A non-local Poisson bracket for Coxeter--Toda lattices

Abstract

We present a non-local Poisson bracket defined on the phase space Gu,v/H of a Coxeter--Toda lattice, where Gu,v is a Coxeter double Bruhat cell of GLn and H is the subgroup of diagonal matrices. This non-local Poisson bracket is given in an appropriate set of coordinates of Gu,v/H derived from the so-called factorization parameters. We prove that the generalized B\"acklund--Darboux transformations σu,vu',v': Gu,v/H Gu',v'/H are Poisson maps. We exploit that fact to show that the non-local Poisson bracket corresponds to the Atiyah--Hitchin bracket under the Moser map.