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Updated: Mar 9, 2026

Setting Limits on Supersymmetry Using Simplified Models
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Integrable Deformations of T-Dual σ Models.

Riccardo Borsato1, Linus Wulff1

  • 1The Blackett Laboratory, Imperial College, London SW7 2AZ, United Kingdom.

Physical Review Letters
|December 31, 2016
PubMed
Summary
This summary is machine-generated.

We developed a method to deform T duals of 2D sigma models, preserving classical integrability. This technique, using a specific operator, generalizes Yang-Baxter deformations for principal chiral and supercoset models.

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Area of Science:

  • Theoretical Physics
  • Mathematical Physics

Background:

  • Two-dimensional sigma models are fundamental in theoretical physics, particularly in string theory and condensed matter.
  • T-duality is a key concept in string theory, relating different string theories.
  • Classical integrability is a crucial property for exactly solvable models.

Purpose of the Study:

  • To present a novel method for deforming T duals of two-dimensional sigma models.
  • To ensure the preservation of classical integrability in the deformed models.
  • To generalize existing deformation techniques like Yang-Baxter deformations.

Main Methods:

  • Introducing a linear operator "ω" acting on the dualized subalgebra.
  • Ensuring the operator "ω" satisfies the 2-cocycle condition.
  • Utilizing field redefinitions to establish equivalences between models.

Main Results:

  • A method to deform (generically non-Abelian) T duals of 2D sigma models while preserving classical integrability.
  • Identification of deformed models by a linear operator "ω" satisfying the 2-cocycle condition.
  • Proof of equivalence between homogeneous Yang-Baxter deformations and the proposed deformed models for invertible "ω".

Conclusions:

  • The presented method provides a unified framework for deforming T duals of sigma models.
  • The findings offer new insights into the structure and properties of integrable field theories.
  • The generalization to supercoset models expands the applicability of the method.