(K9a

)

A knot diagram

Linearized knot diagam

4 5 7 8 3 9 2 1 6

Solving Sequence

6,9

1,4

2 3 5 8

, c

Ideals for irreducible components

of X

par

= h216472320u

− 196425840u

+ ··· + 2595371149b − 196454684,

− 230172u

− 27804388u

+ ··· + 370767307a − 679741065, u

− u

+ ··· + 3u + 1i

* 1 irreducible components of dim

= 0, with total 29 representations.

The image of knot diagram is generated by the software “Draw programme” developed by An-

drew Bartholomew(http://www.layer8.co.uk/maths/draw/index.htm#Running-draw), where we modi-

ﬁed some parts for our purpose(https://github.com/CATsTAILs/LinksPainter).

All coeﬃcients of polynomials are rational numbers. But the coeﬃcients are sometimes approximated

in decimal forms when there is not enough margin.

= h2.16 × 10

− 1.96 × 10

+ · · · + 2.60 × 10

b − 1.96 × 10

, −2.30 ×

− 2.78 × 10

+ · · · + 3.71 × 10

a − 6.80 × 10

, u

− u

+ · · · + 3u + 1i

(i) Arc colorings











−u









0.000620799u

+ 0.0749915u

+ ··· − 3.83846u + 1.83334

−0.0834071u

+ 0.0756831u

+ ··· − 2.93896u + 0.0756943





−0.00281892u

− 0.833272u

+ ··· − 4.55210u − 0.116626

0.833292u

− 0.836091u

+ ··· − 3.22782u − 0.836111





−0.00528313u

+ 0.821590u

+ ··· − 0.672045u + 1.83325

−0.0166708u

+ 0.0163909u

+ ··· − 0.722782u + 0.816389





0.00446172u

+ 0.730031u

+ ··· − 2.03460u + 2.48337

0.0666831u

− 0.0655635u

+ ··· − 1.10887u + 0.734444





+ u





+ u



(ii) Obstruction class = −1

(iii) Cusp Shapes = −

8357107928

2595371149

6279939276

2595371149

+ ··· +

20588201632

2595371149

u +

13962231674

2595371149

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

− 5u

+ ··· + u − 1

, c

+ u

+ ··· + 5u − 1

− u

+ ··· − u − 19

+ u

+ ··· + 21u − 11

, c

+ u

+ ··· + 3u − 1

+ 3u

+ ··· + u + 1

+ 11u

+ ··· + 3u − 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

+ 3y

+ ··· − 5y −1

, c

− 21y

+ ··· − 5y −1

+ 15y

+ ··· + 1103y −361

+ 31y

+ ··· − 1869y −121

, c

+ 11y

+ ··· + 3y −1

− 5y

+ ··· + 3y −1

+ 15y

+ ··· + 175y −1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.647818 + 0.782212I

a = 1.174800 + 0.131909I

b = 1.35368 − 1.53216I

4.48635 + 0.55125I 10.94303 − 0.19758I

u = 0.647818 − 0.782212I

a = 1.174800 − 0.131909I

b = 1.35368 + 1.53216I

4.48635 − 0.55125I 10.94303 + 0.19758I

u = −0.559219 + 0.861588I

a = −2.56606 + 1.18824I

b = −2.19707 + 1.46012I

1.99105 − 2.23064I −15.0558 − 8.8774I

u = −0.559219 − 0.861588I

a = −2.56606 − 1.18824I

b = −2.19707 − 1.46012I

1.99105 + 2.23064I −15.0558 + 8.8774I

u = 0.099472 + 1.040710I

a = −0.040185 − 0.557055I

b = −0.559691 + 0.371807I

−3.62029 − 0.98610I −3.43918 + 1.15236I

u = 0.099472 − 1.040710I

a = −0.040185 + 0.557055I

b = −0.559691 − 0.371807I

−3.62029 + 0.98610I −3.43918 − 1.15236I

u = 0.923879 + 0.554080I

a = −1.061880 + 0.915307I

b = 0.170095 + 1.380090I

5.89129 − 7.10658I 7.40494 + 4.09137I

u = 0.923879 − 0.554080I

a = −1.061880 − 0.915307I

b = 0.170095 − 1.380090I

5.89129 + 7.10658I 7.40494 − 4.09137I

u = 0.644129 + 0.902940I

a = −1.03409 + 1.43901I

b = 0.565379 + 1.269170I

4.11625 + 4.48763I 9.60010 − 6.67821I

u = 0.644129 − 0.902940I

a = −1.03409 − 1.43901I

b = 0.565379 − 1.269170I

4.11625 − 4.48763I 9.60010 + 6.67821I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.528836 + 0.980105I

