On polytopal upper bound spheres

Abstract

Generalizing a result (the case k = 1) due to M. A. Perles, we show that any polytopal upper bound sphere of odd dimension 2k + 1 belongs to the generalized Walkup class Kk(2k + 1), i.e., all its vertex links are k-stacked spheres. This is surprising since the k-stacked spheres minimize the face-vector (among all polytopal spheres with given f0,..., fk - 1) while the upper bound spheres maximize the face vector (among spheres with a given f0). It has been conjectured that for d≠ 2k + 1, all (k + 1)-neighborly members of the class Kk(d) are tight. The result of this paper shows that, for every k, the case d = 2k +1 is a true exception to this conjecture.