12a

0529

(K12a

0529

)

A knot diagram

Linearized knot diagam

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

Solving Sequence

4,10

5 9

1,6

8 3 12 11 7 2

, c

Ideals for irreducible components

of X

par

= h−3.53233 × 10

+ 2.53432 × 10

+ ··· + 3.87343 × 10

b + 4.07069 × 10

− 6.56457 × 10

+ 6.09413 × 10

+ ··· + 6.58484 × 10

a + 8.05766 × 10

− u

+ ··· − 158u + 17i

= h−u

+ b − u, −u

+ a, u

+ 4u

+ 6u

+ 5u

+ 3u

− u

+ u

− u + 1i

= hb − a − u, a

+ 6a

u + a

+ 5a

u − 16a

− 24a

u − 12a

− 16a

u + 21a

+ 10au + 12a + 4u − 1, u

+ 1i

= h−u

+ b − u, −u

+ a, u

+ 6u

+ ··· + 2u + 1i

* 4 irreducible components of dim

= 0, with total 118 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

= h−3.53 × 10

+ 2.53 × 10

+ · · · + 3.87 × 10

b + 4.07 ×

, −6.56 × 10

+ 6.09 × 10

+ · · · + 6.58 × 10

a + 8.06 ×

, u

− u

+ · · · − 158u + 17i

(i) Arc colorings











−u





−u

+ u





0.0996921u

− 0.0925479u

+ ··· + 85.8969u − 12.2367

0.0911937u

− 0.0654283u

+ ··· + 51.1583u − 10.5093





+ 1

−u

− 2u





0.600810u

− 0.591223u

+ ··· + 251.305u − 43.7031

0.257472u

− 0.267396u

+ ··· + 57.0402u − 9.17170





0.723306u

− 0.563802u

+ ··· + 284.437u − 45.2027

0.217757u

− 0.0902812u

+ ··· + 78.2752u − 11.1735





0.00849846u

− 0.0271196u

+ ··· + 34.7387u − 1.72742

0.0911937u

− 0.0654283u

+ ··· + 51.1583u − 10.5093





0.0993703u

− 0.0950018u

+ ··· + 84.3319u − 12.4324

0.124410u

− 0.0564865u

+ ··· + 53.1573u − 10.4350





0.625336u

− 0.501248u

+ ··· + 242.513u − 48.2108

−0.0722923u

+ 0.0771458u

+ ··· − 12.4899u + 3.80427





1.62071u

− 1.09263u

+ ··· + 534.442u − 76.5897

0.191754u

− 0.0384194u

+ ··· + 32.9728u − 7.14572



(ii) Obstruction class = −1

(iii) Cusp Shapes = −0.569931u

+ 0.359505u

+ ··· − 304.744u + 50.6300

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

+ 36u

+ ··· + 19u + 4

, c

− 2u

+ ··· − 5u + 2

+ 2u

+ ··· − 1177u + 202

, c

− u

+ ··· − 158u + 17

, c

− u

+ ··· − 100u + 17

− 10u

+ ··· − 18835u + 1862

− 29u

+ ··· − 3906u + 289

+ 8u

+ ··· + 1172713u + 156832

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

+ 8y

+ ··· + 191y + 16

, c

+ 36y

+ ··· + 19y + 4

− 20y

+ ··· − 1880229y + 40804

, c

+ 81y

+ ··· − 13438y + 289

, c

+ 29y

+ ··· + 3906y + 289

+ 12y

+ ··· + 54812019y + 3467044

+ 49y

+ ··· + 20899954y + 83521

+ 24y

+ ··· + 1500857096879y + 24596276224

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.871703 + 0.337657I

a = 0.531191 − 0.397620I

b = −0.72291 − 1.41153I

−0.96411 + 12.75580I 0

u = 0.871703 − 0.337657I

a = 0.531191 + 0.397620I

b = −0.72291 + 1.41153I

−0.96411 − 12.75580I 0

u = −0.341605 + 0.864408I

a = −0.850996 + 0.602062I

b = −0.568836 + 0.390828I

−2.34126 − 6.14169I 0

u = −0.341605 − 0.864408I

a = −0.850996 − 0.602062I

b = −0.568836 − 0.390828I

−2.34126 + 6.14169I 0

u = −0.154405 + 0.907290I

a = −0.406956 + 0.726577I

b = −0.308364 + 0.691108I

−3.62597 + 0.74459I 0

u = −0.154405 − 0.907290I

a = −0.406956 − 0.726577I

b = −0.308364 − 0.691108I

−3.62597 − 0.74459I 0

u = 0.835900 + 0.374263I

a = 0.683754 − 0.340500I

b = −0.536338 − 1.288420I

−3.08946 + 4.96821I 0

u = 0.835900 − 0.374263I

a = 0.683754 + 0.340500I

b = −0.536338 + 1.288420I

−3.08946 − 4.96821I 0

u = −0.850183 + 0.331328I

a = −0.543534 − 0.324415I

b = 0.72960 − 1.31268I

1.39164 − 7.76709I 0

u = −0.850183 − 0.331328I

a = −0.543534 + 0.324415I

b = 0.72960 + 1.31268I

1.39164 + 7.76709I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.742033 + 0.489974I

