Explicit constructions of centrally symmetric k-neighborly polytopes and large strictly antipodal sets

Abstract

We present explicit constructions of centrally symmetric 2-neighborly d-dimensional polytopes with about 3d/2 = (1.73)d vertices and of centrally symmetric k-neighborly d-polytopes with about 2ck d vertices where ck=3/20 k2 2k. Using this result, we construct for a fixed k > 1 and arbitrarily large d and N, a centrally symmetric d-polytope with N vertices that has at least (1-k2 (gammak)d) binom(N, k) faces of dimension k-1, where gamma2=1/3 = 0.58 and gammak = 2-3/20k2 2k for k > 2. Another application is a construction of a set of 3d/2 -1-1 points in Rd every two of which are strictly antipodal as well as a construction of an n-point set (for an arbitrarily large n) in Rd with many pairs of strictly antipodal points. The two latter results significantly improve the previous bounds by Talata, and Makai and Martini, respectively.