12a

0601

(K12a

0601

)

A knot diagram

Linearized knot diagam

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

Solving Sequence

5,10

11 4 12 6 1 9 3 2 8 7

, c

Ideals for irreducible components

of X

par

= hu

+ u

+ ··· + 4u + 1i

* 1 irreducible components of dim

= 0, with total 63 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

+ · · · + 4u + 1i

(i) Arc colorings















+ u





+ 1

+ 2u





−u

− 2u

− u

−u

− 3u

− 2u

+ u





−u

− u

+ 1

+ 2u





+ 3u

+ u

− 2u

+ 1

−u

− 4u





+ 8u

+ 24u

+ 30u

+ 7u

− 10u

+ 4u

+ 6u

− 3u

+ 2u

−u

− 9u

− 32u

− 55u

− 43u

− 9u

− 4u

+ u





−u

− 15u

+ ··· + u

+ 1

+ 16u

+ ··· − 2u

+ 3u





−u

− 9u

+ ··· − u

+ 1

−u

− 10u

+ ··· + 2u

− u





−u

− 16u

+ ··· + 3u

− 2u

−u

− 17u

+ ··· − u

+ u



(ii) Obstruction class = −1

(iii) Cusp Shapes = −4u

− 4u

+ ··· − 40u − 18

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

+ 15u

+ ··· + 16u

− 1

, c

+ u

+ ··· + 2u

+ 1

+ u

+ ··· + 11678u + 2941

, c

+ u

+ ··· + 4u + 1

− u

+ ··· + 394u + 65

, c

− 9u

+ ··· + 16u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ 67y

+ ··· + 32y −1

, c

+ 15y

+ ··· + 16y

− 1

+ 27y

+ ··· − 133314016y −8649481

, c

+ 59y

+ ··· − 16y

− 1

+ 23y

+ ··· − 226184y −4225

, c

+ 55y

+ ··· + 208y −1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.026966 + 1.106350I

5.72389 + 2.98502I 0

u = 0.026966 − 1.106350I

5.72389 − 2.98502I 0

u = −0.687201 + 0.412506I

9.24727 + 10.49800I −3.51356 − 8.27768I

u = −0.687201 − 0.412506I

9.24727 − 10.49800I −3.51356 + 8.27768I

u = 0.683558 + 0.418042I

9.63540 − 4.12275I −2.71858 + 3.42597I

u = 0.683558 − 0.418042I

9.63540 + 4.12275I −2.71858 − 3.42597I

u = 0.594200 + 0.519837I

10.03370 − 0.13330I −1.68361 + 2.69330I

u = 0.594200 − 0.519837I

10.03370 + 0.13330I −1.68361 − 2.69330I

u = −0.587406 + 0.526285I

9.69166 − 6.24596I −2.31699 + 2.22181I

u = −0.587406 − 0.526285I

9.69166 + 6.24596I −2.31699 − 2.22181I

u = 0.132381 + 1.218840I

0.146145 − 0.270553I 0

u = 0.132381 − 1.218840I

0.146145 + 0.270553I 0

u = −0.657132 + 0.390763I

1.28852 + 6.79003I −7.72888 − 9.43258I

u = −0.657132 − 0.390763I

1.28852 − 6.79003I −7.72888 + 9.43258I

u = 0.636380 + 0.414397I

3.22883 − 2.96613I −2.26029 + 3.71050I

u = 0.636380 − 0.414397I

3.22883 + 2.96613I −2.26029 − 3.71050I

u = 0.588036 + 0.455040I

3.42044 − 1.03125I −1.58884 + 3.34604I

u = 0.588036 − 0.455040I

3.42044 + 1.03125I −1.58884 − 3.34604I

u = −0.546794 + 0.481840I

1.71497 − 2.81621I −6.17352 + 3.05233I

u = −0.546794 − 0.481840I

1.71497 + 2.81621I −6.17352 − 3.05233I

u = 0.187128 + 1.267970I

0.75597 − 5.28066I 0

u = 0.187128 − 1.267970I

0.75597 + 5.28066I 0

u = −0.140950 + 1.288190I

3.01462 + 2.29987I 0

u = −0.140950 − 1.288190I

3.01462 − 2.29987I 0

u = −0.588233 + 0.366746I

−0.67695 + 1.75613I −11.70628 − 3.56374I

u = −0.588233 − 0.366746I

−0.67695 − 1.75613I −11.70628 + 3.56374I

u = 0.225134 + 1.306650I

7.62130 − 8.96120I 0

u = 0.225134 − 1.306650I

7.62130 + 8.96120I 0

u = −0.219260 + 1.317800I

7.95062 + 2.83007I 0

u = −0.219260 − 1.317800I

7.95062 − 2.83007I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.042411 + 1.342580I

