12a

0498

(K12a

0498

)

A knot diagram

Linearized knot diagam

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

Solving Sequence

6,10

5 11 12 9 4 1 8 3 2 7

, c

Ideals for irreducible components

of X

par

= hu

103

− u

102

+ ··· + 2u − 1i

* 1 irreducible components of dim

= 0, with total 103 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

103

− u

102

+ · · · + 2u − 1i

(i) Arc colorings















+ u





−u

+ u





+ u





−u

− u

+ 1

−u

− 2u





+ 4u

+ 7u

+ 4u

− 3u

− 6u

− 2u

+ u

+ 5u

+ 12u

+ 15u

+ 9u

− u

− 4u

− 2u

+ u





+ 2u

+ u

−u

− 3u

− 4u

− u

+ u





+ 7u

+ ··· − 2u

+ 1

−u

− 8u

+ ··· − 4u

+ u





−u

− 20u

+ ··· − 20u

− 8u

+ 21u

+ ··· − 2u

+ u





+ 12u

+ ··· + 20u

+ 8u

+ 13u

+ ··· − 2u

+ u



(ii) Obstruction class = −1

(iii) Cusp Shapes = 4u

101

− 4u

100

+ ··· + 8u − 10

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

103

+ 49u

102

+ ··· + 2u

+ 1

, c

103

− u

102

+ ··· − 2u

+ 1

103

+ u

102

+ ··· + 1790u + 193

, c

103

− u

102

+ ··· − 25u + 2

, c

103

+ u

102

+ ··· + 2u + 1

103

− 3u

102

+ ··· − 1595u + 264

103

− 13u

102

+ ··· − 20u + 1

103

+ 55u

102

+ ··· + 2u

− 1

103

+ 11u

102

+ ··· + 34220u + 1889

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

103

+ 11y

102

+ ··· − 4y −1

, c

103

− 49y

102

+ ··· − 2y

− 1

103

− 17y

102

+ ··· + 4028596y −37249

, c

103

− 81y

102

+ ··· + 933y −4

, c

103

+ 55y

102

+ ··· + 2y

− 1

103

+ 27y

102

+ ··· + 634249y −69696

103

− y

102

+ ··· − 180y −1

103

− 13y

102

+ ··· + 4y −1

103

+ 31y

102

+ ··· − 195909780y −3568321

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.320002 + 0.958821I

−2.49900 − 2.30744I 0

u = 0.320002 − 0.958821I

−2.49900 + 2.30744I 0

u = 0.534967 + 0.830815I

3.38408 + 4.66858I 0

u = 0.534967 − 0.830815I

3.38408 − 4.66858I 0

u = 0.441175 + 0.910998I

−3.42985 + 4.70264I 0

u = 0.441175 − 0.910998I

−3.42985 − 4.70264I 0

u = 0.541474 + 0.859884I

2.20908 + 6.71950I 0

u = 0.541474 − 0.859884I

2.20908 − 6.71950I 0

u = −0.087684 + 1.013270I

−1.99452 − 2.80437I 0

u = −0.087684 − 1.013270I

−1.99452 + 2.80437I 0

u = −0.523217 + 0.872636I

−2.24888 − 4.14811I 0

u = −0.523217 − 0.872636I

−2.24888 + 4.14811I 0

u = 0.045722 + 1.023600I

−6.06661 − 0.02451I 0

u = 0.045722 − 1.023600I

−6.06661 + 0.02451I 0

u = −0.547125 + 0.867720I

−0.03965 − 11.69240I 0

u = −0.547125 − 0.867720I

−0.03965 + 11.69240I 0

u = −0.533856 + 0.809048I

2.26374 + 0.02287I 0

u = −0.533856 − 0.809048I

2.26374 − 0.02287I 0

u = 0.087532 + 1.037130I

−4.34488 + 7.57420I 0

u = 0.087532 − 1.037130I

