GTM Vol 7 (2004) Paper 5 (Abstract)

Geometry & Topology Monographs, Vol. 7 (2004),
Proceedings of the Casson Fest,
Paper no. 5, pages 135--144.

On the additivity of knot width

Martin Scharlemann, Abigail Thompson

Abstract. It has been conjectured that the geometric invariant of knots in 3-space called the width is nearly additive. That is, letting w(K) in N denote the width of a knot K in S^3, the conjecture is that w(K # K') = w(K) + w(K') - 2. We give an example of a knot K_1 so that for K_2 any 2-bridge knot, it appears that w(K_1 # K_2) = w(K_1), contradicting the conjecture.

Keywords. Knot, width, additivity, Haken surfaces

AMS subject classification. Primary: 11Y16, 57M50. Secondary: 57M25.

E-print: arXiv:math.GT/0403326

Submitted to GT on 19 March 2004. (Revised 28 July 2004.) Paper accepted 4 August 2004. Paper published 18 September 2004.

PostScript file (389 KB)
Compressed PostScript file (96 KB)
PDF file with embedded fonts (138 KB)
PDF file with bookmarks and links (148 KB)
Reprint cover (49 KB PS file)

Notes on file formats

Martin Scharlemann, Abigail Thompson
Mathematics Department, University of California
Santa Barbara, CA 93106, USA
and
Mathematics Department, University of California
Davis, CA 95616, USA

Email: mgscharl@math.ucsb.edu, thompson@math.ucdavis.edu

GTM 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Outdated Archival Version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/.

Geometry & Topology Monographs, Vol. 7 (2004),Proceedings of the Casson Fest, Paper no. 5, pages 135--144.

On the additivity of knot width

Martin Scharlemann, Abigail Thompson

Outdated Archival Version

Geometry & Topology Monographs, Vol. 7 (2004),
Proceedings of the Casson Fest,
Paper no. 5, pages 135--144.