The homotopy theory of polyhedral products associated with flag complexes

Abstract

If K is a simplicial complex on m vertices the flagification of K is the minimal flag complex Kf on the same vertex set that contains K. Letting L be the set of vertices, there is a sequence of simplicial inclusions L K Kf. This induces a sequence of maps of polyhedral products ( X, A)L g( X, A)K f ( X, A)Kf. We show that f and f g have right homotopy inverses and draw consequences. For a flag complex K the polyhedral product of the form (CY, Y)K is a co-H-space if and only if the 1-skeleton of K is a chordal graph, and we deduce that the maps f and f g have right homotopy inverses in this case.