Add to ORKGWe define a new statistic on Weyl groups called the atomic length and investigate its combinatorial and representation-theoretic properties. In finite types, we show a number of properties of the atomic length which are reminiscent of the properties of the usual length. Moreover, we prove that, with the exception of rank two, this statistic describes an interval. In affine types, our results shed some light on classical enumeration problems, such as the celebrated Granville-Ono theorem on the existence of core partitions, by relating the atomic length to the theory of crystals.Comment: Added Proposition 6.2, Remark 8.2 on related recent results, and minor further changes. Intro and bibliography updated accordingl
In this paper, we investigate the order types of reflection orders on affine Weyl groups. We classif...
21 pagesWe study different problems related to the Solomon's descent algebra $\Sigma(W)$ of a finite...
Let $M$ be a cancellative and commutative (additive) monoid. The monoid $M$ is atomic if every non-i...
We define a new statistic on Weyl groups called the atomic length and investigate its combinatorial ...
Our main result is a generalization, to all affine Weyl groups, of P. Johnson's proof of D. Armstron...
We define for any crystallographic root system a new statistic on the corresponding Weyl group which...
We define for any crystallographic root system a new statistic on the corresponding Weyl group which...
We define for any crystallographic root system a new statistic on the corresponding Weyl group which...
We define for any crystallographic root system a new statistic on the corresponding Weyl group which...
We classify the elements of $W(\tilde{A}_n)$ by giving a canonical reduced expression for each, usin...
Lascoux stated that the type A Kostka-Foulkes polynomials K λ,µ (t) expand positively in terms of so...
Lascoux stated that the type A Kostka-Foulkes polynomials K λ,µ (t) expand positively in terms of so...
Let $W_a$ be an affine Weyl group. In 1987 Jian Yi Shi gave a characterization of the elements $w \i...
Abstract. Let M be a commutative cancellative atomic monoid. We use unions of sets of lengths in M t...
Abstract We address the long-standing conjecture that all permutations have polynomially bounded wor...
In this paper, we investigate the order types of reflection orders on affine Weyl groups. We classif...
21 pagesWe study different problems related to the Solomon's descent algebra $\Sigma(W)$ of a finite...
Let $M$ be a cancellative and commutative (additive) monoid. The monoid $M$ is atomic if every non-i...
We define a new statistic on Weyl groups called the atomic length and investigate its combinatorial ...
Our main result is a generalization, to all affine Weyl groups, of P. Johnson's proof of D. Armstron...
We define for any crystallographic root system a new statistic on the corresponding Weyl group which...
We define for any crystallographic root system a new statistic on the corresponding Weyl group which...
We define for any crystallographic root system a new statistic on the corresponding Weyl group which...
We define for any crystallographic root system a new statistic on the corresponding Weyl group which...
We classify the elements of $W(\tilde{A}_n)$ by giving a canonical reduced expression for each, usin...
Lascoux stated that the type A Kostka-Foulkes polynomials K λ,µ (t) expand positively in terms of so...
Lascoux stated that the type A Kostka-Foulkes polynomials K λ,µ (t) expand positively in terms of so...
Let $W_a$ be an affine Weyl group. In 1987 Jian Yi Shi gave a characterization of the elements $w \i...
Abstract. Let M be a commutative cancellative atomic monoid. We use unions of sets of lengths in M t...
Abstract We address the long-standing conjecture that all permutations have polynomially bounded wor...
In this paper, we investigate the order types of reflection orders on affine Weyl groups. We classif...
21 pagesWe study different problems related to the Solomon's descent algebra $\Sigma(W)$ of a finite...
Let $M$ be a cancellative and commutative (additive) monoid. The monoid $M$ is atomic if every non-i...