Curvature and characteristic numbers of hyperkähler manifolds

(with Nigel Hitchin)

Abstract

We express characteristic numbers of compact hyperkähler manifolds in graph-theoretical form, considering them as a special case of the curvature invariants introduced by Rozansky and Witten. The appropriate graphs are generated by ``wheels'' and we use the recently proved Wheeling Theorem to give a formula for the L2 norm of the curvature of an irreducible hyperkähler manifold in terms of the volume and Pontryagin numbers. The formula involves the multiplicative sequence which is the square root of the A-hat polynomial.

Appears in Volume 106 (2001) No. 3 of Duke Mathematical Journal. Available as math.DG/9908114 from the e-Print archive.

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