Higher Form Brackets for even Nambu-Poisson Algebras

TL;DR

This paper introduces higher form brackets for even Nambu-Poisson algebras, constructing an $L_{}$-algebroid on the cotangent complex, and explores their properties, examples, and connections to existing structures.

Contribution

It generalizes previous work by constructing higher form brackets for even Nambu-Poisson algebras using $L_{}$- and $P_{}$-structures, and introduces the notion of Lie-Rinehart $m$-algebras.

Findings

Constructed an $L_{}$-algebroid on the cotangent complex.

Proposed a method called the outer tensor product for new examples.

Compared higher form brackets with Vaisman's form bracket.

Abstract

Let $\boldsymbol{k}$ be a field of characteristic zero and $A=\boldsymbol{k}[x_{1},...,x_{n}]/I$ with $I=(f_{1},...,f_{k})$ be an affine algebra. We study Nambu-Poisson brackets on $A$ of arity $m\geq 2$, focusing on the case when $m$ is even. We construct an $L_{\infty}$-algebroid on the cotangent complex $\mathbb{L}_{A|\boldsymbol{k}}$, generalizing previous work on the case when $A$ is a Poisson algebra. This structure is referred to as the higher form brackets. The main tool is a $P_{\infty}$-structure on a resolvent $R$ of $A$. These $P_{\infty}$- and $L_{\infty}$-structures are merely $\mathbb Z_2$-graded for $m\neq 2$. We discuss several examples and propose a method to obtain new ones that we call the outer tensor product. We compare our higher form brackets with the form bracket of Vaisman. We introduce the notion of a Lie-Rinehart $m$-algebra, the form bracket of a Nambu-Poisson bracket of even arity being an example. We find a flat Nambu connection on the conormal module.