Punctual Hilbert schemes for Kleinian singularities as quiver varieties

Abstract

For a finite subgroup ⊂ SL(2,C) and n≥ 1, we construct the (reduced scheme underlying the) Hilbert scheme of n points on the Kleinian singularity C2/ as a Nakajima quiver variety for the framed McKay quiver of , taken at a specific non-generic stability parameter. We deduce that this Hilbert scheme is irreducible (a result previously due to Zheng), normal, and admits a unique symplectic resolution. More generally, we introduce a class of algebras obtained from the preprojective algebra of the framed McKay quiver by a process called cornering, and we show that fine moduli spaces of cyclic modules over these new algebras are isomorphic to quiver varieties for the framed McKay quiver and certain non-generic choices of stability parameter.