Triangulations of simplicial complexes and theta polynomials

Abstract

An enumerative theory of triangulations of simplicial complexes has been developed by Stanley. A key role in his theory is played by the local h-polynomial of a triangulation of a simplex. This paper develops a parallel theory, in which the role of the local h-polynomial is played by a simpler invariant, namely the theta polynomial. This allows one to deduce unimodality and gamma-positivity properties of h-polynomials of triangulations of simplicial complexes from corresponding properties of theta polynomials, which are studied here in some detail. To mention one concrete application, the h-polynomial of the antiprism triangulation of any simplicial homology sphere is shown to be gamma-positive, thus confirming Gal's conjecture in a new special case.