Inequalities for Submarkovian Operators and Submarkovian Semigroups

## Abstract In this paper we generalize the notion of hypercyclic and chaotic semigroups to families of unbounded operators. We study this concept within the frameworks of __C__‐regularized semigroups and of regular distribution semigroups. We then apply our results to unbounded semigroups generate

In recent years certain arithmetic geometric mean and related inequalities for operators and unitarily invariant norms have been obtained by many authors based on majorization technique and so on. We first point out that they are direct consequences of integral expressions of relevant operators. Fur

## Abstract For 1 < __p__ < ∞, the almost surely finiteness of $ E \left(v ^{- {p^{\prime} \over p}} \vert {\cal F}\_{1} \right) $ is a necessary and sufficient condition in order to have almost surely convergence of the sequences {__E__(__f__|ℱ~__n__~)} with __f__ ∈ __L__^__p__^(__v dP__). This co