We introduce and study three new statistics on the even-signed permutation group D_n. We show that two of these are Mahonian, i.e., are equidistributed with length, and that a pair of them gives a generalization of Carlitz’s identity on the Euler-Mahonian distribution of the descent number and major index over S_n
Dans la théorie de Morse, quand on veut étudier un espace, on introduit une fonction numérique; p...
AbstractBabson and Steingrı́msson have recently introduced seven new permutation statistics, ...
We consider the classical Mahonian statistics on the set B (Σ) of signed per- mutations in the hyper...
We introduce and study three new statistics on the even-signed permutation group D_n. We show that t...
AbstractWe derive multivariate generating functions that count signed permutations by various statis...
MacMahon’s classic theorem states that the length and major index statistics are equidistributed on ...
We define or redefine new Mahonian permutation statistics, called mad, mak and env. Of these, env is...
AbstractThe definitions of descent, excedance, major index, inversion index and Denert's statistics ...
AbstractWe introduce a natural extension of Adin, Brenti, and Roichman’s major-index statistic nmaj ...
We undertake a study of bijections which are used to enumerate sets of permutations and labeled fore...
AbstractA multivariate generating function involving the descent, major index, and inversion statist...
In this paper, we present a number of results surrounding Caselli's conjecture on the equidistributi...
We define new Mahonian statistics, called mad, mak and env, on words. Of these, env is shown to equa...
AbstractWe define new Mahonian statistics, called MAD, MAK, and ENV, on words. Of these, ENV is show...
AbstractLet An⊆Sn denote the alternating and the symmetric groups on 1,…,n. MacMahon's theorem [P.A....
Dans la théorie de Morse, quand on veut étudier un espace, on introduit une fonction numérique; p...
AbstractBabson and Steingrı́msson have recently introduced seven new permutation statistics, ...
We consider the classical Mahonian statistics on the set B (Σ) of signed per- mutations in the hyper...
We introduce and study three new statistics on the even-signed permutation group D_n. We show that t...
AbstractWe derive multivariate generating functions that count signed permutations by various statis...
MacMahon’s classic theorem states that the length and major index statistics are equidistributed on ...
We define or redefine new Mahonian permutation statistics, called mad, mak and env. Of these, env is...
AbstractThe definitions of descent, excedance, major index, inversion index and Denert's statistics ...
AbstractWe introduce a natural extension of Adin, Brenti, and Roichman’s major-index statistic nmaj ...
We undertake a study of bijections which are used to enumerate sets of permutations and labeled fore...
AbstractA multivariate generating function involving the descent, major index, and inversion statist...
In this paper, we present a number of results surrounding Caselli's conjecture on the equidistributi...
We define new Mahonian statistics, called mad, mak and env, on words. Of these, env is shown to equa...
AbstractWe define new Mahonian statistics, called MAD, MAK, and ENV, on words. Of these, ENV is show...
AbstractLet An⊆Sn denote the alternating and the symmetric groups on 1,…,n. MacMahon's theorem [P.A....
Dans la théorie de Morse, quand on veut étudier un espace, on introduit une fonction numérique; p...
AbstractBabson and Steingrı́msson have recently introduced seven new permutation statistics, ...
We consider the classical Mahonian statistics on the set B (Σ) of signed per- mutations in the hyper...
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