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Geometry of the spectral parameter and renormalisation of integrable sigma-models

Sylvain Lacroix, Anders Wallberg

2024Journal of High Energy Physics10 citationsDOIOpen Access PDF

Abstract

A bstract In the past few years, the unifying frameworks of 4-dimensional Chern-Simons theory and affine Gaudin models have allowed for the systematic construction of a large family of integrable σ -models. These models depend on the data of a Riemann surface C (here of genus 0 or 1) and of a meromorphic 1-form ω on C , which encodes the geometry of their spectral parameter and the analytic structure of their Lax connection. The main subject of this paper is the renormalisation of these theories and in particular two conjectures describing their 1-loop RG-flow in terms of the 1-form ω . These conjectures were put forward in [1] and [2] and were proven in a variety of cases. After extending the proposal of [1] to the elliptic setup (with C of genus 1), we establish the equivalence of these two conjectures and discuss some of their applications. Moreover, we check their veracity on an explicit example, namely an integrable elliptic deformation of the Principal Chiral Model on $${{\text{SL}}}_{\mathbb{R}}\left(N\right)$$ .

Topics & Concepts

Integrable systemMeromorphic functionPhysicsRiemann surfaceAffine transformationGenusSigmaConnection (principal bundle)Sigma modelPure mathematicsMathematical physicsElliptic functionGeometryMathematicsQuantum mechanicsNonlinear systemBiologyBotanyAlgebraic structures and combinatorial modelsBlack Holes and Theoretical PhysicsHomotopy and Cohomology in Algebraic Topology
Geometry of the spectral parameter and renormalisation of integrable sigma-models | Litcius