Hall-Littlewood polynomials and vector bundles on the Hilbert scheme

Abstract

Let E be the bundle defined by applying a polynomial representation of GLn to the tautological bundle on the Hilbert scheme of n points in the complex plane. By a result of Haiman, the Cech cohomology groups Hi(E) vanish for all i>0. It follows that the equivariant Euler characteristic with respect to the standard two-dimensional torus action has nonnegative coefficients in the torus variables z1,z2, because they count the dimensions of the weight spaces of H0(E). We derive a very explicit asymmetric formula for this Euler characteristic which has this property, by expanding known contour integral formulas for the Euler characteristic stemming from the quiver description in z2, and calculating the coefficients using Jing's Hall-Littlewood vertex operator with parameter z1.