A short proof of the G\"ottsche conjecture

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 L2,\,L.KS,\,KS2 and c2(S). The technique is a study of Hilbert schemes of points on curves on a surface, using the BPS calculus of [PT3] and the computation of tautological integrals on Hilbert schemes by Ellingsrud, G\"ottsche and Lehn. We are also able to weaken the ampleness required, from G\"ottsche's (5δ-1)-very ample to δ-very ample.