Lagrangian Formulation of Symmetric Space sine-Gordon Models

TL;DR

This paper develops a Lagrangian formulation for symmetric space sine-Gordon models, linking them to WZW actions and exploring their integrability, solitons, and vacuum structure, thus advancing understanding of their classical properties.

Contribution

It introduces a Lagrangian framework for symmetric space sine-Gordon models derived from WZW actions, clarifying their integrable perturbations of coset conformal field theories.

Findings

Models are derived from G/H WZW actions with potential terms.

The models exhibit integrability and soliton solutions.

Discussion of vacuum structure and Bäcklund transformations.

Abstract

The symmetric space sine-Gordon models arise by conformal reduction of ordinary 2-dim $\sigma$-models, and they are integrable exhibiting a black-hole type metric in target space. We provide a Lagrangian formulation of these systems by considering a triplet of Lie groups $F \supset G \supset H$. We show that for every symmetric space $F/G$, the generalized sine-Gordon models can be derived from the $G/H$ WZW action, plus a potential term that is algebraically specified. Thus, the symmetric space sine-Gordon models describe certain integrable perturbations of coset conformal field theories at the classical level. We also briefly discuss their vacuum structure, Backlund transformations, and soliton solutions.