h-Vectors of Gorenstein polytopes

Bruns, Winfried; Römer, Tim

doi:10.1016/j.jcta.2006.03.003

Cited by 86 publications

(88 citation statements)

References 10 publications

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“…Stanley [18] noted that, in the case that an n-dimensional polytope P is r-Gorenstein, one has h * i (P) = h * n+1−r−i (P) for all r. Bruns-Römer [2] showed that if an r-Gorenstein polytope has a regular and unimodular triangulation, then the h * -vector is unimodal. For Lipschitz polytopes, such a triangulation is vouched for by Theorem 3.1 and with Proposition 4.2, we get the following.…”

Section: Ranked Posetsmentioning

confidence: 99%

Lipschitz polytopes of posets and permutation statistics

Sanyal

Stump

2018

Journal of Combinatorial Theory, Series A

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We introduce Lipschitz functions on a finite partially ordered set P and study the associated Lipschitz polytope L (P ). The geometry of L (P ) can be described in terms of descent-compatible permutations and permutation statistics that generalize descents and big ascents. For ranked posets, Lipschitz polytopes are centrally-symmetric and Gorenstein, which implies symmetry and unimodality of the statistics. Finally, we define (P, k)-hypersimplices as generalizations of classical hypersimplices and give combinatorial interpretations of their volumes and h * -vectors.

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Section: Ranked Posetsmentioning

confidence: 99%

Lipschitz polytopes of posets and permutation statistics

Sanyal

Stump

2018

Journal of Combinatorial Theory, Series A

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“…In [3], it is shown that a Gorenstein integer polytope with a regular unimodular triangulation has a unimodal δ -vector. In [2], it is shown that ∆ stab(r) n, k has a regular unimodular triangulation.…”

Section: Gorenstein R-stable Hypersimplicesmentioning

confidence: 99%

Facets of the r-Stable (n, k)-Hypersimplex

Hibi

Solus

2016

Ann. Comb.

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Abstract. Let k, n, and r be positive integers with k < n and r ≤ n k . We determine the facets of the r-stable n, k-hypersimplex. As a result, it turns out that the r-stable n, k-hypersimplex has exactly 2n facets for every r < n k . We then utilize the equations of the facets to study when the r-stable hypersimplex is Gorenstein. For every k > 0 we identify an infinite collection of Gorenstein r-stable hypersimplices, consequently expanding the collection of r-stable hypersimplices known to have unimodal Ehrhart δ -vectors.

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“…The G-property is related to the notion of Gorenstein polytopes [8], Gorenstein simplicial complexes, and Gorenstein rings [7,28] We call a sum w 1 + w 2 of two weight functions of a point configuration A coherent if…”

Section: Remark 22mentioning

confidence: 99%

On the facets of the secondary polytope

Herrmann

2011

Journal of Combinatorial Theory, Series A

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The secondary polytope of a point configuration A is a polytope whose face poset is isomorphic to the poset of all regular subdivisions of A. While the vertices of the secondary polytopecorresponding to the triangulations of A -are very well studied, there is not much known about the facets of the secondary polytope. The splits of a polytope, subdivisions with exactly two maximal faces, are the simplest examples of such facets and the first that were systematically investigated. The present paper can be seen as a continuation of these studies and as a starting point of an examination of the subdivisions corresponding to the facets of the secondary polytope in general. As a special case, the notion of k-split is introduced as a possibility to classify polytopes in accordance to the complexity of the facets of their secondary polytopes. An application to matroid subdivisions of hypersimplices and tropical geometry is given.

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h-Vectors of Gorenstein polytopes

Cited by 86 publications

References 10 publications

Lipschitz polytopes of posets and permutation statistics

Lipschitz polytopes of posets and permutation statistics

Facets of the r-Stable (n, k)-Hypersimplex

On the facets of the secondary polytope

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