On sequences of compound braids – Some properties and problems

A. G. Schaake, W. J. Rogers and J. C. Turner
Notes on Number Theory and Discrete Mathematics, ISSN 1310–5132
Volume 2, 1996, Number 3, Pages 23–32
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Authors and affiliations

A. G. Schaake
University of Waikato, Hamilton, New Zealand

W. J. Rogers
University of Waikato, Hamilton, New Zealand

J. C. Turner
University of Waikato, Hamilton, New Zealand

References

  1. Schaake, A.G. and Turner, J.C. The Regular Knot Tree and Enlargement Processes. Pamphlet No. 4, Department of Mathematics and Statistics, University of Waikato, N.Z. (July, 1991) 38 pp.
  2. Schaake, A.G. and Turner, J.C. The Braiding of Column-Coded Regular Knots Pamphlet No. 7, Department of Mathematics and Statistics, University of Waikato, N.Z. (March, 1992) 37 pp.
  3. Schaake A.G., Hall T. and Turner J.C. Special Braid Forms – Pt. I Pamphlet No. 10. Rams Skull Press, 12 Fairyland Road Kuranda, Qld. 4872, Australia: 100 pp.
  4. Schoenberg, I.J. Mathematical Time Exposures The Mathematical Association of America, (19S2).
  5. Turner, J.C. “Three Number Trees – Their Growth Rules and Related Number Properties.” Applications of Fibonacci Numbers, Volume 3. Kluwer Ac. Pub. (1990): pp. 335-350.

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Cite this paper

Schaake, A. G., Rogers, W. J. & Turner, J. C. (1996). On sequences of compound braids – Some properties and problems. Notes on Number Theory and Discrete Mathematics, 2(3), 23-32.

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