English

Time inhomogeneous Generalized Mehler Semigroups

Probability 2012-09-12 v3

Abstract

A time inhomogeneous generalized Mehler semigroup on a real separable Hilbert space \mathdsH{\mathds{H}} is defined through ps,tf(x)=\mathdsHf(U(t,s)x+y)μt,s(dy),ts, x\mathdsH p_{s,t}f(x)=\int_{\mathds{H}} f(U(t,s)x+y)\,\mu_{t,s}(dy), \quad t\geq s, \ x\in{\mathds{H}} for every bounded measurable function ff on \mathdsH{\mathds{H}}, where (U(t,s))ts(U(t,s))_{t\geq s} is an evolution family of bounded operators on \mathdsH{\mathds{H}} and (μt,s)ts(\mu_{t,s})_{t\geq s} is a family of probability measures on (\mathdsH,\B(\mathdsH))({\mathds{H}}, \B({\mathds{H}})) satisfying the time inhomogeneous skew convolution equations μt,s=μt,r(μr,sU(t,r)1),trs.\mu_{t,s}=\mu_{t,r}*(\mu_{r,s}\circ U(t,r)^{-1}),\quad t\geq r\geq s. This kind of semigroup is closely related with the transition semigroup" of non-autonomous (possibly non-continuous) Ornstein-Uhlenbeck process driven by some proper additive process. We show the weak continuity, infinite divisibility, associated "additive processes", L\'evy-Khintchine type representation, construction and spectral representation of (μt,s)ts(\mu_{t,s})_{t\geq s}. We study the structure, existence and uniqueness of the corresponding evolution systems of measures (=space-time invariant measures) of (ps,t)ts(p_{s,t})_{t\geq s}. We also establish dimension free Harnack inequalities in the sense of Wang (1997, PTRF) for (ps,t)ts(p_{s,t})_{t\geq s}. As applications of the Harnack inequalities, we investigate the strong Feller property and contractivity etc. for ps,tp_{s,t}. Finally we prove a Harnack inequality and show the strong Feller property for the transition semigroup of a semi-linear non-autonomous Ornstein-Uhlenbeck process driven by a Wiener process.

Keywords

Cite

@article{arxiv.1009.5314,
  title  = {Time inhomogeneous Generalized Mehler Semigroups},
  author = {Shun-Xiang Ouyang and Michael Röckner},
  journal= {arXiv preprint arXiv:1009.5314},
  year   = {2012}
}

Comments

93 pages; corrected and extended

R2 v1 2026-06-21T16:19:40.772Z