Matthias Beck, Max Hlavacek
Published 2023-11-08Version 1
Stanley introduced in 1986 the order polytope and the chain polytope for a given finite poset. These polytopes contain much information about the poset and have given rise to important examples in polyhedral geometry. In 1993, Reiner introduced signed posets as natural type-B analogues of posets. We define and study signed order and chain polytopes. Our results include convex-hull and halfspace descriptions, unimodular triangulations, Ehrhart $h^*$-polynomials and their relations to signed permutation statistics, and a Gorenstein characterization of signed order and chain polytopes.
Comments: 17 pages, 5 figures
Unimodular equivalence of order and chain polytopes
The numbers of edges of the order polytope and the chain poyltope of a finite partially ordered set
Gorenstein Fano polytopes arising from order polytopes and chain polytopes
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