Noncommutative Root Space Witt, Ricci Flow, and Poisson Bracket   Continual Lie Algebras

Alexander Zuevsky

arXiv:0911.3875·math-ph·November 20, 2009

Noncommutative Root Space Witt, Ricci Flow, and Poisson Bracket Continual Lie Algebras

Alexander Zuevsky

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TL;DR

This paper introduces new noncommutative root space generalizations for classical Lie algebras, expanding the mathematical framework for Witt, Ricci flow, and Poisson brackets.

Contribution

It presents novel examples of mappings that define noncommutative root space generalizations for these Lie algebras.

Findings

01

New noncommutative root space mappings introduced

02

Generalizations applicable to Witt, Ricci flow, and Poisson brackets

03

Expands the mathematical framework for continual Lie algebras

Abstract

We introduce new examples of mappings defining noncommutative root space generalizations for the Witt, Ricci flow, and Poisson bracket continual Lie algebras.

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