Your search keyword '"Writhe"' showing total 9 results

1. On invariants of multiplexed virtual links.

Author

Wada, Kodai

Subjects

*INTEGERS, *KNOT theory

Abstract

For a virtual knot K and an integer r with r ≥ 2 , we introduce a method of constructing an r -component virtual link L (K ; r) , which we call the r -multiplexing of K. Every invariant of L (K ; r) is an invariant of K. We give a way of calculating three kinds of invariants of L (K ; r) using invariants of K. As an application of our method, we also show that Manturov's virtual n -colorings for K can be interpreted as certain classical n -colorings for L (K ; 2). [ABSTRACT FROM AUTHOR]

Published

2024

2. Writhe-like invariants of alternating links.

Author

Diao, Yuanan and Pham, Van

Subjects

*CHARTS, diagrams, etc., *KNOT theory, *POLYNOMIALS

Abstract

It is known that the writhe calculated from any reduced alternating link diagram of the same (alternating) link has the same value. That is, it is a link invariant if we restrict ourselves to reduced alternating link diagrams. This is due to the fact that reduced alternating link diagrams of the same link are obtainable from each other via flypes and flypes do not change writhe. In this paper, we introduce several quantities that are derived from Seifert graphs of reduced alternating link diagrams. We prove that they are "writhe-like" invariants, namely they are not general link invariants, but are invariants when restricted to reduced alternating link diagrams. The determination of these invariants are elementary and non-recursive so they are easy to calculate. We demonstrate that many different alternating links can be easily distinguished by these new invariants, even for large, complicated knots for which other invariants such as the Jones polynomial are hard to compute. As an application, we also derive an if and only if condition for a strongly invertible rational link. [ABSTRACT FROM AUTHOR]

Published

2021

3. On torus knots and unknots.

Author

Oberti, Chiara and Ricca, Renzo L.

Subjects

*TORUS, *KNOT theory, *GEOMETRIC analysis, *TOPOLOGY, *MATHEMATICAL symmetry

Abstract

A comprehensive study of geometric and topological properties of torus knots and unknots is presented. Torus knots/unknots are particularly symmetric, closed, space curves, that wrap the surface of a mathematical torus a number of times in the longitudinal and meridian direction. By using a standard parametrization, new results on local and global properties are found. In particular, we demonstrate the existence of inflection points for a given critical aspect ratio, determine the location and prescribe the regularization condition to remove the local singularity associated with torsion. Since to first approximation total length grows linearly with the number of coils, its nondimensional counterpart is proportional to the topological crossing number of the knot type. We analyze several global geometric quantities, such as total curvature, writhing number, total torsion, and geometric 'energies' given by total squared curvature and torsion, in relation to knot complexity measured by the winding number. We conclude with a brief presentation of research topics, where geometric and topological information on torus knots/unknots finds useful application. [ABSTRACT FROM AUTHOR]

Published

2016

4. AN AFFINE INDEX POLYNOMIAL INVARIANT OF VIRTUAL KNOTS.

Author

KAUFFMAN, LOUIS H.

Subjects

*KNOT theory, *POLYNOMIALS, *INVARIANTS (Mathematics), *DATA analysis, *GEOMETRIC topology, *LOW-dimensional topology

Abstract

This paper describes a polynomial invariant of virtual knots that is defined in terms of an integer labeling of the virtual knot diagram. This labeling is seen to derive from an essentially unique structure of affine flat biquandle for flat virtual diagrams. The invariant is discussed in detail with many examples, including its relation to previous invariants of this type and we show how to construct Vassiliev invariants from the same data. [ABSTRACT FROM AUTHOR]

Published

2013

5. MINIMAL UNKNOTTING SEQUENCES OF REIDEMEISTER MOVES CONTAINING UNMATCHED RII MOVES.

Author

HAYASHI, CHUICHIRO, HAYASHI, MIWA, SAWADA, MINORI, and YAMADA, SAYAKA

Subjects

*KNOT theory, *MATHEMATICAL sequences, *REIDEMEISTER moves, *INVARIANTS (Mathematics), *CURVES, *ESTIMATION theory, *MATHEMATICAL analysis, *CHARTS, diagrams, etc.

