AbstractWe introduce an excedance statistic for the group of affine permutations S˜n and determine the generating function of its distribution. The proof involves working with enumerating lattice points in a skew version of the root polytope of type A. We also show that the left coset representatives of the quotient S˜n/Sn correspond to increasing juggling sequences and determine their Poincaré series
AbstractLet An⊆Sn denote the alternating and the symmetric groups on 1,…,n. MacMahon's theorem [P.A....
Abstract. In 2003, Haglund’s bounce statistic gave the first combinatorial interpretation of the q, ...
The definitions of descent, excedance, major index, inversion index and Denert's statistic for ...
AbstractWe introduce an excedance statistic for the group of affine permutations S˜n and determine t...
In this dissertation we study the excedance permutation statistic. We start by extend-ing the classi...
International audienceBased on the notion of colored and absolute excedances introduced by Bagno and...
International audienceBased on the notion of colored and absolute excedances introduced by Bagno and...
International audienceBased on the notion of colored and absolute excedances introduced by Bagno and...
Based on the notion of colored and absolute excedances introduced by Bagno and Garber we give an ana...
In this dissertation we study the excedance permutation statistic. We start by extending the classic...
AbstractThe definitions of descent, excedance, major index, inversion index and Denert's statistics ...
AbstractThe excedance set of a permutation π=π1π2···πn is the set of indices i for which πi>i. We gi...
AbstractWe extend Stanley's work on alternating permutations with extremal number of fixed points in...
AbstractThis paper studies the excedance distribution on derangements and gives its generating funct...
AbstractIt was conjectured that if n is even, then every permutation of F2n is affine on some 2-dime...
AbstractLet An⊆Sn denote the alternating and the symmetric groups on 1,…,n. MacMahon's theorem [P.A....
Abstract. In 2003, Haglund’s bounce statistic gave the first combinatorial interpretation of the q, ...
The definitions of descent, excedance, major index, inversion index and Denert's statistic for ...
AbstractWe introduce an excedance statistic for the group of affine permutations S˜n and determine t...
In this dissertation we study the excedance permutation statistic. We start by extend-ing the classi...
International audienceBased on the notion of colored and absolute excedances introduced by Bagno and...
International audienceBased on the notion of colored and absolute excedances introduced by Bagno and...
International audienceBased on the notion of colored and absolute excedances introduced by Bagno and...
Based on the notion of colored and absolute excedances introduced by Bagno and Garber we give an ana...
In this dissertation we study the excedance permutation statistic. We start by extending the classic...
AbstractThe definitions of descent, excedance, major index, inversion index and Denert's statistics ...
AbstractThe excedance set of a permutation π=π1π2···πn is the set of indices i for which πi>i. We gi...
AbstractWe extend Stanley's work on alternating permutations with extremal number of fixed points in...
AbstractThis paper studies the excedance distribution on derangements and gives its generating funct...
AbstractIt was conjectured that if n is even, then every permutation of F2n is affine on some 2-dime...
AbstractLet An⊆Sn denote the alternating and the symmetric groups on 1,…,n. MacMahon's theorem [P.A....
Abstract. In 2003, Haglund’s bounce statistic gave the first combinatorial interpretation of the q, ...
The definitions of descent, excedance, major index, inversion index and Denert's statistic for ...
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