Massey products, toric topology and combinatorics of polytopes

Abstract

In this paper we introduce a direct family of simple polytopes P0⊂ P1⊂… such that for any k, 2≤ k≤ n there are non-trivial strictly defined Massey products of order k in the cohomology rings of their moment-angle manifolds ZPn. We prove that the direct sequence of manifolds ⊂ S3… ZPn ZPn+1… has the following properties: every manifold ZPn is a retract of ZPn+1, and one has inverse sequences in cohomology (over n and k, where k∞ as n∞) of the Massey products constructed. As an application we get that there are non-trivial differentials dk, for arbitrarily large k as n∞ in the Eilenberg--Moore spectral sequence connecting the rings H*( X) and H*(X) with coefficients in a field, where X= ZPn.