Homogeneous algebras, statistics and combinatorics
Abstract
After some generalities on homogeneous algebras, we give a formula connecting the Poincar\'e series of a homogeneous algebra with the homology of the corresponding Koszul complex generalizing thereby a standard result for quadratic algebras. We then investigate two particular types of cubic algebras: The first one called the parafermionic (parabosonic) algebra is the algebra generated by the creation operators of the universal fermionic (bosonic) parastatics with degrees of freedom while the second is the plactic algebra that is the algebra of the plactic monoid with entries in . In the case D=2 we describe the relations with the cubic Artin-Schelter algebras. It is pointed out that the natural action of GL(2) on the parafermionic algebra for D=2 extends as an action of the quantum group on the generic cubic Artin-Schelter regular algebra of type ; and being related to the Artin-Schelter parameters. It is claimed that this has a counterpart for any integer .
Cite
@article{arxiv.math/0207085,
title = {Homogeneous algebras, statistics and combinatorics},
author = {Michel Dubois-Violette and Todor Popov},
journal= {arXiv preprint arXiv:math/0207085},
year = {2007}
}
Comments
14 pages