Hikita-Nakajima conjecture for the Gieseker variety

Abstract

Let M0 be an affine Nakajima quiver variety, and M is the corresponding BFN Coulomb branch. Assume that M0 can be resolved by the (smooth) Nakajima quiver variety M. The Hikita-Nakajima conjecture claims that there should be an isomorphism of (graded) algebras H*S(M,C) C[MsC×], here S M0 is a torus acting on M0 preserving the Poisson structure, Ms is the (Poisson) deformation of M over s=Lie (S), C× is a generic one-dimensional torus acting on M, and C[MsC×] is the algebra of schematic C×-fixed points of Ms. We prove the Hikita-Nakajima conjecture for M=M(n,r) Gieseker variety (ADHM space). We produce the isomorphism explicitly on generators. We also describe the Hikita-Nakajima isomorphism above using the realization of Ms as the spectrum of the center of rational Cherednik algebra corresponding to Sn (Z/rZ)n and identify all the algebras that appear in the isomorphism with the center of degenerate cyclotomic Hecke algebra (generalizing some results of Shan, Varagnolo, and Vasserot).