Haiman's Conjecture and Springer's Representations

Abstract

For any connected complex reductive group G and element z of its Weyl group W, we use work of Lusztig and Abreu-Nigro to compute the graded W-character of the intersection cohomology of any closed Lusztig variety for z over the regular semisimple locus of G. We relate the resulting formula to unipotent Lusztig varieties, giving a new geometric model for unicellular LLT polynomials. We then consider Laurent polynomials αψ, Gz indexed by irreducible characters ψ, encoding how our formula decomposes into ungraded characters arising from the Springer theory of G. From evidence in low rank, we conjecture that if ψ is inflated from type A in a particular way, then the nonzero coefficients of αψ, Gz are positive and unimodal. This offers an answer to a 1993 question of Haiman about generalizing a conjecture he posed for symmetric groups. We also prove that the matrix formed by the αψ, Gz is partially triangular, and that their positivity and unimodality properties are stable under inclusions of Levi subgroups.