The A2 Invariant: Difference between revisions
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{{HelpLine| |
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n = |
n = 2 | |
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in = <nowiki>A2Invariant</nowiki> | |
in = <nowiki>A2Invariant</nowiki> | |
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out= <nowiki>A2Invariant[L][q] computes the A2 (sl(3)) invariant of a knot or link L as a function of the variable q.</nowiki>}} |
out= <nowiki>A2Invariant[L][q] computes the A2 (sl(3)) invariant of a knot or link L as a function of the variable q.</nowiki>}} |
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{{InOut| |
{{InOut| |
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n = |
n = 3 | |
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in = <nowiki>Jones[Knot[10, 22]][q] == Jones[Knot[10, 35]][q]</nowiki> | |
in = <nowiki>Jones[Knot[10, 22]][q] == Jones[Knot[10, 35]][q]</nowiki> | |
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out= <nowiki>True</nowiki>}} |
out= <nowiki>True</nowiki>}} |
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{{InOut| |
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n = |
n = 4 | |
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in = <nowiki>A2Invariant[Knot[10, 22]][q]</nowiki> | |
in = <nowiki>A2Invariant[Knot[10, 22]][q]</nowiki> | |
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out= <nowiki> -12 -8 -6 -4 2 4 6 8 10 12 14 |
out= <nowiki> -12 -8 -6 -4 2 4 6 8 10 12 14 |
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{{InOut| |
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n = |
n = 5 | |
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in = <nowiki>A2Invariant[Knot[10, 35]][q]</nowiki> | |
in = <nowiki>A2Invariant[Knot[10, 35]][q]</nowiki> | |
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out= <nowiki> -14 -12 -10 -8 2 2 2 6 8 10 14 16 |
out= <nowiki> -14 -12 -10 -8 2 2 2 6 8 10 14 16 |
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{{In| |
{{In| |
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n = |
n = 6 | |
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in = <nowiki>all = Join[AllKnots[], AllLinks[]];</nowiki>}} |
in = <nowiki>all = Join[AllKnots[], AllLinks[]];</nowiki>}} |
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{{InOut| |
{{InOut| |
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n = |
n = 7 | |
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in = <nowiki>Length /@ {Union[A2Invariant[#][q]& /@ all], all}</nowiki> | |
in = <nowiki>Length /@ {Union[A2Invariant[#][q]& /@ all], all}</nowiki> | |
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out= <nowiki>{2163, 2226}</nowiki>}} |
out= <nowiki>{2163, 2226}</nowiki>}} |
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Latest revision as of 18:22, 21 February 2013
We compute the (or quantum ) invariant using the normalization and formulas of [Khovanov], which in itself follows [Kuperberg]:
(For In[1] see Setup)
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As an example, let us check that the knots 10_22 and 10_35 have the same Jones polynomial but different invariants:
In[3]:=
|
Jones[Knot[10, 22]][q] == Jones[Knot[10, 35]][q]
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Out[3]=
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True
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In[4]:=
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A2Invariant[Knot[10, 22]][q]
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Out[4]=
|
-12 -8 -6 -4 2 4 6 8 10 12 14
-1 + q + q + q - q + -- - q - 2 q + q - q + q + q +
2
q
18
q
|
In[5]:=
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A2Invariant[Knot[10, 35]][q]
|
Out[5]=
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-14 -12 -10 -8 2 2 2 6 8 10 14 16
q + q - q + q - -- + -- + q - q + q - 2 q + q - q +
4 2
q q
18 20
q + q
|
The invariant attains 2163 values on the 2226 knots and links known to KnotTheory:
In[6]:=
|
all = Join[AllKnots[], AllLinks[]];
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In[7]:=
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Length /@ {Union[A2Invariant[#][q]& /@ all], all}
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Out[7]=
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{2163, 2226}
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[Khovanov] ^ M. Khovanov, link homology I, arXiv:math.QA/0304375.
[Kuperberg] ^ G. Kuperberg, Spiders for rank 2 Lie algebras, Comm. Math. Phys. 180 (1996) 109-151, arXiv:q-alg/9712003.
