under the assumption that J1 is finite, we show that (Qu,D(E)b) is lower semi-bounded if and only if there exists a constant α0 0 such that \|Put\|2≤ eα0 t for every t>0. If one of these conditions holds, then (Put)t≥0 is strongly continuous on L2(E;m). If X is equipped with a differential structure, then this result also holds without assuming that J1 is finite.