New families of highly neighborly centrally symmetric spheres

Abstract

In 1995, Josckusch constructed an infinite family of centrally symmetric (cs, for short) triangulations of 3-spheres that are cs-2-neighborly. Recently, Novik and Zheng extended Jockusch's construction: for all d and n>d, they constructed a cs triangulation of a d-sphere with 2n vertices, dn, that is cs- d/2-neighborly. Here, several new cs constructions, related to dn, are provided. It is shown that for all k>2 and a sufficiently large n, there is another cs triangulation of a (2k-1)-sphere with 2n vertices that is cs-k-neighborly, while for k=2 there are (2n) such pairwise non-isomorphic triangulations. It is also shown that for all k>2 and a sufficiently large n, there are (2n) pairwise non-isomorphic cs triangulations of a (2k-1)-sphere with 2n vertices that are cs-(k-1)-neighborly. The constructions are based on studying facets of dn, and, in particular, on some necessary and some sufficient conditions similar in spirit to Gale's evenness condition. Along the way, it is proved that Jockusch's spheres 3n are shellable and an affirmative answer to Murai--Nevo's question about 2-stacked shellable balls is given.