a = −0.540279 − 0.869458I

b = −0.347922 − 1.350220I

−0.15788 − 2.80514I 1.82209 + 1.85203I

u = −0.528836 − 0.980105I

a = −0.540279 + 0.869458I

b = −0.347922 + 1.350220I

−0.15788 + 2.80514I 1.82209 − 1.85203I

u = −1.034250 + 0.485851I

a = −0.549331 − 0.039451I

b = −0.348963 − 0.675392I

5.14963 − 1.80223I 13.69706 + 3.37820I

u = −1.034250 − 0.485851I

a = −0.549331 + 0.039451I

b = −0.348963 + 0.675392I

5.14963 + 1.80223I 13.69706 − 3.37820I

u = 0.641135 + 0.564919I

a = 1.42824 − 0.88660I

b = −0.129556 − 1.400390I

0.91572 − 2.15286I 5.11617 + 3.69479I

u = 0.641135 − 0.564919I

a = 1.42824 + 0.88660I

b = −0.129556 + 1.400390I

0.91572 + 2.15286I 5.11617 − 3.69479I

u = −0.447738 + 0.689000I

a = 1.79794 − 0.28016I

b = 1.170450 + 0.106145I

0.78940 − 1.37762I 5.11267 + 4.75149I

u = −0.447738 − 0.689000I

a = 1.79794 + 0.28016I

b = 1.170450 − 0.106145I

0.78940 + 1.37762I 5.11267 − 4.75149I

u = 0.618739 + 1.016340I

a = −1.74109 + 0.57301I

b = −1.33104 + 1.93207I

−0.38505 + 7.12556I 2.65443 − 8.10425I

u = 0.618739 − 1.016340I

a = −1.74109 − 0.57301I

b = −1.33104 − 1.93207I

−0.38505 − 7.12556I 2.65443 + 8.10425I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.111222 + 1.267020I

a = −0.303660 + 0.158824I

b = 0.107002 − 0.499750I

−1.26594 − 5.18635I 1.49328 + 7.03100I

u = −0.111222 − 1.267020I

a = −0.303660 − 0.158824I

b = 0.107002 + 0.499750I

−1.26594 + 5.18635I 1.49328 − 7.03100I

u = 0.708050 + 1.105240I

a = 1.56079 − 0.79326I

b = 1.27636 − 1.94848I

4.19521 + 13.09990I 5.01719 − 8.12211I

u = 0.708050 − 1.105240I

a = 1.56079 + 0.79326I

b = 1.27636 + 1.94848I

4.19521 − 13.09990I 5.01719 + 8.12211I

u = −0.770179 + 1.141350I

a = 0.718662 + 0.419411I

b = 0.461012 + 0.914365I

3.17430 − 4.69569I 8.95566 + 8.13169I

u = −0.770179 − 1.141350I

a = 0.718662 − 0.419411I

b = 0.461012 − 0.914365I

3.17430 + 4.69569I 8.95566 − 8.13169I

u = −0.195750 + 0.569252I

a = 1.95836 − 0.88135I

b = 0.778642 − 0.497191I

0.70687 − 1.36069I 4.42210 + 4.47976I

u = −0.195750 − 0.569252I

a = 1.95836 + 0.88135I

b = 0.778642 + 0.497191I

0.70687 + 1.36069I 4.42210 − 4.47976I

u = −0.272051

a = 3.39557

b = 1.06327

2.30899 2.51260

II. u-Polynomials

Crossings u-Polynomials at each crossing

− 5u

+ ··· + u − 1

, c

+ u

+ ··· + 5u − 1

− u

+ ··· − u − 19

+ u

+ ··· + 21u − 11

, c

+ u

+ ··· + 3u − 1

+ 3u

+ ··· + u + 1

+ 11u

+ ··· + 3u − 1

III. Riley Polynomials

Crossings Riley Polynomials at each crossing

+ 3y

+ ··· − 5y −1

, c

− 21y

+ ··· − 5y −1

+ 15y

+ ··· + 1103y −361

+ 31y

+ ··· − 1869y −121

, c

+ 11y

+ ··· + 3y −1

− 5y

+ ··· + 3y −1

+ 15y

+ ··· + 175y −1