Twistor Actions for Integrable Systems

TL;DR

This paper develops a twistor space Chern-Simons action framework to derive Lagrangians for integrable sigma models from dimensionally reduced gravity and supergravity, linking geometric and Lagrangian formulations.

Contribution

It introduces a novel twistor Chern-Simons approach to obtain Lagrangians for integrable systems derived from gravity theories.

Findings

Derived Lax operators for 2D integrable models

Obtained explicit Lagrangians from twistor Chern-Simons theory

Extended framework to include matter fermions in supergravity

Abstract

Many integrable systems can be reformulated as holomorphic vector bundles on twistor space. This is a powerful organizing principle in the theory of integrable systems. One shortcoming is that it is formulated at the level of the equations of motion. From this perspective, it is mysterious that integrable systems have Lagrangians. In this paper, we study a Chern-Simons action on twistor space and use it to derive the Lagrangians of some integrable sigma models. Our focus is on examples that come from dimensionally reduced gravity and supergravity. The dimensional reduction of general relativity to two spacetime dimensions is an integrable coset sigma model coupled to a dilaton and 2d gravity. The dimensional reduction of supergravity to two spacetime dimensions is an integrable coset sigma model coupled to matter fermions, a dilaton, and 2d supergravity. We derive Lax operators and Lagrangians for these 2d integrable systems using the Chern-Simons theory on twistor space. In the supergravity example, we use an extended setup in which twistor Chern-Simons theory is coupled to a pair of matter fermions.