English

Noncommutative Symmetric Functions and the Inversion Problem

Complex Variables 2009-02-02 v2 Combinatorics

Abstract

Let KK be any unital commutative \bQ\bQ-algebra and z=(z1,z2,...,zn)z=(z_1, z_2, ..., z_n) commutative or noncommutative variables. Let tt be a formal central parameter and \kttzz\kttzz the formal power series algebra of zz over K[[t]]K[[t]]. In \cite{GTS-II}, for each automorphism Ft(z)=zHt(z)F_t(z)=z-H_t(z) of \kttzz\kttzz with Ht=0(z)=0H_{t=0}(z)=0 and o(H(z))1o(H(z))\geq 1, a \cNcs (noncommutative symmetric) system (\cite{GTS-I}) \Oft\Oft has been constructed. Consequently, we get a Hopf algebra homomorphism \cSft:\cNsf\cDzz\cSft: \cNsf \to \cDzz from the Hopf algebra \cNsf\cNsf (\cite{G-T}) of NCSF's (noncommutative symmetric functions). In this paper, we first give a list for the identities between any two sequences of differential operators in the \cNcs system \Oft\Oft by using some identities of NCSF's derived in \cite{G-T} and the homomorphism \cSft\cSft. Secondly, we apply these identities to derive some formulas in terms of differential operator in the system \Oft\Oft for the Taylor series expansions of u(Ft)u(F_t) and u(Ft1)u(F_t^{-1}) (u(z)\kttzz)(u(z)\in \kttzz); the D-Log and the formal flow of FtF_t and inversion formulas for the inverse map of FtF_t. Finally, we discuss a connection of the well-known Jacobian conjecture with NCSF's.

Keywords

Cite

@article{arxiv.math/0509135,
  title  = {Noncommutative Symmetric Functions and the Inversion Problem},
  author = {Wenhua Zhao},
  journal= {arXiv preprint arXiv:math/0509135},
  year   = {2009}
}

Comments

Latex, 33 pages. Some misprints have been corrected