Lower Bounds on Face Numbers of Polytopes with m Facets

Abstract

Let P be a convex d-polytope and 0 ≤ k ≤ d-1. In 2023, this author proved the following inequalities, resolving a question of B\'ar\'any: \[ fk(P)f0(P) ≥ 12[ d2 k + d2 k], fk(P)fd-1(P) ≥ 12[ d2 d-k-1 + d2 d-k-1]. \] We show that for any fixed d and k, these are the tightest possible linear bounds on fk(P) in terms of f0(P) or fd-1(P). We then give a stronger bound on fk(P) in terms of the Grassmann angle sum γk2(P). Finally, we prove an identity relating the face numbers of a polytope with the behavior of its facets under a fixed orthogonal projection of codimension two.