Reduction of a bi-Hamiltonian hierarchy on T*U(n) to spin Ruijsenaars--Sutherland models

Abstract

We first exhibit two compatible Poisson structures on the cotangent bundle of the unitary group U(n) in such a way that the invariant functions of the u(n)*-valued momenta generate a bi-Hamiltonian hierarchy. One of the Poisson structures is the canonical one and the other one arises from embedding the Heisenberg double of the Poisson-Lie group U(n) into T*U(n), and subsequently extending the embedded Poisson structure to the full cotangent bundle. We then apply Poisson reduction to the bi-Hamiltonian hierarchy on T*U(n) using the conjugation action of U(n), for which the ring of invariant functions is closed under both Poisson brackets. We demonstrate that the reduced hierarchy belongs to the overlap of well-known trigonometric spin Sutherland and spin Ruijsenaars--Schneider type integrable many-body models, which receive a bi-Hamiltonian interpretation via our treatment.