The Homotopy Type of a Poincar\'e Duality Complex after Looping
Abstract
We answer a weaker version of the classification problem for the homotopy types of (n-2)-connected closed orientable (2n-1)-manifolds. Let n≥ 6 be an even integer, and X be a (n-2)-connected finite orientable Poincar\'e (2n-1)-complex such that Hn-1(X;Q)=0 and Hn-1(X;Z2)=0. Then its loop space homotopy type is uniquely determined by the action of higher Bockstein operations on Hn-1(X;Zp) for each odd prime p. A stronger result is obtained when localized at odd primes.
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