We investigate the combinatorics and geometry of permutation polytopes associated to cyclic permutation groups, i.e., the convex hulls of cyclic groups of permutation matrices. In the situation that the generator of the group consists of at most two orbits, we can give a complete combinatorial description of the associated permutation polytope. In the case of three orbits the facet structure is already quite complex. For a large class of examples we show that there exist exponentially many facets.Nous ètudions les propriètès combinatoires et gèomètriques des polytopes de permutations pour des groupes cycliques. C'est à dire, donnè un groupe cyclique de matrices de permutations, nous considèrons son enveloppe convexe. Si le gènèrateur du gro...
Abstract. An orbit polytope is the convex hull of an orbit under a finite group G 6 GL(d,R). We deve...
AbstractWe consider the convex hull of the even permutations on a set of n elements. We define a cla...
AbstractOut of the classical theory of Riemann surfaces, we extract the following combinatorial theo...
International audienceWe investigate the combinatorics and geometry of permutation polytopes associa...
AbstractIn this paper we lay the foundations for the study of permutation polytopes: the convex hull...
AbstractIn this paper we lay the foundations for the study of permutation polytopes: the convex hull...
AbstractEach group G of permutation matrices gives rise to a permutation polytope P(G) = conv(G) ⊂ R...
This paper focuses on determining the volumes of permutation polytopes associated to cyclic groups,d...
This paper focuses on determining the volumes of permutation polytopes associated to cyclic groups,d...
This paper focuses on determining the volumes of permutation polytopes associated to cyclic...
This paper focuses on determining the volumes of permutation polytopes associated to cyclic groups, ...
This paper focuses on determining the volumes of permutation polytopes associated to cyclic...
AbstractEach group G of permutation matrices gives rise to a permutation polytope P(G) = conv(G) ⊂ R...
AbstractWe describe a class of facets of the polytope of convex combinations of the collection of ev...
Motivated by the study of chained permutations and alternating sign matrices, we investigate partial...
Abstract. An orbit polytope is the convex hull of an orbit under a finite group G 6 GL(d,R). We deve...
AbstractWe consider the convex hull of the even permutations on a set of n elements. We define a cla...
AbstractOut of the classical theory of Riemann surfaces, we extract the following combinatorial theo...
International audienceWe investigate the combinatorics and geometry of permutation polytopes associa...
AbstractIn this paper we lay the foundations for the study of permutation polytopes: the convex hull...
AbstractIn this paper we lay the foundations for the study of permutation polytopes: the convex hull...
AbstractEach group G of permutation matrices gives rise to a permutation polytope P(G) = conv(G) ⊂ R...
This paper focuses on determining the volumes of permutation polytopes associated to cyclic groups,d...
This paper focuses on determining the volumes of permutation polytopes associated to cyclic groups,d...
This paper focuses on determining the volumes of permutation polytopes associated to cyclic...
This paper focuses on determining the volumes of permutation polytopes associated to cyclic groups, ...
This paper focuses on determining the volumes of permutation polytopes associated to cyclic...
AbstractEach group G of permutation matrices gives rise to a permutation polytope P(G) = conv(G) ⊂ R...
AbstractWe describe a class of facets of the polytope of convex combinations of the collection of ev...
Motivated by the study of chained permutations and alternating sign matrices, we investigate partial...
Abstract. An orbit polytope is the convex hull of an orbit under a finite group G 6 GL(d,R). We deve...
AbstractWe consider the convex hull of the even permutations on a set of n elements. We define a cla...
AbstractOut of the classical theory of Riemann surfaces, we extract the following combinatorial theo...