Neighborly cubical polytopes
Abstract
Neighborly cubical polytopes exist: for any , there is a cubical convex d-polytope whose -skeleton is combinatorially equivalent to that of the -dimensional cube. This solves a problem of Babson, Billera & Chan. Kalai conjectured that the boundary of a neighborly cubical polytope maximizes the -vector among all cubical -spheres with vertices. While we show that this is true for polytopal spheres for , we also give a counter-example for and . Further, the existence of neighborly cubical polytopes shows that the graph of the -dimensional cube, where , is ``dimensionally ambiguous'' in the sense of Gr\"unbaum. We also show that the graph of the 5-cube is ``strongly 4-ambiguous''. In the special case , neighborly cubical polytopes have vertices, so the facet-vertex ratio is not bounded; this solves a problem of Kalai, Perles and Stanley studied by Jockusch.
Cite
@article{arxiv.math/9812033,
title = {Neighborly cubical polytopes},
author = {Michael Joswig and G"unter M. Ziegler},
journal= {arXiv preprint arXiv:math/9812033},
year = {2007}
}
Comments
20 pages, 3 figures, Latex2e (Revised version, with a new result and a major correction)