Enriques diagrams, arbitrarily near points, and Hilbert schemes

Author(s)

Kleiman, Steven L.; Piene, Ragni; Tyomkin, Ilya

Abstract

Given a smooth family F/Y of geometrically irreducible surfaces, we study sequences of arbitrarily near T-points of F/Y; they generalize the traditional sequences of infinitely near points of a single smooth surface. We distinguish a special sort of these new sequences, the strict sequences. To each strict sequence, we associate an ordered unweighted Enriques diagram. We prove that the various sequences with a fixed diagram form a functor, and we represent it by a smooth Y-scheme. We equip this Y-scheme with a free action of the automorphism group of the diagram. We equip the diagram with weights, take the subgroup of those automorphisms preserving the weights, and form the corresponding quotient scheme. Our main theorem constructs a canonical universally injective map from this quotient scheme to the Hilbert scheme of F/Y; further, this map is an embedding in characteristic 0. However, in every positive characteristic, we give an example, in Appendix B, where the map is purely inseparable.

Date issued

2011-09

URI

http://hdl.handle.net/1721.1/71149

Department

Massachusetts Institute of Technology. Department of Mathematics

Journal

Rendiconti Lincei. Matematica e Applicazioni

Publisher

European Mathematical Society

Citation

Kleiman, Steven, Ragni Piene, and Ilya Tyomkin. “Enriques Diagrams, Arbitrarily Near Points, and Hilbert Schemes.” Rendiconti Lincei - Matematica e Applicazioni 22.4 (2011): 411–451. Web.

Version: Author's final manuscript

ISSN

1120-6330

1720-0768