Whitehead link | |
---|---|
Braid length | 5 |
Braid no. | 3 |
Crossing no. | 5 |
Hyperbolic volume | 3.663862377 |
Linking no. | 0 |
Unknotting no. | 1 |
Conway notation | [212] |
A–B notation | 52 1 |
Thistlethwaite | L5a1 |
Last / Next | L4a1 / L6a1 |
Other | |
alternating |
In knot theory, the Whitehead link, named for J. H. C. Whitehead, is one of the most basic links. It can be drawn as an alternating link with five crossings, from the overlay of a circle and a figure-eight shaped loop.
Structure
A common way of describing this knot is formed by overlaying a figure-eight shaped loop with another circular loop surrounding the crossing of the figure-eight. The above-below relation between these two unknots is then set as an alternating link, with the consecutive crossings on each loop alternating between under and over. This drawing has five crossings, one of which is the self-crossing of the figure-eight curve, which does not count towards the linking number. Because the remaining crossings have equal numbers of under and over crossings on each loop, its linking number is 0. It is not isotopic to the unlink, but it is link homotopic to the unlink.
Although this construction of the knot treats its two loops differently from each other, the two loops are topologically symmetric: it is possible to deform the same link into a drawing of the same type in which the loop that was drawn as a figure eight is circular and vice versa.[2] Alternatively, there exist realizations of this knot in three dimensions in which the two loops can be taken to each other by a geometric symmetry of the realization.[1]
In braid theory notation, the link is written
Its Jones polynomial is
This polynomial and are the two factors of the Jones polynomial of the L10a140 link. Notably, is the Jones polynomial for the mirror image of a link having Jones polynomial .
Volume
The hyperbolic volume of the complement of the Whitehead link is 4 times Catalan's constant, approximately 3.66. The Whitehead link complement is one of two two-cusped hyperbolic manifolds with the minimum possible volume, the other being the complement of the pretzel link with parameters (−2, 3, 8).[3]
Dehn filling on one component of the Whitehead link can produce the sibling manifold of the complement of the figure-eight knot, and Dehn filling on both components can produce the Weeks manifold, respectively one of the minimum-volume hyperbolic manifolds with one cusp and the minimum-volume hyperbolic manifold with no cusps.
History
The Whitehead link is named for J. H. C. Whitehead, who spent much of the 1930s looking for a proof of the Poincaré conjecture. In 1934, he used the link as part of his construction of the now-named Whitehead manifold, which refuted his previous purported proof of the conjecture.[4]
See also
References
- 1 2 Skopenkov, A. (2020), "Fig. 22: Isotopy of the Whitehead link", A user's guide to basic knot and link theory, p. 17, arXiv:2001.01472v1
- ↑ Cundy, H. Martyn; Rollett, A.P. (1961), Mathematical models (2nd ed.), Oxford: Clarendon Press, p. 59, MR 0124167
- ↑ Agol, Ian (2010), "The minimal volume orientable hyperbolic 2-cusped 3-manifolds", Proceedings of the American Mathematical Society, 138 (10): 3723–3732, arXiv:0804.0043, doi:10.1090/S0002-9939-10-10364-5, MR 2661571
- ↑ Gordon, C. McA. (1999), "3-dimensional topology up to 1960" (PDF), in James, I. M. (ed.), History of Topology, Amsterdam: North-Holland, pp. 449–489, doi:10.1016/B978-044482375-5/50016-X, MR 1674921; see p. 480