Notes from a family of smooth G-Hilbert schemes
Abstract
Let G = Z/rZ be the cyclic group of order r, and let = e2π i / r denote a primitive r th root of unity. Consider the action of G on Cn via the embedding : G GLn(C), (1) = diag\!( , …, s,\, -1, …, -1n - s ), where 0 < s < n . Denote the corresponding GIT quotient by Xs,n,r = Spec((C[z1,…,zn])G). Then the varieties Xs,n,r is a cyclic quotient singularity of type 1r(1,…,1s, -1,…,-1n-s). We show that the associated G-Hilbert schemes Ys,n,r are smooth, connected, and irreducible. The natural morphism s,n,r:Ys,n,rs,n,r is a projective resolution of Xs,n,r, discrepant for n 3. We establish that the irreducible components of the central fiber s,n,r-1(0) are in bijection with the nontrivial characters of \(G\), thereby realizing the classical McKay correspondence in this family of examples. Finally, we describe a canonical choice of this bijection via the Fourier--Mukai type functor : Db(CohG(Cn)) Db(Coh(Ys,n,r)), by showing that, for each nontrivial irreducible representation of G, the corresponding skyscraper sheaf is mapped to a complex whose 0th cohomology is supported on a unique irreducible component of the central fiber s,n,r-1(0).
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