Beijing Institute of Mathematical Sciences and Applications

Nicolai Reshetikhin , Ivan Sechin , Andrey Tsiganov

László Féhér

Tuesday, June 11, 2024 4:00 PM - 5:00 PM

A6-101

Zoom 873 9209 0711 (BIMSA)

We review our results on bi-Hamiltonian structures of trigonometric spin Sutherland models built on collective spin variables. Our basic observation was that the cotangent bundle $T^*U(n)$ and its holomorphic analogue $T^*GL(n, \mathbb{C})$, as well as $T^* GL(n, \mathbb{C})_{\mathbb{R}}$, carry a natural quadratic Poisson bracket, which is compatible with the canonical linear one. The quadratic bracket arises by change of variables and analytic continuation from an associated Heisenberg double. Then, the reductions of $T^*U(n)$ and $T^*GL(n, \mathbb{C})$ by the conjugation actions of the corresponding groups lead to the real and holomorphic spin Sutherland models, respectively, equipped with a bi-Hamiltonian structure. The reduction of $T^* GL(n, \mathbb{C})_{\mathbb{R}}$ by the group $U(n) \times U(n)$ gives a generalized Sutherland model coupled to two $\mathfrak{u}(n)^*$-valued spins. We also show that a bi-Hamiltonian structure on the associative algebra $\mathfrak{gl}(n, \mathbb{R})$ that appeared in the context of Toda models can be interpreted as the quotient of compatible Poisson brackets on $T^*GL(n, \mathbb{R})$. Before our work, all these reductions were studied using the canonical Poisson structures of the cotangent bundles, without realizing the bi-Hamiltonian aspect.