The Chow ring of punctual Hilbert schemes of toric surfaces
Abstract
Let X be a smooth projective toric surface, and Hd(X) the Hilbert scheme parametrising the length d zero-dimensional subschemes of X. We compute the rational Chow ring A*(Hd(X))\Q. More precisely, if T is the two-dimensional torus contained in X, we compute the rational equivariant Chow ring A\T*(Hd(X))\Q and the usual Chow ring is an explicit quotient of the equivariant Chow ring. The case of some quasi-projective toric surfaces such as the affine plane are described by our method too.
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