Irrational components of the Hilbert scheme of points

Gavril Farkas, Rahul Pandharipande, Alessio Sammartano

20/5/24 Published in : https://arxiv.org/abs/2405.11997

We construct irrational irreducible components of the Hilbert scheme of points of affine n-dimensional space, for n at least 12. We start with irrational components of the Hilbert scheme of curves in P^3 and use methods developed by Jelisiejew to relate these to irreducible components of the Hilbert schemes of points of A^n. The result solves Problem XX of [J. Jelisiejew, Open problems in deformations of Artinian algebras, Hilbert schemes and around, arXiv:2307.08777, 2023].

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Phase I & II research project(s)

String Theory
Geometry, Topology and Physics

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From Field Theory to Geometry and Topology

Local theory of wave equations with timelike curves of conic singularities

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