Brenti F, Carnevale A. Proof of a conjecture of Klopsch-Voll on Weyl groups of type $ A$. Transactions of the American Mathematical Society. 2017;369(10):7531-7547.We prove a conjecture of Klopsch-Voll on the signed generating function of a new statistic on the quotients of the symmetric groups. As a consequence of our results we also prove a conjecture of Stasinski-Voll in type B
International audienceIn 1997 Clarke et al. studied a $q$-analogue of Euler's difference table for $...
Among the Coxeter groups most studied there are finite Coxeter groups and Weyl affine groups. For ea...
AbstractIn 1997 Clarke et al. studied a q-analogue of Eulerʼs difference table for n! using a key bi...
We prove a conjecture of Klopsch-Voll on the signed generating function of a new statistic on the ...
Abstract. In a recent paper, Stasinski and Voll introduced a length-like statistic on hyperoctahedra...
AbstractIn this paper we look at polynomials arising from statistics on the classes of involutions, ...
We define for any crystallographic root system a new statistic on the corresponding Weyl group which...
We develop a number of statistical aspects of symmetric groups (mostly dealing with the distribution...
We define an analogue of signed Eulerian numbers fn;k for involutions of the symmetric group and de...
Stasinski A, Voll C. Representation zeta functions of nilpotent groups and generating functions for ...
AbstractWe develop a number of statistical aspects of symmetric groups (mostly dealing with the dist...
We de ne an analog of signed Eulerian numbers fn;k for involutions of the symmetric group and derive...
We define and study odd and even analogues of the major index statistics for the classical Weyl grou...
Stasinski A, Voll C. A New Statistic on the Hyperoctahedral Groups. The Electronic Journal of Combin...
AbstractA multivariate generating function involving the descent, major index, and inversion statist...
International audienceIn 1997 Clarke et al. studied a $q$-analogue of Euler's difference table for $...
Among the Coxeter groups most studied there are finite Coxeter groups and Weyl affine groups. For ea...
AbstractIn 1997 Clarke et al. studied a q-analogue of Eulerʼs difference table for n! using a key bi...
We prove a conjecture of Klopsch-Voll on the signed generating function of a new statistic on the ...
Abstract. In a recent paper, Stasinski and Voll introduced a length-like statistic on hyperoctahedra...
AbstractIn this paper we look at polynomials arising from statistics on the classes of involutions, ...
We define for any crystallographic root system a new statistic on the corresponding Weyl group which...
We develop a number of statistical aspects of symmetric groups (mostly dealing with the distribution...
We define an analogue of signed Eulerian numbers fn;k for involutions of the symmetric group and de...
Stasinski A, Voll C. Representation zeta functions of nilpotent groups and generating functions for ...
AbstractWe develop a number of statistical aspects of symmetric groups (mostly dealing with the dist...
We de ne an analog of signed Eulerian numbers fn;k for involutions of the symmetric group and derive...
We define and study odd and even analogues of the major index statistics for the classical Weyl grou...
Stasinski A, Voll C. A New Statistic on the Hyperoctahedral Groups. The Electronic Journal of Combin...
AbstractA multivariate generating function involving the descent, major index, and inversion statist...
International audienceIn 1997 Clarke et al. studied a $q$-analogue of Euler's difference table for $...
Among the Coxeter groups most studied there are finite Coxeter groups and Weyl affine groups. For ea...
AbstractIn 1997 Clarke et al. studied a q-analogue of Eulerʼs difference table for n! using a key bi...
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