Equidecomposition in cardinal algebras

Abstract

Let be a countable group. A classical theorem of Thorisson states that if X is a standard Borel -space and μ and are Borel probability measures on X which agree on every -invariant subset, then μ and are equidecomposable, i.e. there are Borel measures (μγ)γ∈ on X such that μ = Σγ μγ and = Σγ γμγ. We establish a generalization of this result to cardinal algebras.