Darboux coordinates on the BFM spaces

Abstract

Bezrukavnikov-Finkelberg-Mirkovi\'c [Compos. Math. 141 (2005)] identified the equivariant K-group of an affine Grassmannian, that we refer as (the coordinate ring of) a BFM space \'a l\`a Teleman [Proc. ICM Seoul (2014)], with a version of Toda lattice. We give a new system of generators and relations of a certain localization of this space, that can be seen as a version of its Darboux coordinate. This establishes a conjecture in Finkelberg-Tymbaliuk [Progress in Math. 300 (2019)] that relates the BFM space of a connected reductive algebraic group with those of Levi subgroups.