Bivariate Revuz measures and the Feynman-Kac formula on semi-Dirichlet forms

Abstract

In this paper, we shall first establish the theory of bivariate Revuz correspondence of positive additive functionals under a semi-Dirichlet form, which is associated with a right Markov process X satisfying the sector condition but without duality. We extend most of the classical results about the bivariate Revuz measures under the duality assumptions to the case of semi-Dirichlet forms. As the main results of this paper, we prove that for any exact multiplicative functional M of X, the subprocess XM of X killed by M also satisfies the sector condition and we then characterize the semi-Dirichlet form associated with XM by using the bivariate Revuz measure, which extends the classical Feynman-Kac formula.