Topology of polyhedral products over simplicial multiwedges

Abstract

We prove that certain conditions on multigraded Betti numbers of a simplicial complex K imply existence of a higher Massey product in cohomology of a moment-angle-complex ZK, which contains a unique element (a strictly defined product). Using the simplicial multiwedge construction, we find a family F of polyhedral products being smooth closed manifolds such that for any l,r≥ 2 there exists an l-connected manifold M∈ F with a nontrivial strictly defined r-fold Massey product in H*(M). As an application to homological algebra, we determine a wide class of triangulated spheres K such that a nontrivial higher Massey product of any order may exist in Koszul homology of their Stanley--Reisner rings. As an application to rational homotopy theory, we establish a combinatorial criterion for a simple graph to provide a (rationally) formal generalized moment-angle manifold ZPJ=(D2ji,S2ji-1)∂ P*, J=(j1,…,jm) over a graph-associahedron P=P and compute all the diffeomorphism types of formal moment-angle manifolds over graph-associahedra.