The homotopy type of the polyhedral product for shifted complexes
Abstract
We prove a conjecture of Bahri, Bendersky, Cohen and Gitler: if K is a shifted simplicial complex on n vertices, X1,..., Xn are spaces and CXi is the cone on Xi, then the polyhedral product determined by K and the pairs (CXi,Xi) is homotopy equivalent to a wedge of suspensions of smashes of the Xi's. This generalises earlier work of the two authors in the special case where each Xi is a loop space. Connections are made to toric topology, combinatorics, and classical homotopy theory.
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