Almost simplicial polytopes: the lower and upper bound theorems
1 : Einstein Institute of Mathematics
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The Hebrew University of Jerusalem Jerusalem, 91904, Israel -
Israël
2 : Centre for Informatics and Applied Optimisation, Federation University
This is an extended abstract of the full version. We study n-vertex d-dimensional polytopes with at most one nonsimplex facet with, say, d + s vertices, called almost simplicial polytopes. We provide tight lower and upper bounds for the face numbers of these polytopes as functions of d, n and s, thus generalizing the classical Lower Bound Theorem by Barnette and Upper Bound Theorem by McMullen, which treat the case s = 0. We characterize the minimizers and provide examples of maximizers, for any d.
| Subject : | : | Poster |
| Topics | : | Combinatorics |
| PDF version | : |  PDF version |
- Poster
