Geometrization of solutions of the generalized classical Yang-Baxter equation and a new proof of the Belavin-Drinfeld trichotomy

TL;DR

This paper offers a geometric approach to solutions of the generalized classical Yang-Baxter equation, providing a new proof of the Belavin-Drinfeld trichotomy and extending structural understanding over arbitrary fields.

Contribution

It introduces an algebro-geometric framework using cohomology free sheaves to analyze CYBE solutions and offers a novel proof of the Belavin-Drinfeld trichotomy.

Findings

New proof of the Belavin-Drinfeld trichotomy

Structural results for solutions over arbitrary fields

Extension of solutions to rational maps on product of curves

Abstract

We study solutions to a generalized version of the classical Yang-Baxter equation (CYBE) with values in a central simple Lie algebra over a field of characteristic 0 from an algebro-geometric perspective. In particular, we describe such solutions using cohomology free sheaves of Lie algebras on projective curves. This framework leads to a new proof of the Belavin-Drinfeld trichotomy, which asserts that over the ground field $\mathbb{C}$ any non-degenerate solution of the CYBE is either elliptic, trigonometric or rational. Furthermore, we obtain new structural results for solutions of the generalized CYBE over arbitrary fields of characteristic 0. For example, we prove that such solutions can be extended in an appropriate way to rational maps on the product of two curves.