Classical $N$-Reflection Equation and Gaudin Models
Abstract
We introduce the notion of -reflection equation which provides a large generalization of the usual classical reflection equation describing integrable boundary conditions. The latter is recovered as a special example of the case. The basic theory is established and illustrated with several examples of solutions of the -reflection equation associated to the rational and trigonometric -matrices. A central result is the construction of a Poisson algebra associated to a non skew-symmetric -matrix whose form is specified by a solution of the -reflection equation. Generating functions of quantities in involution can be identified within this Poisson algebra. As an application, we construct new classical Gaudin-type Hamiltonians, particular cases of which are Gaudin Hamiltonians of -type .
Cite
@article{arxiv.1803.09931,
title = {Classical $N$-Reflection Equation and Gaudin Models},
author = {Vincent Caudrelier and Nicolas Crampe},
journal= {arXiv preprint arXiv:1803.09931},
year = {2025}
}
Comments
12 pages. Final authors version as published in Lett. Math. Phys (online, open access)