Measurable equidecompositions for group actions with an expansion property

Abstract

Given an action of a group on a measure space , we provide a sufficient criterion under which two sets A, B⊂eq are measurably equidecomposable, i.e., A can be partitioned into finitely many measurable pieces which can be rearranged using the elements of to form a partition of B. In particular, we prove that every bounded measurable subset of Rn, n 3, with non-empty interior is measurably equidecomposable to a ball via isometries. The analogous result also holds for some other spaces, such as the sphere or the hyperbolic space of dimension n 2.