Generalised Onsager Algebra in Quantum Lattice Models

TL;DR

This paper introduces a generalized Onsager algebra linked to quantum lattice models, demonstrating their integrability and exploring their algebraic structures and potential extensions in statistical mechanics.

Contribution

It establishes a connection between the generalized Clifford algebra, graph Temperley-Lieb algebra, and a new generalized Onsager algebra, along with integrable quantum lattice models.

Findings

Models exhibit integrability similar to the eight-vertex model

Relations between Clifford algebra and Onsager algebra are demonstrated

Framework suggests broader classes of quantum lattice models

Abstract

The Onsager algebra is one of the cornerstones of exactly solvable models in statistical mechanics. Starting from the generalised Clifford algebra, we demonstrate its relations to the graph Temperley-Lieb algebra, and a generalisation of the Onsager algebra. We present a series of quantum lattice models as representations of the generalised Clifford algebra, possessing the structure of a special type of the generalised Onsager algebra. The integrability of those models is presented, analogous to the free fermionic eight-vertex model. We also mention further extensions of the models and physical properties related to the generalised Onsager algebras, hinting at a general framework that includes families of quantum lattice models possessing the structure of the generalised Onsager algebras.