Logarithmic Harnack inequalities for transition semigroups in Hilbert spaces

Abstract

We consider the stochastic differential equation \ arraylc dX(t)=[AX(t)+F(X(t))]dt+C1/2dW(t), & t>0;\\ X(0)=x ∈ X; array. where X is a Hilbert space, \W(t)\t≥ 0 is a X-valued cylindrical Wiener process, A, C are suitable operators on X and F: Dom\,(F)⊂eq X X is a smooth enough function. We establish a logarithmic Harnack inequality for the transition semigroup \P(t)\t≥ 0 associated with the stochastic problem above, under less restrictive conditions than those considered in the literature. Some applications to these inequalities are also shown.