论文信息 - A natural framing of knots

A natural framing of knots

Given a knot K in the 3{sphere, consider a singular disk bounded by K and the intersections of K with the interior of the disk. The absolute number of intersections, minimised over all choices of singular disk with a given algebraic number of intersections, denes the framing function of the knot. We show that the framing function is symmetric except at a nite number of points. The symmetry axis is a new knot invariant, called the natural framing of the knot. We calculate the natural framing of torus knots and some other knots, and discuss some of its properties and its relations to the signature and other well-known knot invariants.

B. Wiest | M. T. Greene

[1] K. Murasugi. Jones polynomials and classical conjectures in knot theory. II , 1987, Mathematical Proceedings of the Cambridge Philosophical Society.

[2] H. Whitney. The singularities of a smooth n-manifold in (2n-1)-space , 1944 .

[3] E. Pannwitz. Eine elementargeometrische Eigenschaft von Verschlingungen und Knoten , 1933 .

[4] Frank Quinn,et al. Problems in low-dimensional topology , 1997 .

[5] Edited Rob Kirby,et al. Problems in Low-Dimensional Topology , 1995 .

[6] C. Giller. A family of links and the conway calculus , 1982 .

[7] R. Litherland. Signatures of iterated torus knots , 1979 .

[8] J. Conway. An enumeration of knots and links, and some of their algebraic properties , 1970 .

[9] Jean-Pierre Bourguignon,et al. Mathematische Annalen , 1893 .