A lower bound theorem for d-polytopes with 2d+2 vertices

Abstract

We establish a lower bound theorem for the number of k-faces (1 k d-2) in a d-dimensional polytope P (abbreviated as a d-polytope) with 2d+2 vertices, extending the previously known case for k=1. We identify all minimisers for d 5. Two distinct lower bounds emerge, depending on the number of facets of P. When P has precisely d+2 facets, the lower bound is tight when d is odd. If P has at least d+3 facets, the lower bound is always tight, and equality holds for some 1 k d-2 only when P has precisely d+3 facets. Moreover, for 1 k d/3-2, the minimisers among d-polytopes with 2d+2 vertices have precisely d+3 facets, while for 0.4d k d-1, the lower bound arises from d-polytopes with d+2 facets.