Models for the Cohomology of Certain Polyhedral Products

Abstract

For a commutative ring k with unit, we describe and study various differential graded k-modules and k-algebras which are models for the cohomology of polyhedral products (CX, X)K. Along the way, we prove that the integral cohomology H*((D1, S0)K; Z) of the real moment-angle complex is a Tor module, the one that does not come from a geometric setting. We also reveal that the apriori different cup product structures in H*((D1, S0)K; Z) and in H*((Dn, Sn-1)K; Z) for n≥ 2 have the same origin. As an application, this work sets the stage for studying the based loop space of (CX, X)K in terms of the bar construction applied to the differential graded Z-algebras B( C*( X; Z), K) quasi-isomorphic to the singular cochain algebra C*((CX, X)K; Z).