On Some Analogues of Descent Numbers and Major Index for the Hyperoctahedral Group
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چکیده
We give a new description of the flag major index, introduced by Adin and Roichman, by using a major index defined by Reiner. This allows us to establish a connection between an identity of Reiner and some more recent results due to Chow and Gessel. Furthermore we generalize the main identity of Chow and Gessel by computing the four-variate generating series of descents, major index, length, and number of negative entries over Coxeter groups of type B and D.
منابع مشابه
Descent Numbers and Major Indices for the Hyperoctahedral Group
We introduce and study three new statistics on the hyperoctahedral group Bn, and show that they give two generalizations of Carlitz's identity for the descent number and major index over Sn. This answers a question posed by Foata.
متن کاملOn the Descent Numbers and Major Indices for the Hyperoctahedral Group
Adin, Brenti, and Roichman [Adv. in Appl. Math. 27 (2001), 210–224], in answering a question posed by Foata, introduced two descent numbers and major indices for the hyperoctahedral group Bn, whose joint distribution generalizes an identity due to MacMahon and Carlitz. We shall show that yet another pair of statistics exists, and whose joint distribution constitutes a “natural” solution to Foat...
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A classical result of MacMahon shows that the length function and the major index are equi-distributed over the symmetric group. Foata and Schützenberger gave a remarkable refinement and proved that these parameters are equi-distributed over inverse descent classes, implying bivariate equi-distribution identities. Type B analogues of these results, refinements and consequences are given in this...
متن کاملOn Some Analogues of Carlitz’s Identity for the Hyperoctahedral Group
Abstract. We give a new description of the flag major index, introduced by Adin and Roichman, by using a major index defined by Reiner. This allows us to establish a connection between an identity of Reiner and some more recent results due to Chow and Gessel. Furthermore we generalize the main identity of Chow and Gessel by computing the four-variate generating series of descents, major index, ...
متن کاملEqui - distribution over Descent Classes of the Hyperoctahedral Group ( Extended Abstract )
Abstract. A classical result of MacMahon shows that the length function and the major index are equidistributed over the symmetric group. Foata and Schützenberger gave a remarkable refinement and proved that these parameters are equi-distributed over inverse descent classes, implying bivariate equi-distribution identities. Type B analogues and further refinements and consequences are given in t...
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تاریخ انتشار 2010