Generalised Springer correspondence for Z/m-graded Lie algebras

Abstract

Let G be a simple simply connected complex algebraic group and let g* be a Z/m-grading on its Lie algebra g. In a recent series of articles, G. Lusztig and Z. Yun, studied the classification of simple G0-equivariant perverse sheaves on the nilpotent cone of gi for i∈ Z/m, where G0 is the exponentiation of the degree zero piece g0. They proved a decomposition of the equivariant derived category of -adic sheaves on the nilpotent cone of gi into blocks, each generated by a certain cuspidal local system via spiral inductions. We prove a conjecture of them, which predicts the bijectivity of a map from 1) the set of simple perverse sheaves in a fixed block to 2) the set of simple modules of a block of a (trigonometric) degenerate double affine Hecke algebra (dDAHA). This is a dDAHA analogue of the Deligne--Langlands correspondence for affine Hecke algebras proven by Kazhdan--Lusztig. Our results generalise a previous work of E. Vasserot, where the perverse sheaves in the principal block were considered.