GT Vol 5 (2001) Paper 21 (Abstract)

Geometry & Topology, Vol. 5 (2001) Paper no. 21, pages 651--682.

On iterated torus knots and transversal knots

William W Menasco

Abstract. A knot type is exchange reducible if an arbitrary closed n-braid representative can be changed to a closed braid of minimum braid index by a finite sequence of braid isotopies, exchange moves and +/- destabilizations. In the manuscript [J Birman and NC Wrinkle, On transversally simple knots, preprint (1999)] a transversal knot in the standard contact structure for S^3 is defined to be transversally simple if it is characterized up to transversal isotopy by its topological knot type and its self-linking number. Theorem 2 of Birman and Wrinkle [op cit] establishes that exchange reducibility implies transversally simplicity. The main result in this note, establishes that iterated torus knots are exchange reducible. It then follows as a Corollary that iterated torus knots are transversally simple.

Keywords. Contact structures, braids, torus knots, cabling, exchange reducibility

AMS subject classification. Primary: 57M27, 57N16, 57R17. Secondary: 37F20.

DOI: 10.2140/gt.2001.5.651

E-print: arXiv:math.GT/0002110

Submitted to GT on 27 March 2001. (Revised 17 July 2001.) Paper accepted 15 August 2001. Paper published 15 August 2001.

PostScript file (1069 KB)
Compressed PostScript file (292 KB)
PDF file with embedded fonts (359 KB)
PDF file without embedded fonts (298 KB)
Reprint cover (44 KB PS file)

Notes on file formats

William W Menasco
University at Buffalo, Buffalo, New York 14214, USA
Email: menasco@tait.math.buffalo.edu
URL: http://www.math.buffalo.edu/~menasco
GT home page

Outdated Archival Version

These pages are not updated anymore. They reflect the state of 21 Apr 2006. For the current production of this journal, please refer to http://msp.warwick.ac.uk/.