Slicing knots in definite 4-manifolds

Abstract

We study the CP2-slicing number of knots, i.e. the smallest m≥ 0 such that a knot K⊂eq S3 bounds a properly embedded, null-homologous disk in a punctured connected sum (\#mCP2)×. We give a lower bound on the smooth CP2-slicing number of a knot in terms of its double branched cover, and we find knots with arbitrarily large but finite smooth CP2-slicing number. We also give an upper bound on the topological CP2-slicing number in terms of the Seifert form and find knots for which the smooth and topological CP2-slicing numbers are both finite, nonzero, and distinct.

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