Non-singular actions of infinite-dimensional groups and polymorphisms

Abstract

Let Z be a probabilistic measure space with a measure ζ, R× be the multiplicative group of positive reals, let t be the coordinate on R×. A polymorphism of Z is a measure π on Z× Z× R× such that for any measurable A, B⊂ Z we have π(A× Z× R×)=ζ(A) and the integral ∫ t\,dπ(z,u,t) over Z× B× R× is ζ(B). The set of all polymorphisms has a natural semigroup structure, the group of all nonsingular transformations is dense in this semigroup. We discuss a problem of closure in polymorphisms for certain types of infinite dimensional ('large') groups and show that a non-singular action of an infinite-dimensional group generates a representation of its train (category of double cosets) by polymorphisms.