Add to ORKGIt is well known that the number of non-isomorphic unit interval orders on $[n]$ equals the $n$-th Catalan number. Using work of Skandera and Reed and work of Postnikov, we show that each unit interval order on $[n]$ naturally induces a rank $n$ positroid on $[2n]$. We call the positroids produced in this fashion \emph{unit interval positroids}. We characterize the unit interval positroids by describing their associated decorated permutations, showing that each one must be a $2n$-cycle encoding a Dyck path of length $2n$. We also give a combinatorial description of the $f$-vectors of unit interval orders. This is joint work with Felix Gotti.Non UBCUnreviewedAuthor affiliation: University of California - BerkeleyGraduat
International audienceRecently, Kenyon and Wilson introduced Dyck tilings, which are certain tilings...
Abstract We define a bijection between permutations and valued Dyck paths, namely, Dyck paths whos...
International audienceWe investigate new equivalence relations on the set $\mathcal{D}_n$ of Dyck pa...
It is well known that the number of non-isomorphic unit interval orders on $[n]$ equals the $n$-th C...
This dissertation explores questions about posets and polytopes through the lenses of positroids and...
This thesis is a compendium of three studies on which matroids and convex geometry play a central ro...
Using the notion of series parallel interval order, we propose a unified setting to describe Dyck la...
ABSTRACT: In the present paper we consider the statistic \number of udu's " in Dyck paths....
In a recent preprint, Matherne, Morales and Selover conjectured that two different representations o...
In this paper we consider the class of interval orders, recently considered by several authors from ...
In this paper we consider the class of interval orders, recently considered by several authors from ...
International audienceDefine the interval rank $r_[i,j] : Gr_k(\mathbb C^n) →\mathbb{N}$ of a k-plan...
AbstractWe show how the set of Dyck paths of length 2n naturally gives rise to a matroid, which we c...
The Stanley lattice, Tamari lattice and Kreweras lattice are three remarkable orders defined on the ...
Abstract. A short proof is given that the graphs with proper interval representations are the same a...
International audienceRecently, Kenyon and Wilson introduced Dyck tilings, which are certain tilings...
Abstract We define a bijection between permutations and valued Dyck paths, namely, Dyck paths whos...
International audienceWe investigate new equivalence relations on the set $\mathcal{D}_n$ of Dyck pa...
It is well known that the number of non-isomorphic unit interval orders on $[n]$ equals the $n$-th C...
This dissertation explores questions about posets and polytopes through the lenses of positroids and...
This thesis is a compendium of three studies on which matroids and convex geometry play a central ro...
Using the notion of series parallel interval order, we propose a unified setting to describe Dyck la...
ABSTRACT: In the present paper we consider the statistic \number of udu's " in Dyck paths....
In a recent preprint, Matherne, Morales and Selover conjectured that two different representations o...
In this paper we consider the class of interval orders, recently considered by several authors from ...
In this paper we consider the class of interval orders, recently considered by several authors from ...
International audienceDefine the interval rank $r_[i,j] : Gr_k(\mathbb C^n) →\mathbb{N}$ of a k-plan...
AbstractWe show how the set of Dyck paths of length 2n naturally gives rise to a matroid, which we c...
The Stanley lattice, Tamari lattice and Kreweras lattice are three remarkable orders defined on the ...
Abstract. A short proof is given that the graphs with proper interval representations are the same a...
International audienceRecently, Kenyon and Wilson introduced Dyck tilings, which are certain tilings...
Abstract We define a bijection between permutations and valued Dyck paths, namely, Dyck paths whos...
International audienceWe investigate new equivalence relations on the set $\mathcal{D}_n$ of Dyck pa...