Computation of q-Binomial Coefficients with the $P(n,m)$ Integer Partition Function
Abstract
Using , the number of integer partitions of into exactly parts, which was the subject of an earlier paper, , the number of integer partitions of into exactly parts with each part at most , can be computed in , and the q-binomial coefficient can be computed in . Using the definition of the q-binomial coefficient, some properties of the q-binomial coefficient and are derived. The q-multinomial coefficient can be computed as a product of q-binomial coefficients. A formula for , the number of integer partitions of into exactly distinct parts with each part at most , is given. Some formulas for the number of integer partitions with each part between a minimum and a maximum are derived. A computer algebra program is listed implementing these algorithms using the computer algebra program of the earlier paper.
Keywords
Cite
@article{arxiv.2205.15013,
title = {Computation of q-Binomial Coefficients with the $P(n,m)$ Integer Partition Function},
author = {M. J. Kronenburg},
journal= {arXiv preprint arXiv:2205.15013},
year = {2022}
}