Quasi-shuffle products
Abstract
Given a locally finite graded set A and a commutative, associative operation on A that adds degrees, we construct a commutative multiplication * on the set of noncommutative polynomials in A which we call a quasi-shuffle product; it can be viewed as a generalization of the shuffle product. The resulting commutative algebra can be given the structure of a Hopf algebra (_A_,*,Delta). In the case where A is the set of positive integers and the operation on A is addition, (_A_,*,Delta) is the Hopf algebra of quasi-symmetric functions. If rational coefficients are allowed, there is a Hopf algebra isomorphism exp from the shuffle Hopf algebra on A onto (_A_,*,Delta). We discuss the dual of (_A_,*,Delta), and define a deformation *_q of * that coincides with * when q = 1 and is isomorphic to the concatenation product when q is not a root of unity. Finally, we discuss various examples of this construction.
Keywords
Cite
@article{arxiv.math/9907173,
title = {Quasi-shuffle products},
author = {Michael E. Hoffman},
journal= {arXiv preprint arXiv:math/9907173},
year = {2007}
}
Comments
18 pages. See also http://www.nadn.navy.mil/Users/math/meh/research.html