4.52694 + 1.80324I 0

u = −0.042411 − 1.342580I

4.52694 − 1.80324I 0

u = 0.636351 + 0.129886I

3.15162 − 5.83269I −8.95633 + 6.72916I

u = 0.636351 − 0.129886I

3.15162 + 5.83269I −8.95633 − 6.72916I

u = −0.626388 + 0.148778I

3.37667 − 0.23757I −8.27194 − 1.71639I

u = −0.626388 − 0.148778I

3.37667 + 0.23757I −8.27194 + 1.71639I

u = −0.032534 + 0.631203I

5.53486 + 3.05897I −2.47533 − 2.85146I

u = −0.032534 − 0.631203I

5.53486 − 3.05897I −2.47533 + 2.85146I

u = 0.598759 + 0.047938I

−3.27254 − 2.41607I −16.1850 + 5.7225I

u = 0.598759 − 0.047938I

−3.27254 + 2.41607I −16.1850 − 5.7225I

u = −0.00543 + 1.42179I

11.72350 + 3.15804I 0

u = −0.00543 − 1.42179I

11.72350 − 3.15804I 0

u = −0.22566 + 1.44348I

5.15010 + 4.76868I 0

u = −0.22566 − 1.44348I

5.15010 − 4.76868I 0

u = −0.19753 + 1.46126I

7.93304 − 0.09783I 0

u = −0.19753 − 1.46126I

7.93304 + 0.09783I 0

u = −0.24532 + 1.45554I

7.23183 + 10.09140I 0

u = −0.24532 − 1.45554I

7.23183 − 10.09140I 0

u = 0.23532 + 1.46098I

9.26906 − 6.15955I 0

u = 0.23532 − 1.46098I

9.26906 + 6.15955I 0

u = 0.21343 + 1.46486I

9.59495 − 3.96752I 0

u = 0.21343 − 1.46486I

9.59495 + 3.96752I 0

u = −0.25415 + 1.46773I

15.3101 + 13.9353I 0

u = −0.25415 − 1.46773I

15.3101 − 13.9353I 0

u = 0.25182 + 1.46931I

15.7234 − 7.5385I 0

u = 0.25182 − 1.46931I

15.7234 + 7.5385I 0

u = −0.19538 + 1.48477I

16.1933 − 3.4257I 0

u = −0.19538 − 1.48477I

16.1933 + 3.4257I 0

u = 0.19915 + 1.48476I

16.5161 − 2.9974I 0

u = 0.19915 − 1.48476I

16.5161 + 2.9974I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.501335

−0.970575 −9.91400

u = −0.206160 + 0.325864I

−0.414743 + 1.014940I −6.73202 − 6.39068I

u = −0.206160 − 0.325864I

−0.414743 − 1.014940I −6.73202 + 6.39068I

II. u-Polynomials

Crossings u-Polynomials at each crossing

, c

+ 15u

+ ··· + 16u

− 1

, c

+ u

+ ··· + 2u

+ 1

+ u

+ ··· + 11678u + 2941

, c

+ u

+ ··· + 4u + 1

− u

+ ··· + 394u + 65

, c

− 9u

+ ··· + 16u + 1

III. Riley Polynomials

Crossings Riley Polynomials at each crossing

, c

+ 67y

+ ··· + 32y −1

, c

+ 15y

+ ··· + 16y

− 1

+ 27y

+ ··· − 133314016y −8649481

, c

+ 59y

+ ··· − 16y

− 1

+ 23y

+ ··· − 226184y −4225

, c

+ 55y

+ ··· + 208y −1