# Classification of Lie algebras of differential operators

**Authors:** Helge {\O}ystein Maakestad

arXiv: 1905.09630 · 2020-11-13

## TL;DR

This paper classifies D-Lie algebras with projective canonical quotients, introduces a functor for their classification, and explores connections and Chow-operators relating to algebraic cycles.

## Contribution

It introduces a classification framework for D-Lie algebras with projective quotients and relates connections on these algebras to algebraic cycles and correspondences.

## Key findings

- Classified D-Lie algebras with projective canonical quotients.
- Established a functor $F_f(-)$ for classification based on 2-cocycles.
- Connected $	ilde{L}$-connections to algebraic cycles via Chow-operators.

## Abstract

In a previous paper we introduced the notion of a D-Lie algebra $\tilde{L}$. A D-Lie algebra $\tilde{L}$ is an $A/k$-Lie-Rinehart algebra with a right $A$-module structure and a canonical central element $D$ satisfying several conditions. We used this notion to define the universal enveloping algebra of the category of $\tilde{L}$-connections and to define the cohomology and homology of an arbitrary connection. In this note we introduce the canonical quotient $L$ of a D-Lie algebra $\tilde{L}$ and use this to classify D-Lie algebras where $L$ is projective as $A$-module. We define for any 2-cocycle $f\in \operatorname{Z}^2(\operatorname{Der}_k(A),A)$ a functor $F_{f}(-)$ from the category of $A/k$-Lie-Rinehart algebras to the category of D-Lie algebras and classify D-Lie algebras with projective canoncial quotient using the functor $F_{f}(-)$. We prove a similar classification for non-abelian extensions of D-Lie algebras. We classify $\tilde{L}$-connections in the case when the canonical quotient $L$ of $\tilde{L}$ is projective as $A$-module. Any $\tilde{L}$-connection is determined by a 2-cocycle $f\in \operatorname{Z}^2(\operatorname{Der}_k(A),A)$ and an $L$-connection $(E,\nabla)$. We introduce the correspondence and Chow-operator of an $\tilde{L}$-connection. The aim of this construction is to relate connections on D-Lie algebras to algebraic cycles an the category of correspondences. The Chow-operator cannot be defined for an ordinary connection on an $A/k$-Lie-Rinehart algebra. It depends in a non-trivial way on the right $A$-module structure on $\tilde{L}$ and the canonical quotient $A/k$-Lie-Rinehart algebra $L$ has no such structure.

## Full text

_Full body text omitted from this summary view._ Fetch the complete paper as Markdown: https://tomesphere.com/paper/1905.09630/full.md

## References

17 references — full list in the complete paper: https://tomesphere.com/paper/1905.09630/full.md

---
Source: https://tomesphere.com/paper/1905.09630