Invariants from Braid Theory: Difference between revisions

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The ``braid length`` of a knot or a link <math>K</math> is the smallest number of crossings in a braid whose closure is <math>K</math>. <code>KnotTheory`</code> has some braid lengths preloaded:
The ''braid length'' of a knot or a link <math>K</math> is the smallest number of crossings in a braid whose closure is <math>K</math>. <code>KnotTheory`</code> has some braid lengths preloaded:


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The ``braid index`` of a knot or a link <math>K</math> is the smallest number of strands in a braid whose closure is <math>K</math>. <code>KnotTheory`</code> has some braid indices preloaded:
The ''braid index'' of a knot or a link <math>K</math> is the smallest number of strands in a braid whose closure is <math>K</math>. <code>KnotTheory`</code> has some braid indices preloaded:


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Revision as of 21:03, 24 August 2005


The braid length of a knot or a link is the smallest number of crossings in a braid whose closure is . KnotTheory` has some braid lengths preloaded:

(For In[1] see Setup)

In[2]:= ?BraidLength

BraidLength[K] returns the braid length of the knot K, if known to KnotTheory`.

Note that the braid length of is simply the length of the minimum braid representing (see Braid Representatives):

In[3]:=

K = Knot[9, 49]; {BraidLength[K], Crossings[BR[K]]}

Out[3]=
{11, 11}

The braid index of a knot or a link is the smallest number of strands in a braid whose closure is . KnotTheory` has some braid indices preloaded:

In[4]:= ?BraidIndex

BraidIndex[K] returns the braid index of the knot K, if known to KnotTheory`.

In[5]:= BraidIndex::about

The braid index data known to KnotTheory` is taken from Charles Livingston's "Table of Knot Invariants", http://www.indiana.edu/~knotinfo/.

Of the 250 knots with up to 10 crossings, only 10_136 has braid index smaller than the width of its minimum braid:

In[6]:=

K = Knot[10, 136]; {BraidIndex[K], First@BR[K]}

Out[6]=
{4, 5}
In[7]:=

Show[BraidPlot[BR[K]]]

Invariants from Braid Theory Out 7.gif
Out[7]= -Graphics-