12a

1126

(K12a

1126

)

A knot diagram

Linearized knot diagam

4 8 7 9 11 12 3 2 1 6 5 10

Solving Sequence

3,7

4 8 2 9 5 1 10 12 6 11

, c

Ideals for irreducible components

of X

par

= hu

− u

+ ··· − 2u + 1i

* 1 irreducible components of dim

= 0, with total 59 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.

I. I

= hu

− u

+ · · · − 2u + 1i

(i) Arc colorings











−u









+ 1





+ 2u

+ u





+ 5u

+ 7u

+ 2u

+ 1

+ 4u





+ 3u

+ 1

−u

− 2u

+ u





−u

− 8u

− 23u

− 28u

− 14u

− 4u

+ u

+ 7u

+ 16u

+ 11u

− 2u

+ u





+ 13u

+ ··· + 2u

+ 1

−u

− 12u

+ ··· − 8u

− 4u





+ 26u

+ ··· + 4u

+ u

−u

− 25u

+ ··· − 4u

+ u





−u

− 23u

+ ··· + 2u

+ 1

−u

− 22u

+ ··· − 8u

− 4u



(ii) Obstruction class = −1

(iii) Cusp Shapes = −4u

+ 4u

+ ··· − 12u + 2

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

− 15u

+ ··· + 16u − 1

, c

− u

+ ··· − 2u + 1

− u

+ ··· − 60u + 29

, c

− u

+ ··· + u

+ 1

+ u

+ ··· − 32u + 185

, c

− 9u

+ ··· − 312u + 17

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

− y

+ ··· − 66y −1

, c

+ 67y

+ ··· − 2y −1

− 9y

+ ··· + 8762y −841

, c

+ 55y

+ ··· − 2y −1

+ 19y

+ ··· − 707526y −34225

, c

+ 47y

+ ··· − 338y −289

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.087204 + 0.851478I

5.17243 − 4.73662I −4.00000 + 2.76071I

u = 0.087204 − 0.851478I

5.17243 + 4.73662I −4.00000 − 2.76071I

u = 0.522294 + 0.671217I

7.75645 + 10.78740I −0.55320 − 8.84457I

u = 0.522294 − 0.671217I

7.75645 − 10.78740I −0.55320 + 8.84457I

u = −0.509216 + 0.664867I

1.80756 − 7.41238I −4.27230 + 9.26004I

u = −0.509216 − 0.664867I

1.80756 + 7.41238I −4.27230 − 9.26004I

u = −0.522330 + 0.627830I

8.64971 − 0.66019I 1.00927 + 3.06229I

u = −0.522330 − 0.627830I

8.64971 + 0.66019I 1.00927 − 3.06229I

u = 0.502304 + 0.642574I

2.30495 + 3.34683I −2.71079 − 3.11364I

u = 0.502304 − 0.642574I

2.30495 − 3.34683I −2.71079 + 3.11364I

u = 0.423758 + 0.695721I

1.01542 + 5.69298I −5.32566 − 8.42870I

u = 0.423758 − 0.695721I

1.01542 − 5.69298I −5.32566 + 8.42870I

u = −0.373673 + 0.691083I

−3.05801 − 2.71446I −12.01209 + 6.09741I

u = −0.373673 − 0.691083I

−3.05801 + 2.71446I −12.01209 − 6.09741I

u = 0.301840 + 0.720122I

0.268239 − 0.062723I −7.61119 − 1.27500I

u = 0.301840 − 0.720122I

0.268239 + 0.062723I −7.61119 + 1.27500I

u = −0.085060 + 0.774106I

−0.61920 + 1.71941I −8.31003 − 3.37529I

u = −0.085060 − 0.774106I

−0.61920 − 1.71941I −8.31003 + 3.37529I

u = −0.573822 + 0.292341I

9.62917 − 3.10105I 3.62624 + 3.32555I

u = −0.573822 − 0.292341I

