Functional Inequalities for Weighted Gamma Distribution on the Space of Finite Measures

Abstract

Let be the space of finite measures on a Locally compact Polish space, and let be the Gamma distribution on with intensity measure ∈ . Let ext be the extrinsic derivative with tangent bundle T= η∈ L2(η), and let : T T be measurable such that η is a positive definite linear operator on L2(η) for every η∈ . Moreover, for a measurable function V on , let V= V. We investigate the Poincar\'e, weak Poincar\'e and super Poincar\'e inequalities for the Dirichlet form ,V(F,G):= ∫ \<ηextF(η), extG(η)\>L2(η)\, V(η), which characterize various properties of the associated Markov semigroup. The main results are extended to the space of finite signed measures.