Infinite Intersections of open subschemes and the Hilbert scheme of points
Abstract
We study infinite intersections of open subschemes and the corresponding intersection of Hilbert schemes. If \Ui\ is the collection of open subschemes of a variety X containing a fixed point P, then we show that the Hilbert functor of flat and finite families on the spectrum of the local ring of P is given by the intersection of Hi, where Hi is the Hilbert functor of flat and finite families on Ui. In particular we show that the Hilbert functor of flat and finite families on the spectrum of the local ring of P is representable by a scheme.
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