Levy-Khintchine type representation of Dirichlet generators and Semi-Dirichlet forms

Abstract

Let U be an open set of Rn, m a positive Radon measure on U such that supp[m]=U, and (Pt)t>0 a strongly continuous contraction sub-Markovian semigroup on L2(U;m). We investigate the structure of (Pt)t>0. (i) Denote respectively by (A,D(A)) and ( A,D( A)) the generator and the co-generator of (Pt)t>0. Under the assumption that C∞0(U)⊂ D(A) D( A), we give an explicit L\'evy-Khintchine type representation of A on C∞0(U). (ii) If (Pt)t>0 is an analytic semigroup and hence is associated with a semi-Dirichlet form ( E, D( E)), we give an explicit characterization of E on C∞0(U) under the assumption that C∞0(U)⊂ D( E). We also present a LeJan type transformation rule for the diffusion part of regular semi-Dirichlet forms on general state spaces.