An algebro-geometric realization of the cohomology ring of Hilbert scheme of points in the affine plane
Abstract
We show that the cohomology ring of Hilbert scheme of n-points in the affine plane is isomorphic to the coordinate ring of Gm-fixed point scheme of the n-th symmetric product of C2 for a natural Gm-action on it. This result can be seen as an analogue of a theorem of DeConcini, Procesi and Tanisaki on a description of the cohomology ring of Springer fiber of type A.
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