Loop spaces of n-dimensional Poincar\'e duality complexes whose (n-1)-skeleton is a co-H-space
Abstract
Under certain hypotheses, we prove a loop space decomposition for simply-connected Poincar\'e Duality complexes of dimension n whose (n-1)-skeleton is a co-H-space. This unifies many known decompositions obtained in different contexts and establishes many new families of examples. As consequences, we show that such a looped Poincar\'e Duality complex retracts off the loops of its (n-1)-skeleton and describe its homology as a one-relator algebra.
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