Vector bundles on degenerations of elliptic curves and Yang-Baxter equations (Q2863522)

The author studies three types of the Yang-Baxter equations, namely the classical Yang-Baxter equation (CYBE), the quantum Yang-Baxter equation (QYBE) and the associative Yang-Baxter equation (AYBE). The main goal is to obtain a better understating of their solutions and the relations between them, generalising the work [Adv. Math. 168, No. 1, 56--95 (2002; Zbl 0999.22023)] of \textit{A. Polishchuk} and also making use of the theory of coherent sheaves on degenerations of elliptic curves, in the spirit of the paper [``Vector bundles on degenerations of elliptic curves and Yang-Baxter equations'', \url{arXiv:0708.1685}] of \textit{I. Burban} and \textit{B. Kreussler}. By studying theses degenerations, the author achieves, among other results, a geometric construction of solutions of the CYBE and also describes a certain type of solutions (so-called rational) of the CYBE arising from simple vector bundles on a cuspidal cubic curve. This approach allows the establishment of a concrete recipe to lift these rational solutions of the CYBE to solutions of the QYBE and AYBE.