Some $q$-exponential formulas for finite-dimensional $\square_q$-modules
Quantum Algebra
2019-01-29 v3 Representation Theory
Abstract
We consider the algebra which is a mild generalization of the quantum algebra . The algebra is defined by generators and relations. The generators are , where is the cyclic group of order . For the generators , satisfy a -Weyl relation, and , satisfy a cubic -Serre relation. For we show that the action of is invertible on each nonzero finite-dimensional -module. We view as an operator that acts on nonzero finite-dimensional -modules. For , define . We show that the action of is nilpotent on each nonzero finite-dimensional -module. We view the -exponential as an operator that acts on nonzero finite-dimensional -modules. In our main results, for we express each of of and as a polynomial in .
Cite
@article{arxiv.1612.02864,
title = {Some $q$-exponential formulas for finite-dimensional $\square_q$-modules},
author = {Yang Yang},
journal= {arXiv preprint arXiv:1612.02864},
year = {2019}
}