12a

0512

(K12a

0512

)

A knot diagram

Linearized knot diagam

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

Solving Sequence

5,11

6 12 10 1 9 4 8 3 7 2

, c

Ideals for irreducible components

of X

par

= hu

+ u

+ ··· + u

− 1i

* 1 irreducible components of dim

= 0, with total 75 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

+ · · · + u

− 1i

(i) Arc colorings











−u









+ u





+ u





−u

− u

+ u

+ 2u

+ u





−u

− u

− 3u

− 2u

− u

+ 1

+ 2u

+ 5u

+ 6u

+ 4u

+ u





+ 2u

+ 6u

+ 8u

+ 11u

+ 10u

+ 6u

+ 2u

− u

− 2u

−u

− 3u

+ ··· + u

+ u





+ 3u

+ ··· − 3u

+ 1

−u

− 4u

+ ··· + 7u

+ 2u





+ 4u

+ ··· − 4u

− 2u

+ 5u

+ ··· − 2u

+ u





−u

− 8u

+ ··· + 12u

+ 7u

+ 9u

+ ··· − u

+ u



(ii) Obstruction class = −1

(iii) Cusp Shapes = 4u

+ 4u

+ ··· + 8u + 2

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

+ 33u

+ ··· + 2u + 1

, c

− u

+ ··· + u

− 1

, c

+ u

+ ··· − 110u − 25

, c

+ u

+ ··· + u

− 1

− 3u

+ ··· − 8u + 3

− 5u

+ ··· + 21044u − 3477

, c

+ 23u

+ ··· + 2u − 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

+ 19y

+ ··· − 10y −1

, c

− 33y

+ ··· + 2y −1

, c

− 81y

+ ··· + 28950y −625

, c

+ 23y

+ ··· + 2y −1

− 5y

+ ··· + 562y −9

− 29y

+ ··· + 182318326y −12089529

, c

+ 59y

+ ··· + 22y −1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.682193 + 0.732664I

−0.302285 + 0.979820I 0

u = 0.682193 − 0.732664I

−0.302285 − 0.979820I 0

u = −0.101406 + 0.992248I

−4.21065 − 6.07424I −4.70014 + 8.18701I

u = −0.101406 − 0.992248I

−4.21065 + 6.07424I −4.70014 − 8.18701I

u = −0.044728 + 0.980361I

−5.29212 + 0.73505I −7.97312 + 0.I

u = −0.044728 − 0.980361I

−5.29212 − 0.73505I −7.97312 + 0.I

u = 0.231455 + 1.000170I

−0.58521 + 2.91346I 0

u = 0.231455 − 1.000170I

−0.58521 − 2.91346I 0

u = 0.748094 + 0.708104I

1.49916 − 5.73552I 0

u = 0.748094 − 0.708104I

1.49916 + 5.73552I 0

u = 0.277622 + 1.006300I

3.26637 − 3.71880I 0

u = 0.277622 − 1.006300I

3.26637 + 3.71880I 0

u = 0.099815 + 0.950570I

−2.03163 + 1.90280I −1.00812 − 4.53925I

u = 0.099815 − 0.950570I

−2.03163 − 1.90280I −1.00812 + 4.53925I

u = −0.265572 + 1.012460I

4.96981 − 1.56282I 0

u = −0.265572 − 1.012460I

4.96981 + 1.56282I 0

u = −0.586679 + 0.867149I

−1.77126 + 1.03509I 0

u = −0.586679 − 0.867149I

−1.77126 − 1.03509I 0

u = −0.746947 + 0.736867I

3.53722 + 1.18244I 0

u = −0.746947 − 0.736867I

3.53722 − 1.18244I 0

u = −0.242468 + 1.028110I

4.79959 − 4.64962I 0

u = −0.242468 − 1.028110I

4.79959 + 4.64962I 0

u = 0.234800 + 1.034640I

2.95579 + 9.94979I 0

u = 0.234800 − 1.034640I

2.95579 − 9.94979I 0

u = 0.647448 + 0.875979I

0.73242 + 2.51663I 0

u = 0.647448 − 0.875979I

0.73242 − 2.51663I 0

u = −0.758459 + 0.794993I

4.55012 − 0.14668I 0

u = −0.758459 − 0.794993I

4.55012 + 0.14668I 0

u = −0.628084 + 0.921139I

−2.04419 − 5.77241I 0

u = −0.628084 − 0.921139I

−2.04419 + 5.77241I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.835257 + 0.742674I

