Lower bounds on the g-numbers of spheres without large missing faces

Abstract

We establish several new lower bounds on the g-numbers of simplicial spheres without large missing faces. For this class of spheres, we derive bounds on the g-numbers in terms of the independence numbers of their graphs, extending a result of Chudnovsky and Nevo. As a consequence, we show that flag (d-1)-spheres -- and more generally, flag normal (d-1)-pseudomanifolds -- satisfy g2≥ (1/2-δ(d))f0, where δ(d) is a function of d with δ(d) 0 as d ∞. We further prove that, for simplicial (d-1)-spheres without large missing faces, an initial segment of the g-vector forms a level sequence, yielding additional inequalities among the g-numbers. Finally, we show that simplicial 4-spheres without missing faces of dimension greater than two satisfy g2≥ 25f0 - 65.