Brocard's problem

2013-08-04T02:17:13Z

24.87.60.131: Added link to avoid confusion.

In [[knot theory]], each [[link (knot theory)|link]] and [[knot (mathematics)|knot]] can have an assigned '''knot thickness'''. Each realization of a link or knot has a thickness assigned to it. The thickness τ of a link allows us to introduce a scale with respect to which we can then define the [[ropelength]] of a link.

==Definition==
There exist several possible definitions of thickness that coincide for smooth enough curves.

=== Global radius of curvature ===
The thickness is defined using the simpler concept of the local thickness τ(''x''). The local thickness at a point ''x'' on the link is defined as
:<math> \tau(x)=\inf r(x,y,z),\, </math>
where ''x'', ''y'', and ''z'' are points on the link, all distinct, and ''r''(''x'', ''y'', ''z'') is the radius of the circle that passes through all three points (''x'', ''y'', ''z''). From this definition we can deduce that the local thickness is at most equal to the local radius of curvature.

The thickness of a link is defined as
:<math>\tau(L) = \inf \tau(x).</math><ref>[http://lcvmwww.epfl.ch/~lcvm/articles/43/info.html O. Gonzalez, J.H. Maddocks, "Global Curvature, Thickness and the Ideal Shapes of Knots", Proc. National Academy of Sciences of the USA 96 (1999) 4769-4773]</ref>

=== Injectivity radius ===
This definition ensures that a [[normal tube]] to the link with radius equal to τ(''L'') will not self intersect, and so we arrive at a "real world" knot made out of a thick string.<ref>[http://george.math.stthomas.edu/rawdon/Preprints/thickness.pdf Thickness of knots]
R. A. Litherland, J. Simon, O. Durumeric, and E. Rawdon
Topology Appl., 91(3): 233-244, 1999.]</ref>

==References==
<references/>

{{DEFAULTSORT:Knot Thickness}}
[[Category:Knot theory]]

{{knottheory-stub}}

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