−4.34488 − 7.57420I 0

u = −0.381785 + 0.832663I

−0.30974 − 1.63761I −2.00000 + 4.14879I

u = −0.381785 − 0.832663I

−0.30974 + 1.63761I −2.00000 − 4.14879I

u = −0.141462 + 0.904392I

−0.78760 − 1.61551I −4.77158 + 5.03318I

u = −0.141462 − 0.904392I

−0.78760 + 1.61551I −4.77158 − 5.03318I

u = −0.536452 + 0.718227I

2.52300 − 4.35721I 2.56802 + 6.19679I

u = −0.536452 − 0.718227I

2.52300 + 4.35721I 2.56802 − 6.19679I

u = 0.535239 + 0.691052I

3.78238 − 0.33262I 5.03269 + 0.16609I

u = 0.535239 − 0.691052I

3.78238 + 0.33262I 5.03269 − 0.16609I

u = 0.547689 + 0.647135I

2.80904 − 2.32969I 3.45285 + 0.74524I

u = 0.547689 − 0.647135I

2.80904 + 2.32969I 3.45285 − 0.74524I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.559868 + 0.635760I

0.61339 + 7.25494I −0.02996 − 4.75396I

u = −0.559868 − 0.635760I

0.61339 − 7.25494I −0.02996 + 4.75396I

u = 0.809540 + 0.143509I

−3.50008 − 12.18120I −3.85836 + 8.38881I

u = 0.809540 − 0.143509I

−3.50008 + 12.18120I −3.85836 − 8.38881I

u = 0.445875 + 1.093170I

−2.45934 − 2.02600I 0

u = 0.445875 − 1.093170I

−2.45934 + 2.02600I 0

u = −0.803251 + 0.142576I

−1.14708 + 7.17209I −0.67329 − 4.76301I

u = −0.803251 − 0.142576I

−1.14708 − 7.17209I −0.67329 + 4.76301I

u = 0.804809 + 0.129898I

−5.67192 − 4.37319I −7.09504 + 2.73875I

u = 0.804809 − 0.129898I

−5.67192 + 4.37319I −7.09504 − 2.73875I

u = −0.797909 + 0.089556I

−6.79166 + 4.06327I −8.41458 − 3.83338I

u = −0.797909 − 0.089556I

−6.79166 − 4.06327I −8.41458 + 3.83338I

u = −0.517494 + 0.613373I

−1.53027 − 0.11065I −3.24306 + 0.89379I

u = −0.517494 − 0.613373I

−1.53027 + 0.11065I −3.24306 − 0.89379I

u = −0.794335 + 0.064613I

−5.68131 − 3.71782I −6.83433 + 3.40780I

u = −0.794335 − 0.064613I

−5.68131 + 3.71782I −6.83433 − 3.40780I

u = −0.459511 + 1.112040I

−0.58125 − 2.76277I 0

u = −0.459511 − 1.112040I

−0.58125 + 2.76277I 0

u = −0.781132 + 0.146005I

0.37432 + 5.13241I 0.93560 − 5.60814I

u = −0.781132 − 0.146005I

0.37432 − 5.13241I 0.93560 + 5.60814I

u = 0.780054 + 0.075837I

−3.06587 − 0.76136I −3.45076 + 0.45885I

u = 0.780054 − 0.075837I

−3.06587 + 0.76136I −3.45076 − 0.45885I

u = 0.760196 + 0.147480I

−0.480238 − 0.466709I −0.489197 − 0.458195I

u = 0.760196 − 0.147480I

−0.480238 + 0.466709I −0.489197 + 0.458195I

u = −0.482703 + 1.131700I

−0.31489 − 4.81582I 0

u = −0.482703 − 1.131700I

−0.31489 + 4.81582I 0

u = 0.492426 + 1.138620I

−1.91052 + 9.61857I 0

u = 0.492426 − 1.138620I

−1.91052 − 9.61857I 0

u = 0.385750 + 1.179600I

−4.33059 + 3.34041I 0

u = 0.385750 − 1.179600I

−4.33059 − 3.34041I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.451490 + 1.158040I

