English

Stochastic Calculus for Markov Processes Associated with Semi-Dirichlet Forms

Probability 2014-06-11 v1

Abstract

Let (E,D(E))(\mathcal{E},D(\mathcal{E})) be a quasi-regular semi-Dirichlet form and (Xt)t0(X_t)_{t\geq0} be the associated Markov process. For uD(E)locu\in D(\mathcal{E})_{loc}, denote At[u]:=u~(Xt)u~(X0)A_t^{[u]}:=\tilde{u}(X_{t})-\tilde{u}(X_{0}) and Ft[u]:=0<st(u~(Xs)u~(Xs))1{u~(Xs)u~(Xs)>1}F^{[u]}_t:=\sum_{0<s\leq t}(\tilde u(X_{s})-\tilde u(X_{s-}))1_{\{|\tilde u(X_{s})-\tilde u(X_{s-})|>1\}}, where u~\tilde{u} is a quasi-continuous version of uu. We show that there exist a unique locally square integrable martingale additive functional Y[u]Y^{[u]} and a unique continuous local additive functional Z[u]Z^{[u]} of zero quadratic variation such that At[u]=Yt[u]+Zt[u]+Ft[u].A_t^{[u]}=Y_t^{[u]}+Z_t^{[u]}+F_t^{[u]}. Further, we define the stochastic integral 0tv~(Xs)dAs[u]\int_0^t\tilde v(X_{s-})dA_s^{[u]} for vD(E)locv\in D(\mathcal{E})_{loc} and derive the related It\^{o}'s formula.

Keywords

Cite

@article{arxiv.1406.2351,
  title  = {Stochastic Calculus for Markov Processes Associated with Semi-Dirichlet Forms},
  author = {Chuan-Zhong Chen and Li Ma and Wei Sun},
  journal= {arXiv preprint arXiv:1406.2351},
  year   = {2014}
}
R2 v1 2026-06-22T04:34:30.141Z