Slice knots which bound punctured

@inproceedings{Ray2013SliceKW,
  title={Slice knots which bound punctured},
  author={Arunima Ray},
  year={2013}
}
We investigate the properties of knots in S which bound punctured Klein bottles, such that a pushoff of the knot has zero linking number with the knot, ie has zero framing. This is motivated by the many results in the literature regarding slice knots of genus one, for example, the existence of homologically essential zero self-linking simple closed curves on genus one Seifert surfaces for algebraically slice knots. Given a knot K bounding a punctured Klein bottle F with zero framing, we show… CONTINUE READING

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