−4.91669 + 4.10196I 0

u = 0.451490 − 1.158040I

−4.91669 − 4.10196I 0

u = −0.378666 + 1.194090I

−3.58733 + 1.25660I 0

u = −0.378666 − 1.194090I

−3.58733 − 1.25660I 0

u = −0.376464 + 1.209810I

−5.20506 + 3.20479I 0

u = −0.376464 − 1.209810I

−5.20506 − 3.20479I 0

u = 0.374856 + 1.213940I

−7.59081 − 8.19597I 0

u = 0.374856 − 1.213940I

−7.59081 + 8.19597I 0

u = 0.384326 + 1.212720I

−9.69391 − 0.34298I 0

u = 0.384326 − 1.212720I

−9.69391 + 0.34298I 0

u = 0.416060 + 1.204580I

−6.81980 + 3.40849I 0

u = 0.416060 − 1.204580I

−6.81980 − 3.40849I 0

u = −0.408104 + 1.212180I

−10.65190 − 0.10842I 0

u = −0.408104 − 1.212180I

−10.65190 + 0.10842I 0

u = 0.505040 + 1.178370I

−3.48508 + 5.17017I 0

u = 0.505040 − 1.178370I

−3.48508 − 5.17017I 0

u = −0.420660 + 1.211380I

−9.45073 − 7.96797I 0

u = −0.420660 − 1.211380I

−9.45073 + 7.96797I 0

u = −0.509259 + 1.184590I

−2.66866 − 9.90267I 0

u = −0.509259 − 1.184590I

−2.66866 + 9.90267I 0

u = 0.484969 + 1.194950I

−6.32937 + 5.38147I 0

u = 0.484969 − 1.194950I

−6.32937 − 5.38147I 0

u = −0.481638 + 1.201620I

−9.01650 − 0.91732I 0

u = −0.481638 − 1.201620I

−9.01650 + 0.91732I 0

u = −0.492114 + 1.200160I

−10.05500 − 8.77175I 0

u = −0.492114 − 1.200160I

−10.05500 + 8.77175I 0

u = −0.513000 + 1.192750I

−4.24234 − 12.01220I 0

u = −0.513000 − 1.192750I

−4.24234 + 12.01220I 0

u = 0.508768 + 1.195870I

−8.81383 + 9.19354I 0

u = 0.508768 − 1.195870I

−8.81383 − 9.19354I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.514711 + 1.194780I

−6.6041 + 17.0451I 0

u = 0.514711 − 1.194780I

−6.6041 − 17.0451I 0

u = 0.661537 + 0.209917I

0.75840 − 5.17774I 0.84738 + 5.82465I

u = 0.661537 − 0.209917I

0.75840 + 5.17774I 0.84738 − 5.82465I

u = 0.573521 + 0.343141I

−0.33434 + 6.07580I −0.41612 − 5.54107I

u = 0.573521 − 0.343141I

−0.33434 − 6.07580I −0.41612 + 5.54107I

u = 0.663359

−1.74433 −5.00130

u = −0.620334 + 0.222321I

2.29486 + 0.50156I 4.19126 − 0.10094I

u = −0.620334 − 0.222321I

2.29486 − 0.50156I 4.19126 + 0.10094I

u = −0.562085 + 0.303335I

1.76281 − 1.30056I 3.34163 + 1.25432I

u = −0.562085 − 0.303335I

1.76281 + 1.30056I 3.34163 − 1.25432I

u = 0.470704 + 0.402661I

−2.11819 − 0.97237I −3.63398 + 0.68742I

u = 0.470704 − 0.402661I

−2.11819 + 0.97237I −3.63398 − 0.68742I

II. u-Polynomials

Crossings u-Polynomials at each crossing

103

+ 49u

102

+ ··· + 2u

+ 1

, c

103

− u

102

+ ··· − 2u

+ 1

103

+ u

102

+ ··· + 1790u + 193

, c

103

− u

102

+ ··· − 25u + 2

, c

103

+ u

102

+ ··· + 2u + 1

103

− 3u

102

+ ··· − 1595u + 264

103

− 13u

102

+ ··· − 20u + 1

103

+ 55u

102

+ ··· + 2u

− 1

103

+ 11u

102

+ ··· + 34220u + 1889

III. Riley Polynomials

Crossings Riley Polynomials at each crossing

103

+ 11y

102

+ ··· − 4y −1

, c

103

− 49y

102

+ ··· − 2y

− 1

103

− 17y

102

+ ··· + 4028596y −37249

, c

103

− 81y

102

+ ··· + 933y −4

, c

103

+ 55y

102

+ ··· + 2y

− 1

103

+ 27y

102

+ ··· + 634249y −69696

103

− y

102

+ ··· − 180y −1

103

− 13y

102

+ ··· + 4y −1

103

+ 31y

102

+ ··· − 195909780y −3568321