a = −1.023820 − 0.198435I

b = 0.045626 − 0.959753I

−4.05338 − 4.76438I 0. + 6.53613I

u = −0.742033 − 0.489974I

a = −1.023820 + 0.198435I

b = 0.045626 + 0.959753I

−4.05338 + 4.76438I 0. − 6.53613I

u = −0.682242 + 0.569438I

a = −1.158730 − 0.084714I

b = −0.222157 − 0.733705I

−2.82768 + 2.89502I 0

u = −0.682242 − 0.569438I

a = −1.158730 + 0.084714I

b = −0.222157 + 0.733705I

−2.82768 − 2.89502I 0

u = −0.789625 + 0.287686I

a = −0.527894 − 0.089515I

b = 0.842261 − 1.020140I

2.89325 − 5.78254I 6.56857 + 7.64192I

u = −0.789625 − 0.287686I

a = −0.527894 + 0.089515I

b = 0.842261 + 1.020140I

2.89325 + 5.78254I 6.56857 − 7.64192I

u = 0.648168 + 0.502376I

a = 1.058750 − 0.048900I

b = −0.003990 − 0.637730I

−0.33883 + 1.60186I 1.60546 − 3.53406I

u = 0.648168 − 0.502376I

a = 1.058750 + 0.048900I

b = −0.003990 + 0.637730I

−0.33883 − 1.60186I 1.60546 + 3.53406I

u = 0.296301 + 0.763935I

a = 0.741212 + 0.381539I

b = 0.358971 + 0.318208I

−0.23116 + 1.74291I −0.33130 − 4.94390I

u = 0.296301 − 0.763935I

a = 0.741212 − 0.381539I

b = 0.358971 − 0.318208I

−0.23116 − 1.74291I −0.33130 + 4.94390I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.737315 + 0.251878I

a = 0.553553 + 0.102566I

b = −0.910825 − 0.780758I

2.01584 + 1.14854I 5.44751 − 1.47076I

u = 0.737315 − 0.251878I

a = 0.553553 − 0.102566I

b = −0.910825 + 0.780758I

2.01584 − 1.14854I 5.44751 + 1.47076I

u = 0.075673 + 1.290750I

a = −0.992398 + 0.464694I

b = −1.59071 + 0.73360I

−1.73230 − 4.32456I 0

u = 0.075673 − 1.290750I

a = −0.992398 − 0.464694I

b = −1.59071 − 0.73360I

−1.73230 + 4.32456I 0

u = −0.096475 + 1.302650I

a = 0.965712 + 0.242844I

b = 1.61430 + 0.52832I

0.119164 − 0.754172I 0

u = −0.096475 − 1.302650I

a = 0.965712 − 0.242844I

b = 1.61430 − 0.52832I

0.119164 + 0.754172I 0

u = −0.147580 + 1.317830I

a = 0.943837 − 0.268717I

b = 1.69097 + 0.06926I

0.41502 − 3.35037I 0

u = −0.147580 − 1.317830I

a = 0.943837 + 0.268717I

b = 1.69097 − 0.06926I

0.41502 + 3.35037I 0

u = 0.172897 + 1.322130I

a = −0.933142 − 0.519121I

b = −1.72379 − 0.15408I

−1.15919 + 8.40041I 0

u = 0.172897 − 1.322130I

a = −0.933142 + 0.519121I

b = −1.72379 + 0.15408I

−1.15919 − 8.40041I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.096112 + 1.369190I

a = −0.414099 + 0.096497I

b = −1.162900 + 0.290588I

−4.86388 + 2.38505I 0

u = 0.096112 − 1.369190I

a = −0.414099 − 0.096497I

b = −1.162900 − 0.290588I

−4.86388 − 2.38505I 0

u = 0.574787 + 0.059330I

a = 0.755800 + 1.027700I

b = −1.230110 + 0.059628I

3.16394 + 5.76384I 7.59245 − 6.65665I

u = 0.574787 − 0.059330I

a = 0.755800 − 1.027700I

b = −1.230110 − 0.059628I

3.16394 − 5.76384I 7.59245 + 6.65665I

u = −0.15045 + 1.41553I

a = −0.03804 + 1.43925I

b = −0.619065 + 1.211410I

−5.22619 + 0.59013I 0

u = −0.15045 − 1.41553I

a = −0.03804 − 1.43925I

b = −0.619065 − 1.211410I

−5.22619 − 0.59013I 0

u = 0.19788 + 1.43555I

a = 0.03726 + 1.65451I

b = 0.61403 + 1.34363I

−4.71578 + 4.11924I 0

u = 0.19788 − 1.43555I

a = 0.03726 − 1.65451I

b = 0.61403 − 1.34363I

−4.71578 − 4.11924I 0

u = 0.28500 + 1.42398I

a = −0.01702 − 1.54807I

b = −1.07658 − 1.19558I

−3.37812 + 4.85193I 0

u = 0.28500 − 1.42398I

a = −0.01702 + 1.54807I

b = −1.07658 + 1.19558I

−3.37812 − 4.85193I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.278329 + 0.467042I

