From representations of the rational Cherednik algebra to parabolic Hilbert schemes via the Dunkl-Opdam subalgebra

Abstract

In this note we explicitly construct an action of the rational Cherednik algebra H1,m/n(Sn,Cn) corresponding to the permutation representation of Sn on the C*-equivariant homology of parabolic Hilbert schemes of points on the plane curve singularity \xm = yn\ for coprime m and n. We use this to construct actions of quantized Gieseker algebras on parabolic Hilbert schemes on the same plane curve singularity, and actions of the Cherednik algebra at t = 0 on the equivariant homology of parabolic Hilbert schemes on the non-reduced curve \yn = 0\. Our main tool is the study of the combinatorial representation theory of the rational Cherednik algebra via the subalgebra generated by Dunkl-Opdam elements.