# The infinite dimensional Unital 3-Lie Poisson algebra

**Authors:** Chuangchuang Kang, Ruipu Bai, Yingli Wu

arXiv: 1904.01005 · 2019-04-03

## TL;DR

This paper constructs an infinite dimensional unital 3-Lie Poisson algebra from a commutative associative algebra, analyzes its structure, and demonstrates embeddings of several important infinite dimensional 3-Lie algebras.

## Contribution

It introduces a new infinite dimensional unital 3-Lie Poisson algebra with a minimal generating set and explores its structural properties and embeddings of known 3-Lie algebras.

## Key findings

- Existence of a minimal set of six generators for the algebra.
- The quotient algebra is simple.
- Embedding of key infinite dimensional 3-Lie algebras into the constructed algebra.

## Abstract

From a commutative associative algebra $A$, the infinite dimensional unital 3-Lie Poisson algebra~$\mathfrak{L}$~is constructed, which is also a canonical Nambu 3-Lie algebra, and the structure of $\mathfrak{L}$ is discussed. It is proved that: (1) there is a minimal set of generators $S$ consisting of six vectors; (2) the quotient algebra $\mathfrak{L}/\mathbb{F}L_{0, 0}^0$ is a simple 3-Lie Poisson algebra; (3) four important infinite dimensional 3-Lie algebras: 3-Virasoro-Witt algebra $\mathcal{W}_3$, $A_\omega^\delta$, $A_{\omega}$ and the 3-$W_{\infty}$ algebra can be embedded in $\mathfrak{L}$.

## Full text

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## References

30 references — full list in the complete paper: https://tomesphere.com/paper/1904.01005/full.md

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Source: https://tomesphere.com/paper/1904.01005