A short proof of the Göttsche conjecture

Publication date

2011

Authors

Kool, M.ISNI 0000000426948932
Shende, Vivek
Thomas, Richard

Editors

Advisors

Supervisors

Document Type

Article
Open Access logo

License

Abstract

We prove that for a sufficiently ample line bundle L on a surface S , the number of δ –nodal curves in a general δ –dimensional linear system is given by a universal polynomial of degree δ in the four numbers L 2 , L . K S , K 2 S and c 2 ( S ) . The technique is a study of Hilbert schemes of points on curves on a surface, using the BPS calculus of Pandharipande and the third author [J. Amer. Math. Soc. 23 (2010) 267–297] and the computation of tautological integrals on Hilbert schemes by Ellingsrud, Göttsche and Lehn [J. Algebraic Geom. 10 (2001) 81–100]. We are also able to weaken the ampleness required, from Göttsche’s ( 5 δ − 1 ) –very ample to δ –very ample.

Keywords

Citation

Kool, M, Shende, V & Thomas, R 2011, 'A short proof of the Göttsche conjecture', Geometry and Topology, vol. 15, no. 1, pp. 397–406. https://doi.org/10.2140/gt.2011.15.397