gamma-vectors of edge subdivisions of the boundary of the cross polytope

Abstract

For any flag simplicial complex obtained by stellar subdividing the boundary of the cross polytope in edges, we define a flag simplicial complex () (dependent on the sequence of subdivisions) whose f-vector is the γ-vector of . This proves that the γ-vector of any such simplicial complex satisfies the Frankl-F\"uredi-Kalai inequalities, partially solving a conjecture by Nevo and Petersen np. We show that when is the dual simplicial complex to a nestohedron, and the sequence of subdivisions corresponds to a flag ordering as defined in ai, that () is equal to the flag simplical complex defined there.