In 1986 Stanley associated to a poset the order polytope. The close interplay between its combinatorial and geometric properties makes the order polytope an object of tremendous interest. Double posets were introduced in 2011 by Malvenuto and Reutenauer as a generalization of Stanleys labelled posets. A double poset is a finite set equipped with two partial orders. To a double poset Chappell, Friedl and Sanyal (2017) associated the double order polytope. They determined the combinatorial structure for the class of compatible double posets. In this paper we generalize their description to all double posets and we classify the 2-level double order polytopes.Comment: 11 pages, 3 figure
AbstractLet P be a poset in which each point is incomparable to at most Δ others. Tanenbaum, Trenk, ...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 2010.Cataloged from PD...
Let P be a finite poset. By definition, the linear extension polytope of P has as vertices the chara...
For a class of posets we establish that the f-vector of the chain polytope dominates the f-vector of...
In 1986, Richard Stanley associated to a finite poset two polytopes, the order and chain polytope, w...
AbstractStanley (1986) showed how a finite partially ordered set gives rise to two polytopes, called...
AbstractTo each finite set with at least two elements, there corresponds a partial order polytope. I...
AbstractLet D be the set of isomorphism types of finite double partially ordered sets, that is sets ...
Stanley (1986) showed how a finite partially ordered set gives rise to two polytopes,\ud called the ...
AbstractGiven two finite posetsPandP′ with the same comparability graph, we show that if |V(P)|⩾4 an...
Pairs of polyhedra connected by a piecewise-linear bijection appear in different fields of mathemati...
For each poset $P$, we construct a polytope $A(P)$ called the $P$-associahedron. Similarly to the ca...
AbstractThe paper is devoted to an algebraic and geometric study of the feasible set of a poset, the...
The Poset Cover Problem is an optimization problem where the goal is to determine a minimum set of p...
Let D be the set of isomorphism types of finite double partially ordered sets, that is sets endowed ...
AbstractLet P be a poset in which each point is incomparable to at most Δ others. Tanenbaum, Trenk, ...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 2010.Cataloged from PD...
Let P be a finite poset. By definition, the linear extension polytope of P has as vertices the chara...
For a class of posets we establish that the f-vector of the chain polytope dominates the f-vector of...
In 1986, Richard Stanley associated to a finite poset two polytopes, the order and chain polytope, w...
AbstractStanley (1986) showed how a finite partially ordered set gives rise to two polytopes, called...
AbstractTo each finite set with at least two elements, there corresponds a partial order polytope. I...
AbstractLet D be the set of isomorphism types of finite double partially ordered sets, that is sets ...
Stanley (1986) showed how a finite partially ordered set gives rise to two polytopes,\ud called the ...
AbstractGiven two finite posetsPandP′ with the same comparability graph, we show that if |V(P)|⩾4 an...
Pairs of polyhedra connected by a piecewise-linear bijection appear in different fields of mathemati...
For each poset $P$, we construct a polytope $A(P)$ called the $P$-associahedron. Similarly to the ca...
AbstractThe paper is devoted to an algebraic and geometric study of the feasible set of a poset, the...
The Poset Cover Problem is an optimization problem where the goal is to determine a minimum set of p...
Let D be the set of isomorphism types of finite double partially ordered sets, that is sets endowed ...
AbstractLet P be a poset in which each point is incomparable to at most Δ others. Tanenbaum, Trenk, ...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 2010.Cataloged from PD...
Let P be a finite poset. By definition, the linear extension polytope of P has as vertices the chara...