Classical integrable systems and soliton equations related to eleven-vertex R-matrix

TL;DR

This paper explores classical integrable systems linked to the eleven-vertex R-matrix, connecting them to well-known models like Ruijsenaars-Schneider and Calogero-Moser, and extends to field theories such as Landau-Lifshitz and principal chiral models.

Contribution

It provides new descriptions of integrable tops related to the eleven-vertex R-matrix and constructs complex systems like Gaudin models and spin chains from these foundations.

Findings

Relates the 11-vertex R-matrix to 2-body RS and CM models.

Rewrites Gaudin models and spin chains in canonical variables.

Extends integrable tops to 1+1 field theories, deriving Landau-Lifshitz and chiral models.

Abstract

In our recent paper we suggested a natural construction of the classical relativistic integrable tops in terms of the quantum $R$-matrices. Here we study the simplest case -- the 11-vertex $R$-matrix and related ${\rm gl}_2$ rational models. The corresponding top is equivalent to the 2-body Ruijsenaars-Schneider (RS) or the 2-body Calogero-Moser (CM) model depending on its description. We give different descriptions of the integrable tops and use them as building blocks for construction of more complicated integrable systems such as Gaudin models and classical spin chains (periodic and with boundaries). The known relation between the top and CM (or RS) models allows to re-write the Gaudin models (or the spin chains) in the canonical variables. Then they assume the form of $n$-particle integrable systems with $2n$ constants. We also describe the generalization of the top to 1+1 field theories. It allows us to get the Landau-Lifshitz type equation. The latter can be treated as non-trivial deformation of the classical continuous Heisenberg model. In a similar way the deformation of the principal chiral model is also described.