Pathologies on the Hilbert scheme of points

Published 20 Dec 2018 in math.AG and math.AC | (1812.08531v2)

Abstract: We prove that the Hilbert scheme of points on a higher dimensional affine space is non-reduced and has components lying entirely in characteristic p for all primes p. In fact, we show that Vakil's Murphy's Law holds up to retraction for this scheme. Our main tool is a generalized version of the Bialynicki-Birula decomposition.

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Authors (1)

Joachim Jelisiejew

Pathologies on the Hilbert scheme of points

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