Naming and Enumeration: Difference between revisions

From Knot Atlas
Jump to navigationJump to search
No edit summary
No edit summary
Line 41: Line 41:


<tt>Out[5]=</tt> <math>-2 t+5-\frac{2}{t}</math>
<tt>Out[5]=</tt> <math>-2 t+5-\frac{2}{t}</math>
<!--END-->

We can also check that the Borromean rings, [[L6a4]] in the Thistlethwaite table, is a 3-component link:

<!--$$Length[Skeleton[Link[6, Alternating, 4]]]$$-->
<!--END-->

<!--$$?AllKnots$$-->
<!--END-->

<!--$$?AllLinks$$-->
<!--END-->

Thus at the moment there are 802 knots and 1424 links known to <code>KnotTheory`</code>:

<!--$$Length /@ {AllKnots[], AllLinks[]}$$-->
<!--END-->
<!--END-->



Revision as of 15:07, 23 August 2005

KnotTheory` comes loaded with some knot tables; currently, the Rolfsen table of prime knots with up to 10 crossings [Rolfsen], the Hoste-Thistlethwaite tables of prime knots with up to 16 crossings and the Thistlethwaite table of prime links with up to 11 crossings (see Further Knot Theory Software#Knotscape):

(For In[1] see Setup)

In[2]:= ?Knot

Knot[n, k] denotes the kth knot with n crossings in the Rolfsen table. Knot[11, Alternating, k] denotes the kth alternating 11-crossing knot in the Hoste-Thistlethwaite table. Knot[11, NonAlternating, k] denotes the kth non alternating 11-crossing knot in the Hoste-Thistlethwaite table.

In[3]:= ?Link

Link[n, Alternating, k] denotes the kth alternating n-crossing link in the Thistlethwaite table. Link[n, NonAlternating, k] denotes the kth non alternating n-crossing link in the Thistlethwaite table.

Thus, for example, let us verify that the knots 6_1 and 9_46 have the same Alexander polynomial:

In[4]:= Alexander[Knot[6, 1]][t]

Out[4]=


In[5]:= Alexander[Knot[9, 46]][t]

Out[5]=

We can also check that the Borromean rings, L6a4 in the Thistlethwaite table, is a 3-component link:



Thus at the moment there are 802 knots and 1424 links known to KnotTheory`:


References

[Rolfsen] ^  D. Rolfsen, Knots and Links, Publish or Perish, Mathematics Lecture Series 7, Wilmington 1976.