Bounds for entries of γ-vectors of flag homology spheres

Abstract

We present some enumerative and structural results for flag homology spheres. For a flag homology sphere , we show that its γ-vector γ=(1,γ1,γ2,…) satisfies: align* γj=0, for all j>γ1, γ2≤γ12, γγ1∈\0,1\, and γγ1-1∈\0,1,2,γ1\, align* supporting a conjecture of Nevo and Petersen. Further we characterize the possible structures for in extremal cases. As an application, the techniques used produce infinitely many f-vectors of flag balanced simplicial complexes that are not γ-vectors of flag homology spheres (of any dimension); these are the first examples of this kind. In addition, we prove a flag analog of Perles' 1970 theorem on k-skeleta of polytopes with "few" vertices, specifically: the number of combinatorial types of k-skeleta of flag homology spheres with γ1≤ b, of any given dimension, is bounded independently of the dimension.