Rudolph's Two-Step Coding Theorem and Alpern's Lemma for Rd Actions

Abstract

Rudolph showed that the orbits of any measurable, measure preserving Rd action can be measurably tiled by 2d rectangles and asked if this number of tiles is optimal for d>1. In this paper, using a tiling of Rd by notched cubes, we show that d+1 tiles suffice. Furthermore, using a detailed analysis of the set of invariant measures on tilings of R2 by two rectangles, we show that while for R2 actions with completely positive entropy this bound is optimal there exist mixing R2 actions whose orbits can be tiled by 2 tiles.