Convex hull realizations of the multiplihedra

Forcey, Stefan

doi:10.1016/j.topol.2008.07.010

Cited by 34 publications

(72 citation statements)

References 25 publications

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“…Figure 1(b) shows the two-dimensional hexagon which is J 3 . Recently, Forcey [8] has provided a realization of the multiplihedron, establishing it as a convex polytope. Moreover, Mau and Woodward [13] have shown J n as the compactification of the moduli space of quilted disks.…”

Section: Introductionmentioning

confidence: 99%

Marked tubes and the graph multiplihedron

Devadoss

Forcey

2008

Algebr. Geom. Topol.

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Given a graph G, we construct a convex polytope whose face poset is based on marked subgraphs of G. Dubbed the graph multiplihedron, we provide a realization using integer coordinates. Not only does this yield a natural generalization of the multiphihedron, but features of this polytope appear in works related to quilted disks, bordered Riemann surfaces, and operadic structures. Certain examples of graph multiplihedra are related to Minkowski sums of simplices and cubes and others to the permutohedron.

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Section: Introductionmentioning

confidence: 99%

Marked tubes and the graph multiplihedron

Devadoss

Forcey

2008

Algebr. Geom. Topol.

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“…The result is a connected "coat of paint" starting at the root of each tree in the forest. Figure 5 shows a painted B-forest for the building set of the graph in Figure 2 This notion is compatible with the notion of painted trees in [9]. When B(P n ) = {[i, j] : 1 ≤ i ≤ j ≤ n} is the nested set of the path graph P n , the painted B(P n )forests are in bijection with the painted trees of [9].…”

Section: The Order ≺ On Equivalence Classes Is As Follows: the Equivamentioning

confidence: 69%

“…In his work on homotopy associativity for A ∞ spaces, Stasheff [24] defined the multiplihedron J n , a cell complex which has since been realized in different geometric contexts by Fukaya, Oh, Ohta, and Ono [10], by Mau and Woodward [13], and others. It was first realized as a polytope by Forcey [9].…”

Section: The Order ≺ On Equivalence Classes Is As Follows: the Equivamentioning

confidence: 99%

Lifted generalized permutahedra and composition polynomials

Ardila

Doker

2013

Advances in Applied Mathematics

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Generalized permutahedra are the polytopes obtained from the permutahedron by changing the edge lengths while preserving the edge directions, possibly identifying vertices along the way. We introduce a lifting construction for these polytopes, which turns an n-dimensional generalized permutahedron into an (n + 1)-dimensional one. We prove that this construction gives rise to Stasheff's multiplihedron from homotopy theory, and to the more general nestomultiplihedra, answering two questions of Devadoss and Forcey.We construct a subdivision of any lifted generalized permutahedron whose pieces are indexed by compositions. The volume of each piece is given by a polynomial whose combinatorial properties we investigate. We show how this composition polynomial arises naturally in the polynomial interpolation of an exponential function. We prove that its coefficients are positive integers, and present evidence suggesting that they may also be unimodal.

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“…The correspondence between the multiplihedra and W (Ass b→w ) is not immediate and involves the so called level trees introduced in [BV73]. A nice description of such relations, can be found in [For08,Tsu12]. The multiplihedra can also be obtained as a compactification of a certain class of configuration spaces, as shown by Merkulov in [Mer11].…”

Section: 12mentioning

confidence: 99%