AbstractWe consider juggling patterns where the juggler can only catch and throw one ball at a time, and patterns where the juggler can handle many balls at the same time. Using a crossing statistic, we obtain explicit q-enumeration formulas. Our techniques give a natural combinatorial interpretation of the q-Stirling numbers of the second kind and a bijective proof of an identity of Carlitz. By generalizing these techniques, we give a bijective proof of a q-identity involving unitary compositions due to Haglund. Also, juggling patterns enable us to easily compute the Poincaré series of the affine Weyl group Ad−1
In this dissertation, we will study some generalizations of classical rook theory. The main focus is...
In this paper, we define two natural (p, q)-analogues of the generalized Stirling numbers of the fir...
AbstractThe paper contains a combinatorial interpretation of the q-Eulerian numbers suggested by H. ...
AbstractA considerable amount of interest has arisen pertaining to the mathematics of juggling. In t...
The mathematics of juggling emerged after the development of siteswap notation in the 1980s. Consequ...
A mathematical model for juggling has previously been described by Buhler, Eisenbud, Graham and Wrig...
Stirling numbers, which count partitions of a set and permutations in the symmetric group, have foun...
In this paper, we establish more properties for the q-analogue of the unied generalization of Stirli...
A mathematical notation for juggling called Siteswap has been used for decades to teach and learn ju...
Title: The mathematical theory of juggling Author: Bc. Michal Zamboj Department: Department of Mathe...
In this dissertation we study juggling card sequences and edge flipping in graphs, as well as some r...
International audienceStirling numbers of both kinds are linked to each other via two combinatorial ...
AbstractNatural q analogues of classical statistics on the symmetric groups Sn are introduced; param...
AbstractNew enumerating functions for the Euler numbers are considered. Several of the relevant gene...
In this dissertation we discuss three problems. We first show the classical q-Stirling numbers of th...
In this dissertation, we will study some generalizations of classical rook theory. The main focus is...
In this paper, we define two natural (p, q)-analogues of the generalized Stirling numbers of the fir...
AbstractThe paper contains a combinatorial interpretation of the q-Eulerian numbers suggested by H. ...
AbstractA considerable amount of interest has arisen pertaining to the mathematics of juggling. In t...
The mathematics of juggling emerged after the development of siteswap notation in the 1980s. Consequ...
A mathematical model for juggling has previously been described by Buhler, Eisenbud, Graham and Wrig...
Stirling numbers, which count partitions of a set and permutations in the symmetric group, have foun...
In this paper, we establish more properties for the q-analogue of the unied generalization of Stirli...
A mathematical notation for juggling called Siteswap has been used for decades to teach and learn ju...
Title: The mathematical theory of juggling Author: Bc. Michal Zamboj Department: Department of Mathe...
In this dissertation we study juggling card sequences and edge flipping in graphs, as well as some r...
International audienceStirling numbers of both kinds are linked to each other via two combinatorial ...
AbstractNatural q analogues of classical statistics on the symmetric groups Sn are introduced; param...
AbstractNew enumerating functions for the Euler numbers are considered. Several of the relevant gene...
In this dissertation we discuss three problems. We first show the classical q-Stirling numbers of th...
In this dissertation, we will study some generalizations of classical rook theory. The main focus is...
In this paper, we define two natural (p, q)-analogues of the generalized Stirling numbers of the fir...
AbstractThe paper contains a combinatorial interpretation of the q-Eulerian numbers suggested by H. ...