The structure of totally disconnected Host--Kra--Ziegler factors, and the inverse theorem for the Uk Gowers uniformity norms on finite abelian groups of bounded torsion

Abstract

Let be a countable abelian group, let k≥ 1, and let X=(X,X,μ,T) be an ergodic -system of order k in the sense of Host--Kra--Ziegler. The -system X is said to be totally disconnected if all its structure groups are totally disconnected. We show that any totally disconnected -system of order k is a generalized factor of a Zω-system with the structure of a Weyl system. As a consequence of this structure theorem, we show that totally disconnected -systems of order k are represented by translations on double cosets of nilpotent Polish groups. By a correspondence principle of two of us, we can use this representation to establish a (weak) inverse theorem for the Uk Gowers uniformity norms on finite abelian groups of bounded torsion.