Mathematics – Combinatorics
Scientific paper
2005-09-07
Mathematics
Combinatorics
Latex, 35 pages. Some misprints have been corrected
Scientific paper
Let $K$ be any unital commutative $\bQ$-algebra and $W$ any non-empty subset of $\bN^+$. Let $z=(z_1, ..., z_n)$ be commutative or noncommutative free variables and $t$ a formal central parameter. % Denote uniformly by $\kzz$ and $\kttzz$ the formal power series algebras % of $z$ over $K$ and $K[[t]]$, respectively. Let $\cDazz$ $(\alpha\geq 1)$ be the unital algebra generated by the differential operators of $\kzz$ which increase the degree in $z$ by at least $\alpha-1$ and $ \ataz $ the group of automorphisms $F_t(z)=z-H_t(z)$ of $\kttzz$ with $o(H_t(z))\geq \alpha$ and $H_{t=0}(z)=0$. First, we study a connection of the \cNcs systems $\Omega_{F_t}$ $(F_t\in \ataz)$ (\cite{GTS-I}, \cite{GTS-II}) over the differential operators algebra $\cDazz$ and the \cNcs system $\Omega_\bT^W$ (\cite{GTS-IV}) over the Grossman-Larson Hopf algebra $\cH_{GL}^W$ (\cite{GL}, \cite{F1}, \cite{F2}) of $W$-labeled rooted trees. We construct a Hopf algebra homomorphism $\mathcal A_{F_t}: \cH_{GL}^W \to \cDazz$ $(F_t\in \ataz)$ such that $\mathcal A_{F_t}^{\times 5}(\Omega_\bT^W) =\Omega_{F_t}$. Secondly, we generalize the tree expansion formulas for the inverse map (\cite{BCW}, \cite{Wr3}), the D-Log and the formal flow (\cite{WZ}) of $F_t$ in the commutative case to the noncommutative case. Thirdly, we prove the injectivity of the specialization $\cT:{\mathcal N}Sym \to \cH_{GL}^{\bN^+}$ (\cite{GTS-IV}) of NCSF's (noncommutative symmetric functions) (\cite{G-T}). Finally, we show the family of the specializations $\cS_{F_t}$ of NCSF's with all $n\geq 1$ and the polynomial automorphisms $F_t=z-H_t(z)$ with $H_t(z)$ homogeneous and the Jacobian matrix $JH_t$ strictly lower triangular can distinguish any two different NCSF's. The graded dualized versions of the main results above are also discussed.
Zhao Wenhua
No associations
LandOfFree
NCS Systems over Differential Operator Algebras and the Grossman-Larson Hopf Algebras of Labeled Rooted Trees does not yet have a rating. At this time, there are no reviews or comments for this scientific paper.
If you have personal experience with NCS Systems over Differential Operator Algebras and the Grossman-Larson Hopf Algebras of Labeled Rooted Trees, we encourage you to share that experience with our LandOfFree.com community. Your opinion is very important and NCS Systems over Differential Operator Algebras and the Grossman-Larson Hopf Algebras of Labeled Rooted Trees will most certainly appreciate the feedback.
Profile ID: LFWR-SCP-O-215901