The structure of arbitrary Conze-Lesigne systems
Abstract
Let be a countable abelian group. An (abstract) -system X - that is, an (abstract) probability space equipped with an (abstract) probability-preserving action of - is said to be a Conze-Lesigne system if it is equal to its second Host-Kra-Ziegler factor Z2(X). The main result of this paper is a structural description of such Conze-Lesigne systems for arbitrary countable abelian , namely that they are the inverse limit of translational systems Gn/n arising from locally compact nilpotent groups Gn of nilpotency class 2, quotiented by a lattice n. Results of this type were previously known when was finitely generated, or the product of cyclic groups of prime order. In a companion paper, two of us will apply this structure theorem to obtain an inverse theorem for the Gowers U3(G) norm for arbitrary finite abelian groups G.
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