L11a498

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L11a497.gif

L11a497

L11a499.gif

L11a499

Contents

L11a498.gif
(Knotscape image)
See the full Thistlethwaite Link Table (up to 11 crossings).

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Link Presentations

[edit Notes on L11a498's Link Presentations]

Planar diagram presentation X6172 X12,3,13,4 X18,13,5,14 X14,7,15,8 X10,15,11,16 X22,18,19,17 X20,10,21,9 X8,20,9,19 X16,22,17,21 X2536 X4,11,1,12
Gauss code {1, -10, 2, -11}, {8, -7, 9, -6}, {10, -1, 4, -8, 7, -5, 11, -2, 3, -4, 5, -9, 6, -3}
A Braid Representative
BraidPart1.gifBraidPart0.gifBraidPart0.gifBraidPart0.gifBraidPart0.gifBraidPart0.gifBraidPart0.gifBraidPart0.gifBraidPart0.gifBraidPart3.gifBraidPart0.gifBraidPart0.gifBraidPart0.gifBraidPart0.gifBraidPart0.gifBraidPart0.gifBraidPart0.gifBraidPart0.gif
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A Morse Link Presentation L11a498 ML.gif

Polynomial invariants

Multivariable Alexander Polynomial (in u, v, w, ...) -\frac{(t(3)-1) \left(t(2) t(3)^4+2 t(1) t(2) t(3)^3-3 t(2) t(3)^3+2 t(3)^3+4 t(1) t(3)^2-4 t(1) t(2) t(3)^2+4 t(2) t(3)^2-4 t(3)^2-3 t(1) t(3)+2 t(1) t(2) t(3)+2 t(3)+t(1)\right)}{\sqrt{t(1)} \sqrt{t(2)} t(3)^{5/2}} (db)
Jones polynomial q^4-4 q^3+10 q^2-14 q+19-20 q^{-1} +21 q^{-2} -16 q^{-3} +12 q^{-4} -7 q^{-5} +3 q^{-6} - q^{-7} (db)
Signature 0 (db)
HOMFLY-PT polynomial a^6 \left(-z^2\right)-a^6 z^{-2} -2 a^6+3 a^4 z^4+9 a^4 z^2+4 a^4 z^{-2} +10 a^4-2 a^2 z^6-8 a^2 z^4+z^4 a^{-2} -15 a^2 z^2-5 a^2 z^{-2} +z^2 a^{-2} -13 a^2+ a^{-2} -z^6-z^4+2 z^2+2 z^{-2} +4 (db)
Kauffman polynomial a^4 z^{10}+a^2 z^{10}+3 a^5 z^9+9 a^3 z^9+6 a z^9+3 a^6 z^8+12 a^4 z^8+22 a^2 z^8+13 z^8+a^7 z^7-3 a^5 z^7-8 a^3 z^7+10 a z^7+14 z^7 a^{-1} -11 a^6 z^6-49 a^4 z^6-66 a^2 z^6+10 z^6 a^{-2} -18 z^6-4 a^7 z^5-17 a^5 z^5-39 a^3 z^5-48 a z^5-18 z^5 a^{-1} +4 z^5 a^{-3} +14 a^6 z^4+60 a^4 z^4+66 a^2 z^4-10 z^4 a^{-2} +z^4 a^{-4} +9 z^4+6 a^7 z^3+34 a^5 z^3+66 a^3 z^3+44 a z^3+6 z^3 a^{-1} -8 a^6 z^2-35 a^4 z^2-43 a^2 z^2+6 z^2 a^{-2} -10 z^2-4 a^7 z-21 a^5 z-39 a^3 z-22 a z+3 a^6+16 a^4+21 a^2-2 a^{-2} +7+a^7 z^{-1} +5 a^5 z^{-1} +9 a^3 z^{-1} +5 a z^{-1} -a^6 z^{-2} -4 a^4 z^{-2} -5 a^2 z^{-2} -2 z^{-2} (db)

Khovanov Homology

The coefficients of the monomials t^rq^j are shown, along with their alternating sums \chi (fixed j, alternation over r).   
\ r
  \  
j \
-7-6-5-4-3-2-101234χ
9           11
7          41-3
5         6  6
3        84  -4
1       116   5
-1      1110    -1
-3     109     1
-5    611      5
-7   610       -4
-9  27        5
-11 15         -4
-13 2          2
-151           -1
Integral Khovanov Homology

(db, data source)

  
\dim{\mathcal G}_{2r+i}\operatorname{KH}^r_{\mathbb Z} i=-1 i=1
r=-7 {\mathbb Z}
r=-6 {\mathbb Z}^{2}\oplus{\mathbb Z}_2 {\mathbb Z}
r=-5 {\mathbb Z}^{5}\oplus{\mathbb Z}_2^{2} {\mathbb Z}^{2}
r=-4 {\mathbb Z}^{7}\oplus{\mathbb Z}_2^{5} {\mathbb Z}^{6}
r=-3 {\mathbb Z}^{10}\oplus{\mathbb Z}_2^{6} {\mathbb Z}^{6}
r=-2 {\mathbb Z}^{11}\oplus{\mathbb Z}_2^{10} {\mathbb Z}^{10}
r=-1 {\mathbb Z}^{9}\oplus{\mathbb Z}_2^{11} {\mathbb Z}^{11}
r=0 {\mathbb Z}^{10}\oplus{\mathbb Z}_2^{9} {\mathbb Z}^{11}
r=1 {\mathbb Z}^{6}\oplus{\mathbb Z}_2^{8} {\mathbb Z}^{8}
r=2 {\mathbb Z}^{4}\oplus{\mathbb Z}_2^{6} {\mathbb Z}^{6}
r=3 {\mathbb Z}_2^{4} {\mathbb Z}^{4}
r=4 {\mathbb Z} {\mathbb Z}

Computer Talk

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

Modifying This Page

Read me first: Modifying Knot Pages

See/edit the Link Page master template (intermediate).

See/edit the Link_Splice_Base (expert).

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L11a497.gif

L11a497

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L11a499