Quasi-Classical Braverman--Kazhdan Intertwiners via Quiver Varieties

Abstract

Let P and P' be standard parabolic subgroups of SLn(C) whose Levi subgroups are conjugate. We construct isomorphisms Φ(P,P'):T*(SLn/[P,P])aff→T*(SLn/[P',P'])aff between the affinizations of the cotangent bundles of the Braverman--Kazhdan spaces SLn/[P,P] and SLn/[P',P'], and we show that they satisfy SLn× Lab-equivariance and braid relations. These isomorphisms are the quasi-classical limits of Braverman--Kazhdan normalized intertwining operators. Our construction proceeds by defining reflection functors for quiver varieties with an SL-gauge group, thereby generalizing Wang's construction of the Gelfand--Graev action on T*(SLn/U)aff via quiver varieties in the case P=B.