Towards the gravity/CYBE correspondence beyond integrability -- Yang-Baxter deformations of $T^{1,1}$

TL;DR

This paper explores non-integrable deformations of the $T^{1,1}$ manifold using Yang-Baxter sigma models, extending the gravity/CYBE correspondence beyond integrable systems and connecting to known supergravity backgrounds.

Contribution

It introduces a novel supercoset construction of $T^{1,1}$ and demonstrates deformations via CYBE that match known supergravity solutions, extending the gravity/CYBE correspondence beyond integrability.

Findings

Deformation metrics match TsT transformations and Lunin-Maldacena backgrounds.

Supercoset construction of $T^{1,1}$ provides new physical insights.

Extension of gravity/CYBE correspondence beyond integrable models.

Abstract

Yang-Baxter sigma models, proposed by Klimcik and Delduc-Magro-Vicedo, have been recognized as a powerful framework for studying integrable deformations of two-dimensional non-linear sigma models. In this short article, as an important generalization, we review a non-integrable sigma model in the Yang-Baxter sigma model approach based on [arXiv:1406.2249]. In particular, we discuss a family of deformations of the 5D Sasaki-Einstein manifold $T^{1,1}$, instead of the standard deformations of the $5$-sphere S$^5$. For this purpose, we first describe a novel construction of $T^{1,1}$ as a supercoset, and provide a physical interpretation of this construction from viewpoint of the dual Klebanov-Witten field theory. Secondly, we consider a $3$-parameter deformation of $T^{1,1}$ by using classical $r$-matrices satisfying the classical Yang--Baxter equation (CYBE). The resulting metric and NS-NS two-form completely agree with the ones previously obtained via TsT (T-dual -- shift -- T-dual) transformations, and contain the Lunin-Maldacena background as a special case. Our result indicates that what we refer to as the gravity/CYBE(Classical Yang-Baxter Equation) correspondence can be extended beyond integrable cosets.