6.35107 + 2.04623I 0

u = −0.835257 − 0.742674I

6.35107 − 2.04623I 0

u = 0.758172 + 0.825776I

3.58561 + 4.71802I 0

u = 0.758172 − 0.825776I

3.58561 − 4.71802I 0

u = −0.847393 + 0.734484I

10.08040 + 9.29957I 0

u = −0.847393 − 0.734484I

10.08040 − 9.29957I 0

u = 0.846821 + 0.739280I

11.94220 − 3.91143I 0

u = 0.846821 − 0.739280I

11.94220 + 3.91143I 0

u = 0.845301 + 0.751762I

12.17070 − 0.58717I 0

u = 0.845301 − 0.751762I

12.17070 + 0.58717I 0

u = −0.844440 + 0.757264I

10.49740 − 4.80557I 0

u = −0.844440 − 0.757264I

10.49740 + 4.80557I 0

u = 0.738716 + 0.913060I

3.31838 + 0.95336I 0

u = 0.738716 − 0.913060I

3.31838 − 0.95336I 0

u = 0.682106 + 0.959266I

−0.98202 + 4.31584I 0

u = 0.682106 − 0.959266I

−0.98202 − 4.31584I 0

u = −0.731393 + 0.936292I

4.12042 − 5.50383I 0

u = −0.731393 − 0.936292I

4.12042 + 5.50383I 0

u = 0.158699 + 0.795794I

−0.93723 + 1.74811I 1.58765 − 5.17968I

u = 0.158699 − 0.795794I

−0.93723 − 1.74811I 1.58765 + 5.17968I

u = −0.709189 + 0.967062I

2.84545 − 6.72964I 0

u = −0.709189 − 0.967062I

2.84545 + 6.72964I 0

u = 0.702838 + 0.980436I

0.68737 + 11.26350I 0

u = 0.702838 − 0.980436I

0.68737 − 11.26350I 0

u = −0.753756 + 0.996096I

5.57098 − 7.98818I 0

u = −0.753756 − 0.996096I

5.57098 + 7.98818I 0

u = −0.765394 + 0.991927I

9.77291 − 1.20159I 0

u = −0.765394 − 0.991927I

9.77291 + 1.20159I 0

u = 0.763313 + 0.995423I

11.41870 + 6.58981I 0

u = 0.763313 − 0.995423I

11.41870 − 6.58981I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.758437 + 1.002770I

11.1297 + 9.9017I 0

u = 0.758437 − 1.002770I

11.1297 − 9.9017I 0

u = −0.756608 + 1.005470I

9.2451 − 15.2850I 0

u = −0.756608 − 1.005470I

9.2451 + 15.2850I 0

u = 0.686093 + 0.028981I

6.40339 + 6.93089I 7.58937 − 5.03714I

u = 0.686093 − 0.028981I

6.40339 − 6.93089I 7.58937 + 5.03714I

u = −0.685171 + 0.015873I

8.17683 − 1.59594I 10.20433 + 0.32100I

u = −0.685171 − 0.015873I

8.17683 + 1.59594I 10.20433 − 0.32100I

u = 0.652464

2.61478 4.37850

u = −0.334129 + 0.411688I

−1.50019 + 1.55713I 0.650340 − 0.272682I

u = −0.334129 − 0.411688I

−1.50019 − 1.55713I 0.650340 + 0.272682I

u = −0.480157 + 0.207491I

−0.60976 − 4.42214I 4.50486 + 7.49216I

u = −0.480157 − 0.207491I

−0.60976 + 4.42214I 4.50486 − 7.49216I

u = 0.429074 + 0.095570I

1.039040 + 0.315096I 9.75730 − 1.79361I

u = 0.429074 − 0.095570I

1.039040 − 0.315096I 9.75730 + 1.79361I

II. u-Polynomials

Crossings u-Polynomials at each crossing

+ 33u

+ ··· + 2u + 1

, c

− u

+ ··· + u

− 1

, c

+ u

+ ··· − 110u − 25

, c

+ u

+ ··· + u

− 1

− 3u

+ ··· − 8u + 3

− 5u

+ ··· + 21044u − 3477

, c

+ 23u

+ ··· + 2u − 1

III. Riley Polynomials

Crossings Riley Polynomials at each crossing

+ 19y

+ ··· − 10y −1

, c

− 33y

+ ··· + 2y −1

, c

− 81y

+ ··· + 28950y −625

, c

+ 23y

+ ··· + 2y −1

− 5y

+ ··· + 562y −9

− 29y

+ ··· + 182318326y −12089529

, c

+ 59y

+ ··· + 22y −1