Extended McKay correspondence for quotient surface singularities
Abstract
Let G be a finite subgroup of GL(2) acting on A2\0\ freely. The G-orbit Hilbert scheme G-Hilb(A2) is a minimal resolution of the quotient A2/G. We determine the generator sheaf of the ideal defining the universal G-cluster over G-Hilb(A2), which somewhat strengthens the well-known McKay correspondence for a finite subgroup of SL(2). We also study the quiver structure of G-Hilb(A2) at every G-cluster OZy=OA2/Iy in terms of a collection of sort of minimal G-submodules of OZy (called mono-special OA2-submodules) and generating G-submodules of Iy.
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