GKM spaces, and the signed positivity of the nabla operator

Abstract

We show that the Frobenius character of the equivariant Borel-Moore homology of a certain positive GLn-version of the unramified affine Springer fiber Zk studied by Goreski, Kottwitz and MacPherson is computed by the matrix coefficients of the ∇k-operator, which acts diagonally in the modified Macdonald basis. We do this by relating the combinatorial formula for the ∇k-operator we obtained in an earlier paper to the GKM paving of Zk, and we give an algebraic presentation of the above homology as an explicit submodule of the Kostant-Kumar nil Hecke algebra. We then study a certain open locus Uk ⊂ Zk, and reduce a long-standing conjecture of Bergeron, Garsia, Haiman and Tesler, which predicts the sign of the coefficients of the Schur expansion of ∇k, to a vanishing conjecture about the homology groups of Uk. The latter conjecture is in turn reduced to a vanishing conjecture for certain open loci of the regular semisimple Hessenberg varieties which are indexed by partial Dyck paths.

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