Abstract

Arnold introduced invariants J+, J- and St for generic planar curves. It is known that both J+/2 + St and J-/2 + St are invariants for generic spherical curves. Applying these invariants to underlying curves of knot diagrams, we can obtain lower bounds for the number of Reidemeister moves required for unknotting. J- /2 + St works well to count the minimum number of unmatched RII moves. However, it works only up to a factor of two for RI moves. Let w denote the writhe for a knot diagram. We show that J-/2 + St ± w/2 also gives sharp counts for the number of required RI moves, and demonstrate that it gives a precise estimate for a certain family of diagrams of the unknot with the underlying curve r = 2 + cos(nθ/(n + 1)), (0 ≤ θ ≤ 2(n + 1)π). [ABSTRACT FROM AUTHOR]

Published

2012

6. CONFORMAL INVARIANCE OF THE WRITHE OF A KNOT.

Author

LANGEVIN, R. and O'HARA, J.

Subjects

*BRAID theory, *NUMBER theory, *ALGEBRA, *KNOT theory, *GEOMETRY

Abstract

We give a new proof of the conformal invariance of the writhe of a knot from a conformal geometric vewpoint. [ABSTRACT FROM AUTHOR]

Published

2010

7. THE WRITHE OF ORIENTED POLYGONAL GRAPHS.

Author

LAING, CHRISTIAN and SUMNERS, DE WITT

Subjects

*GRAPHIC methods, *ARITHMETIC mean, *POLYGONS, *SPHERES, *SOLID geometry

Abstract

Given an edge-oriented polygonal graph in ℝ3, we describe a method for computing the writhe as the average of weighted directional writhe numbers of the graph in a few directions. These directions are determined by the graph and the weights are determined by areas of path-connected open regions on the unit sphere. Within each open region, the directional writhe is constant. We obtain a closed formula which extends the formula for the writhe of a polygon in ℝ3, including the important special case of writhe of embedded open arcs. [ABSTRACT FROM AUTHOR]

Published

2008

8. FIBER QUADRISECANTS IN KNOT ISOTOPIES.

Author

FIEDLER, T. and KURLIN, V.

Subjects

*KNOT theory, *LOW-dimensional topology, *ISOTOPIES (Topology), *LINEAR systems, *INVARIANTS (Mathematics)

Abstract

Fix a straight line L in Euclidean 3-space and consider the fibration of the complement of L by half-planes. A generic knot K in the complement of L has neither fiber quadrisecants nor fiber extreme secants such that K touches the corresponding half-plane at 2 points. Both types of secants occur in generic isotopies of knots. We give lower bounds for the number of these fiber secants in all isotopies connecting given isotopic knots. The bounds are expressed in terms of invariants calculable in linear time with respect to the number of crossings. [ABSTRACT FROM AUTHOR]

Published

2008

9. On some symplectic aspects of knot framings

Author

Alberto Besana and Mauro Spera

Subjects

Algebra and Number Theory, Settore MAT/03 - GEOMETRIA, Quantum invariant, Mathematical analysis, Skein relation, Framing of knots, Mathematics::Geometric Topology, Knot theory, Chern-Simons action, Knot (unit), Knot invariant, symplectic geometry, Mathematics::Symplectic Geometry, Framing of knots, symplectic geometry, Chern-Simons action, Settore MAT/07 - FISICA MATEMATICA, Symplectic manifold, Trefoil knot, Writhe, Mathematical physics, Mathematics

Abstract

The present article delves into some symplectic features arising in basic knot theory. An interpretation of the writhing number of a knot (with reference to a plane projection thereof) is provided in terms of a phase function analogous to those encountered in geometrical optics, its variation upon switching a crossing being akin to the passage through a caustic, yielding a knot theoretical analogue of Maslov's theory, via classical fluidodynamical helicity. The Maslov cycle is given by knots having exactly one double point, among those having a fixed plane shadow and lying on a semi-cone issued therefrom, which turn out to build up a Lagrangian submanifold of Brylinski's symplectic manifold of (mildly) singular knots. A Morse family (generating function) for this submanifold is determined and can be taken to be the Abelian Chern–Simons action plus a source term (knot insertion) appearing in the Jones–Witten theory. The relevance of the Bohr–Sommerfeld conditions arising in geometric quantization are investigated and a relationship with the Gauss linking number integral formula is also established, together with a novel derivation of the so-called Feynman–Onsager quantization condition. Furthermore, an additional Chern–Simons interpretation of the writhe of a braid is discussed and interpreted symplectically, also making contact with the Goldin–Menikoff–Sharp approach to vortices and anyons. Finally, a geometrical setting for the ground state wave functions arising in the theory of the Fractional Quantum Hall Effect is established.

Published

2006