On the Chern numbers of the generalised Kummer varieties

Abstract

Let A[[n]] denote the 2(n - 1)-dimensional generalised Kummer variety constructed from the abelian surface A. Further, let X be an arbitrary smooth projective surface with ∫X c1(X)2 ≠ 0, and X[k] the Hilbert scheme of zero-dimensional subschemes of X of length k. We give a formula which expresses the value of any complex genus on A[[n]] in terms of Chern numbers of the varieties X[k]. It is shown by Ellingsrud and Stroemme how to use Bott's residue formula to effectively calculate the Chern numbers of the Hilbert schemes (2)[k] of points on the projective plane. Since ∫2 c1(2)2 = 9 ≠ 0 we can use these numbers and our formula to calculate the Chern numbers of the generalised Kummer varieties. A table with all Chern numbers of the generalised Kummer varieties A[[n]] for n ≤ 8 is included.

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