The alternating central extension of the Onsager Lie algebra

TL;DR

This paper introduces and thoroughly describes the Lie algebra al, called the alternating central extension of the Onsager Lie algebra, which generalizes the relationships between the Onsager algebra and its q-deformations.

Contribution

The paper defines and provides a comprehensive description of the Lie algebra al, extending the structure and relationships of the Onsager algebra and its q-deformation.

Findings

al is a new Lie algebra generalizing the Onsager algebra.

al relates to al_q and O_q through specific analogies.

The paper offers a detailed structural analysis of al.

Abstract

The Onsager Lie algebra $O$ is often used to study integrable lattice models. The universal enveloping algebra of $O$ admits a $q$-deformation $O_q$ called the $q$-Onsager algebra. Recently, an algebra $\mathcal O_q$ was introduced called the alternating central extension of $O_q$. In this paper we introduce a Lie algebra $\mathcal O$ that is roughly described by the following two analogies: (i) $\mathcal O$ is to $O$ as $\mathcal O_q$ is to $O_q$; (ii) $O_q$ is to $O$ as $\mathcal O_q$ is to $\mathcal O$. We call $\mathcal O$ the alternating central extension of $O$. This paper contains a comprehensive description of $\mathcal O$.