Higher Whitehead products in moment-angle complexes and substitution of simplicial complexes

Abstract

We study the question of realisability of iterated higher Whitehead products with a given form of nested brackets by simplicial complexes, using the notion of the moment-angle complex ZK. Namely, we say that a simplicial complex K realises an iterated higher Whitehead product w if w is a nontrivial element of π*(ZK). The combinatorial approach to the question of realisability uses the operation of substitution of simplicial complexes: for any iterated higher Whitehead product w we describe a simplicial complex ∂w that realises w. Furthermore, for a particular form of brackets inside w, we prove that ∂w is the smallest complex that realises w. We also give a combinatorial criterion for the nontriviality of the product w. In the proof of nontriviality we use the Hurewicz image of w in the cellular chains of ZK and the description of the cohomology product of ZK. The second approach is algebraic: we use the coalgebraic versions of the Koszul and Taylor complex for the face coalgebra of K to describe the canonical cycles corresponding to iterated higher Whitehead products w. This gives another criterion for realisability of w.