Quasi-invariance of completely random measure

Abstract

Let X be a locally compact Polish space. Let K(X) denote the space of discrete Radon measures on X. Let μ be a completely random discrete measure on X, i.e., μ is (the distribution of) a completely random measure on X that is concentrated on K(X). We consider the multiplicative (current) group C0(X R+) consisting of functions on X that take values in R+=(0,∞) and are equal to 1 outside a compact set. Each element θ∈ C0(X R+) maps K(X) onto itself; more precisely, θ sends a discrete Radon measure Σi siδxi to Σi θ(si)siδxi. Thus, elements of C0(X R+) transform the weights of discrete Radon measures. We study conditions under which the measure μ is quasi-invariant under the action of the current group C0(X R+) and consider several classes of examples. We further assume that X= Rd and consider the group of local diffeomorphisms Diff0(X). Elements of this group also map K(X) onto itself. More precisely, a diffeomorphism ∈ Diff0(X) sends a discrete Radon measure Σi siδxi to Σi siδ(xi). Thus, diffeomorphisms from Diff0(X) transform the atoms of discrete Radon measures. We study quasi-invariance of μ under the action of Diff0(X). We finally consider the semidirect product G:=Diff0(X)× C0(X R+) and study conditions of quasi-invariance and partial quasi-invariance of μ under the action of G.