Noncommutative Symmetric Systems over Associative Algebras

Abstract

This paper is the first of a sequence papers ([Z4]--[Z7]) on the NCS (noncommutative symmetric) systems over differential operator algebras in commutative or noncommutative variables ([Z4]); the NCS systems over the Grossman-Larson Hopf algebras ([GL],[F]) of labeled rooted trees ([Z6]); as well as their connections and applications to the inversion problem ([BCW],[E4]) and specializations of NCSFs ([Z5],[Z7]). In this paper, inspired by the seminal work [GKLLRT] on NCSFs (noncommutative symmetric functions), we first formulate the notion NCS systems over associative Q-algebras. We then prove some results for NCS systems in general; the NCS systems over bialgebras or Hopf algebras; and the universal NCS system formed by the generating functions of certain NCSFs in [GKLLRT]. Finally, we review some of the main results that will be proved in the followed papers [Z4], [Z6] and [Z7] as some supporting examples for the general discussions given in this paper.

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