Local Knots, +-Sharp Knots, and Rational Slice Genus

Abstract

Hom and Wu introduced the knot concordance invariant + for knots in S3 and proved that it gives a lower bound for the slice genus. Wu and Yang extended + to knots in rational homology 3-spheres, where it gives a lower bound for the rational slice genus, an analogue of the slice genus for knots in rational homology 3-spheres. We call a knot +-sharp if this bound is realized as an equality. An open question asks whether a local knot in a 3-manifold Y, that is, a knot contained in a 3-ball, can bound a surface of smaller genus in Y× I than in S3× I. Using the Heegaard Floer invariant +, we show that this does not occur for local knots arising from +-sharp knots: if K⊂ S3 is +-sharp and Y is a rational homology 3-sphere, then the induced local knot in Y has rational slice genus equal to the slice genus of K. The proof proceeds by establishing an additivity result for the rational slice genus.

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