Generalized $q$-Stirling numbers and normal ordering
Combinatorics
2014-08-21 v7
Abstract
The normal ordering coefficients of strings consisting of which satisfy () are considered. These coefficients are studied in two contexts: first, as a multiple of a sequence satisfying a generalized recurrence, and second, as -analogues of rook numbers under the row creation rule introduced by Goldman and Haglund. A number of properties are derived, including recurrences, expressions involving other -analogues and explicit formulas. We also give a Dobinsky-type formula for the associated Bell numbers and the corresponding extension of Spivey's Bell number formula. The coefficients, viewed as rook numbers, are extended to the case via a modified rook model.
Keywords
Cite
@article{arxiv.1407.3343,
title = {Generalized $q$-Stirling numbers and normal ordering},
author = {Roberto B. Corcino and Ken Joffaniel M. Gonzales and Richell O. Celeste},
journal= {arXiv preprint arXiv:1407.3343},
year = {2014}
}
Comments
New section on q-Bell numbers added, extended to case $s\in\mathbb R$