Addendum to “Groups of ribbon knots”

@article{Ng2003AddendumT,
  title={Addendum to “Groups of ribbon knots”},
  author={K. Ng},
  journal={Topology},
  year={2003},
  volume={44},
  pages={261-262}
}
  • K. Ng
  • Published 6 October 2003
  • Mathematics
  • Topology
Abstract The inductive step that was described in the proof of Theorem 3.2 of Ng (Topology 37(2) (1998) 441) is clarified. 
1 Citations
BIBLIOGRAPHY OF VASSILIEV INVARIANTS
1. List of Additions 2 2. Electronic Addresses 5 3. Acknowledgement 12 4. References 12 4.1. References beginning with A 12 4.2. References beginning with B 13 4.3. References beginning with C 15

References

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Groups of ribbon knots
We prove that for each positive integer n, the Vn-equivalence classes of ribbon knot types form a subgroup Rn, of index two, of the free abelian group Vn constructed by the author and Stanford. As a
A Correction to "Groups of Ribbon Knots" by Ka Yi Ng
This paper was withdrawn by the author. The appearance of an author-written addendum [3] to the paper [2] made our correction note [1] to that paper superfluous and hence it is no longer available
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We give a construction of Gusarov's groups [Gscr ] n of knots based on pure braid commutators, and show that any element of [Gscr ] n is represented by an infinite number of prime alternating knots
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Kayi.Ng@WallStreetSystems.com
  • Kayi.Ng@WallStreetSystems.com