L10n89

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Link Presentations

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Planar diagram presentation	X₆₁₇₂ X_10,3,11,4 X_7,14,8,15 X_20,15,17,16 X_18,11,19,12 X_12,17,13,18 X_16,19,5,20 X_13,8,14,9 X₂₅₃₆ X_4,9,1,10
Gauss code	{1, -9, 2, -10}, {6, -5, 7, -4}, {9, -1, -3, 8, 10, -2, 5, -6, -8, 3, 4, -7}

A Braid Representative	{{{braid_table}}}
A Morse Link Presentation

Polynomial invariants

Multivariable Alexander Polynomial (in [math]\displaystyle{ u }[/math], [math]\displaystyle{ v }[/math], [math]\displaystyle{ w }[/math], ...)	[math]\displaystyle{ \frac{(t(3)-1) \left(t(1) t(3)^2+t(2) t(3)^2-t(3)^2-t(1) t(3)+2 t(1) t(2) t(3)-t(2) t(3)+2 t(3)+t(1)-t(1) t(2)+t(2)\right)}{\sqrt{t(1)} \sqrt{t(2)} t(3)^{3/2}} }[/math] (db)
Jones polynomial	[math]\displaystyle{ 2 q^{-10} -4 q^{-9} +7 q^{-8} -8 q^{-7} +9 q^{-6} -7 q^{-5} +7 q^{-4} -3 q^{-3} + q^{-2} }[/math] (db)
Signature	-4 (db)
HOMFLY-PT polynomial	[math]\displaystyle{ a^{10} z^{-2} +2 a^{10}-5 z^2 a^8-2 a^8 z^{-2} -8 a^8+3 z^4 a^6+8 z^2 a^6+a^6 z^{-2} +6 a^6+z^4 a^4+z^2 a^4 }[/math] (db)
Kauffman polynomial	[math]\displaystyle{ 3 a^{12} z^4-5 a^{12} z^2+2 a^{12}+a^{11} z^7+a^{11} z^5-2 a^{11} z^3+a^{10} z^8+2 a^{10} z^6-3 a^{10} z^4+a^{10} z^{-2} -2 a^{10}+5 a^9 z^7-3 a^9 z^5-8 a^9 z^3+8 a^9 z-2 a^9 z^{-1} +a^8 z^8+8 a^8 z^6-18 a^8 z^4+16 a^8 z^2+2 a^8 z^{-2} -9 a^8+4 a^7 z^7-a^7 z^5-8 a^7 z^3+8 a^7 z-2 a^7 z^{-1} +6 a^6 z^6-11 a^6 z^4+10 a^6 z^2+a^6 z^{-2} -6 a^6+3 a^5 z^5-2 a^5 z^3+a^4 z^4-a^4 z^2 }[/math] (db)

Khovanov Homology

The coefficients of the monomials [math]\displaystyle{ t^rq^j }[/math] are shown, along with their alternating sums [math]\displaystyle{ \chi }[/math] (fixed [math]\displaystyle{ j }[/math], alternation over [math]\displaystyle{ r }[/math]).

\		r
	\
j		\

-8

-7

-6

-5

-4

-3

-2

-1

0

χ

-3

1

-5

3

1

-2

-7

4

-9

3

0

-11

6

4

2

-13

4

5

1

-15

3

4

-1

-17

1

4

3

-19

1

3

-2

-21

2

Integral Khovanov Homology

(db, data source)

[math]\displaystyle{ \dim{\mathcal G}_{2r+i}\operatorname{KH}^r_{\mathbb Z} }[/math]	[math]\displaystyle{ i=-5 }[/math]	[math]\displaystyle{ i=-3 }[/math]
[math]\displaystyle{ r=-8 }[/math]	[math]\displaystyle{ {\mathbb Z}^{2} }[/math]	[math]\displaystyle{ {\mathbb Z} }[/math]
[math]\displaystyle{ r=-7 }[/math]	[math]\displaystyle{ {\mathbb Z}^{3}\oplus{\mathbb Z}_2 }[/math]	[math]\displaystyle{ {\mathbb Z} }[/math]
[math]\displaystyle{ r=-6 }[/math]	[math]\displaystyle{ {\mathbb Z}^{4}\oplus{\mathbb Z}_2^{3} }[/math]	[math]\displaystyle{ {\mathbb Z}^{3} }[/math]
[math]\displaystyle{ r=-5 }[/math]	[math]\displaystyle{ {\mathbb Z}^{4}\oplus{\mathbb Z}_2^{4} }[/math]	[math]\displaystyle{ {\mathbb Z}^{4} }[/math]
[math]\displaystyle{ r=-4 }[/math]	[math]\displaystyle{ {\mathbb Z}^{5}\oplus{\mathbb Z}_2^{4} }[/math]	[math]\displaystyle{ {\mathbb Z}^{6} }[/math]
[math]\displaystyle{ r=-3 }[/math]	[math]\displaystyle{ {\mathbb Z}^{4}\oplus{\mathbb Z}_2^{3} }[/math]	[math]\displaystyle{ {\mathbb Z}^{3} }[/math]
[math]\displaystyle{ r=-2 }[/math]	[math]\displaystyle{ {\mathbb Z}^{3}\oplus{\mathbb Z}_2^{4} }[/math]	[math]\displaystyle{ {\mathbb Z}^{4} }[/math]
[math]\displaystyle{ r=-1 }[/math]	[math]\displaystyle{ {\mathbb Z}_2^{3} }[/math]	[math]\displaystyle{ {\mathbb Z}^{3} }[/math]
[math]\displaystyle{ r=0 }[/math]	[math]\displaystyle{ {\mathbb Z} }[/math]	[math]\displaystyle{ {\mathbb Z} }[/math]

Computer Talk

Much of the above data can be recomputed by Mathematica using the package KnotTheory`. See A Sample KnotTheory` Session.

Modifying This Page

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