9.62917 + 3.10105I 3.62624 − 3.32555I

u = −0.445524 + 0.459511I

5.05128 − 1.59378I 2.60026 + 4.57588I

u = −0.445524 − 0.459511I

5.05128 + 1.59378I 2.60026 − 4.57588I

u = 0.592961 + 0.236270I

9.02899 − 6.97871I 2.70616 + 3.27231I

u = 0.592961 − 0.236270I

9.02899 + 6.97871I 2.70616 − 3.27231I

u = −0.570616 + 0.237617I

3.05307 + 3.70586I −0.77253 − 3.59782I

u = −0.570616 − 0.237617I

3.05307 − 3.70586I −0.77253 + 3.59782I

u = 0.552309 + 0.268389I

3.39541 + 0.29109I 0.41142 − 3.33717I

u = 0.552309 − 0.268389I

3.39541 − 0.29109I 0.41142 + 3.33717I

u = −0.029521 + 1.409530I

4.52945 − 5.12440I 0

u = −0.029521 − 1.409530I

4.52945 + 5.12440I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.263506 + 0.518367I

−0.175692 + 1.026690I −3.26382 − 6.43248I

u = 0.263506 − 0.518367I

−0.175692 − 1.026690I −3.26382 + 6.43248I

u = 0.01406 + 1.42792I

−1.64302 + 2.04334I 0

u = 0.01406 − 1.42792I

−1.64302 − 2.04334I 0

u = 0.490035 + 0.102215I

2.69779 − 2.53971I −0.68814 + 3.21089I

u = 0.490035 − 0.102215I

2.69779 + 2.53971I −0.68814 − 3.21089I

u = −0.08759 + 1.53351I

−1.60105 − 3.31687I 0

u = −0.08759 − 1.53351I

−1.60105 + 3.31687I 0

u = −0.423131

−1.20479 −7.49580

u = 0.07142 + 1.57608I

−7.46190 + 2.18967I 0

u = 0.07142 − 1.57608I

−7.46190 − 2.18967I 0

u = −0.15017 + 1.57667I

1.23526 − 3.11687I 0

u = −0.15017 − 1.57667I

1.23526 + 3.11687I 0

u = 0.14422 + 1.58462I

−5.21473 + 5.71673I 0

u = 0.14422 − 1.58462I

−5.21473 − 5.71673I 0

u = −0.04686 + 1.59696I

−8.59473 + 1.10722I 0

u = −0.04686 − 1.59696I

−8.59473 − 1.10722I 0

u = −0.14844 + 1.59187I

−5.81777 − 9.84244I 0

u = −0.14844 − 1.59187I

−5.81777 + 9.84244I 0

u = 0.15352 + 1.59359I

0.10974 + 13.29100I 0

u = 0.15352 − 1.59359I

0.10974 − 13.29100I 0

u = −0.10679 + 1.60050I

−10.87520 − 4.50273I 0

u = −0.10679 − 1.60050I

−10.87520 + 4.50273I 0

u = 0.08882 + 1.60302I

−7.65490 + 1.41234I 0

u = 0.08882 − 1.60302I

−7.65490 − 1.41234I 0

u = 0.12015 + 1.60190I

−6.80500 + 7.70998I 0

u = 0.12015 − 1.60190I

−6.80500 − 7.70998I 0

u = 0.03277 + 1.60858I

−3.11395 − 4.26425I 0

u = 0.03277 − 1.60858I

−3.11395 + 4.26425I 0

II. u-Polynomials

Crossings u-Polynomials at each crossing

− 15u

+ ··· + 16u − 1

, c

− u

+ ··· − 2u + 1

− u

+ ··· − 60u + 29

, c

− u

+ ··· + u

+ 1

+ u

+ ··· − 32u + 185

, c

− 9u

+ ··· − 312u + 17

III. Riley Polynomials

Crossings Riley Polynomials at each crossing

− y

+ ··· − 66y −1

, c

+ 67y

+ ··· − 2y −1

− 9y

+ ··· + 8762y −841

, c

+ 55y

+ ··· − 2y −1

+ 19y

+ ··· − 707526y −34225

, c

+ 47y

+ ··· − 338y −289