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For any finite connected poset $P$, Galashin introduced a simple convex $(|P|-2)$-dimensional polytope $\mathscr{A}(P)$ called the poset associahedron. Let $P$ be a poset with a proper autonomous subposet $S$ that is a chain of size $n$.…

Combinatorics · Mathematics 2024-07-08 Son Nguyen

Given any connected poset $P$, we give a simple realization of Galashin's poset associahedron $\mathscr{A}(P)$ as a convex polytope in $\mathbb{R}^P.$ The realization is inspired by the description of $\mathscr{A}(P)$ as a compactification…

Combinatorics · Mathematics 2023-03-17 Andrew Sack

We show that the $f$-vector of Galashin's poset associahedron $\mathscr A(P)$ only depends on the comparability graph of $P$. In particular, this allows us to produce a family of polytopes with the same $f$-vectors as permutohedra, but that…

Combinatorics · Mathematics 2023-10-03 Son Nguyen , Andrew Sack

For each poset $P$, we construct a polytope $A(P)$ called the $P$-associahedron. Similarly to the case of graph associahedra, the faces of $A(P)$ correspond to certain nested collections of subsets of $P$. The Stasheff associahedron is a…

Combinatorics · Mathematics 2023-11-09 Pavel Galashin

Motivated by the graph associahedron KG, a polytope whose face poset is based on connected subgraphs of G, we consider the notion of associativity and tubes on posets. This leads to a new family of simple convex polytopes obtained by…

Combinatorics · Mathematics 2015-06-16 Satyan L. Devadoss , Stefan Forcey , Stephen Reisdorf , Patrick Showers

The associahedron is a convex polytope whose face poset is based on nonintersecting diagonals of a convex polygon. In this paper, given an arbitrary simple polygon P, we construct a polytopal complex analogous to the associahedron based on…

Combinatorics · Mathematics 2015-06-16 Satyan L. Devadoss , Rahul Shah , Xuancheng Shao , Ezra Winston

A classic problem connecting algebraic and geometric combinatorics is the realization problem: given a poset, determine whether there exists a polytope whose face lattice is the poset. In 1990s, Kapranov defined a poset as a hybrid between…

Combinatorics · Mathematics 2023-02-17 Federico Castillo , Fu Liu

An assosiahedron $\mathcal{K}^n$, known also as Stasheff polytope, is a multifaceted combinatorial object, which, in particular, can be realized as a convex hull of certain points in $\mathbf{R}^{n}$, forming $(n-1)$-dimensional polytope. A…

Combinatorics · Mathematics 2011-03-31 Kira Adaricheva

We define a family of convex polytopes called constrainahedra, which index collisions of horizontal and vertical lines. Our construction proceeds by first defining a poset $C(m,n)$ of good rectangular preorders, then proving that $C(m,n)$…

Combinatorics · Mathematics 2022-09-01 Nathaniel Bottman , Daria Poliakova

Given a graph G, we construct a simple, convex polytope whose face poset is based on the connected subgraphs of G. This provides a natural generalization of the Stasheff associahedron and the Bott-Taubes cyclohedron. Moreover, we show that…

Quantum Algebra · Mathematics 2007-05-23 Michael Carr , Satyan L. Devadoss

This paper introduces a new method to solve the problem of the approximation of the diagonal for face-coherent families of polytopes. We recover the classical cases of the simplices and the cubes and we solve it for the associahedra, also…

Algebraic Topology · Mathematics 2019-02-22 Naruki Masuda , Hugh Thomas , Andy Tonks , Bruno Vallette

We define a family of combinatorial objects, which we call Baxter posets. We prove that Baxter posets are counted by the Baxter numbers by showing that they are the adjacency posets of diagonal rectangulations. Given a diagonal…

Combinatorics · Mathematics 2016-10-14 Emily Meehan

Starting from the data of an arbor, which is a rooted tree with vertices decorated by disjoint sets, we introduce a lattice polytope and a partial order on its lattice points. We give recursive algorithms for various classical invariants of…

Combinatorics · Mathematics 2025-08-26 Frédéric Chapoton

We study the equivalence relation on the set of acyclic orientations of an undirected graph G generated by source-to-sink conversions. These conversions arise in the contexts of admissible sequences in Coxeter theory, quiver…

Combinatorics · Mathematics 2011-11-14 Matthew Macauley , Henning S. Mortveit

Stanley has conjectured that the h-vector of a matroid complex is a pure O-sequence. We will prove this for cotransversal matroids by using generalized permutohedra. We construct a bijection between lattice points inside a r-dimensional…

Combinatorics · Mathematics 2012-10-04 SuHo Oh

We study two different objects attached to an arbitrary quadrangulation of a regular polygon. The first one is a poset, closely related to the Stokes polytopes introduced by Baryshnikov. The second one is a set of some paths configurations…

Representation Theory · Mathematics 2015-05-25 Frédéric Chapoton

Motivated by the theory of cluster algebras, F. Chapoton, S. Fomin and A. Zelevinsky associated to each finite type root system a simple convex polytope called \emph{generalized associahedron}. They provided an explicit realization of this…

Combinatorics · Mathematics 2012-10-24 Salvatore Stella

An associahedron is a polytope whose vertices correspond to triangulations of a convex polygon and whose edges correspond to flips between them. Using labeled polygons, C. Hohlweg and C. Lange constructed various realizations of the…

Combinatorics · Mathematics 2023-11-14 Carsten Lange , Vincent Pilaud

We study nested complexes of building sets on the Las Vergnas face lattices of oriented matroids. Such a nested complex is the face lattice of an oriented matroid, obtained by iterated stellar subdivisions of the positive tope. If the…

Combinatorics · Mathematics 2025-09-22 Chiara Mantovani , Arnau Padrol , Vincent Pilaud

This is a chapter in an upcoming Tamari Festscrift. Permutahedra are a class of convex polytopes arising naturally from the study of finite reflection groups, while generalized associahedra are a class of polytopes indexed by finite…

Combinatorics · Mathematics 2011-12-15 Christophe Hohlweg
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