a = 0.924246 − 0.203547I

b = −0.054022 + 0.191619I

0.259106 + 1.284090I 2.32882 − 5.74974I

u = 0.278329 − 0.467042I

a = 0.924246 + 0.203547I

b = −0.054022 − 0.191619I

0.259106 − 1.284090I 2.32882 + 5.74974I

u = −0.30726 + 1.43756I

a = −0.10602 − 1.73731I

b = 0.99502 − 1.37945I

−2.64476 − 9.75402I 0

u = −0.30726 − 1.43756I

a = −0.10602 + 1.73731I

b = 0.99502 + 1.37945I

−2.64476 + 9.75402I 0

u = −0.512415 + 0.037742I

a = −1.03347 + 1.23529I

b = 1.150490 + 0.265747I

4.65569 − 1.02094I 10.89176 + 0.78170I

u = −0.512415 − 0.037742I

a = −1.03347 − 1.23529I

b = 1.150490 − 0.265747I

4.65569 + 1.02094I 10.89176 − 0.78170I

u = −0.33234 + 1.46432I

a = −0.34154 − 1.94756I

b = 0.81603 − 1.59781I

−4.37511 − 12.05130I 0

u = −0.33234 − 1.46432I

a = −0.34154 + 1.94756I

b = 0.81603 + 1.59781I

−4.37511 + 12.05130I 0

u = 0.23373 + 1.48440I

a = −0.06822 + 1.91050I

b = 0.55244 + 1.51628I

−6.60995 + 6.08840I 0

u = 0.23373 − 1.48440I

a = −0.06822 − 1.91050I

b = 0.55244 − 1.51628I

−6.60995 − 6.08840I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.22302 + 1.48750I

a = 0.518649 − 1.000800I

b = −0.533732 − 0.791660I

−6.77024 + 4.75215I 0

u = 0.22302 − 1.48750I

a = 0.518649 + 1.000800I

b = −0.533732 + 0.791660I

−6.77024 − 4.75215I 0

u = 0.34151 + 1.47055I

a = 0.39657 − 2.02539I

b = −0.77786 − 1.67431I

−6.7695 + 17.1494I 0

u = 0.34151 − 1.47055I

a = 0.39657 + 2.02539I

b = −0.77786 + 1.67431I

−6.7695 − 17.1494I 0

u = −0.09089 + 1.50978I

a = 0.495455 + 1.282740I

b = −0.266796 + 1.066350I

−8.01141 + 1.22205I 0

u = −0.09089 − 1.50978I

a = 0.495455 − 1.282740I

b = −0.266796 − 1.066350I

−8.01141 − 1.22205I 0

u = 0.31811 + 1.48037I

a = 0.47750 − 1.82213I

b = −0.67878 − 1.50521I

−9.06725 + 9.15754I 0

u = 0.31811 − 1.48037I

a = 0.47750 + 1.82213I

b = −0.67878 + 1.50521I

−9.06725 − 9.15754I 0

u = −0.24631 + 1.49576I

a = 0.07793 + 1.99376I

b = −0.54974 + 1.57474I

−9.0697 − 11.1049I 0

u = −0.24631 − 1.49576I

a = 0.07793 − 1.99376I

b = −0.54974 − 1.57474I

−9.0697 + 11.1049I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.21177 + 1.50566I

a = 0.21791 + 1.87599I

b = −0.44690 + 1.49711I

−11.13890 − 3.08586I 0

u = −0.21177 − 1.50566I

a = 0.21791 − 1.87599I

b = −0.44690 − 1.49711I

−11.13890 + 3.08586I 0

u = −0.20729 + 1.51082I

a = −0.712545 − 0.860726I

b = 0.347976 − 0.695792I

−9.63663 − 0.24582I 0

u = −0.20729 − 1.51082I

a = −0.712545 + 0.860726I

b = 0.347976 + 0.695792I

−9.63663 + 0.24582I 0

u = −0.24937 + 1.50646I

a = −0.687883 − 1.221840I

b = 0.415475 − 1.005740I

−10.56700 − 8.34790I 0

u = −0.24937 − 1.50646I

a = −0.687883 + 1.221840I

b = 0.415475 + 1.005740I

−10.56700 + 8.34790I 0

u = 0.12347 + 1.52923I

a = −0.54368 + 1.49764I

b = 0.218811 + 1.221180I

−12.01490 + 2.19277I 0

u = 0.12347 − 1.52923I

a = −0.54368 − 1.49764I

b = 0.218811 − 1.221180I

−12.01490 − 2.19277I 0

u = 0.07739 + 1.53445I

a = −0.659918 + 1.245080I

b = 0.147057 + 1.026510I

−10.74150 − 5.90257I 0

u = 0.07739 − 1.53445I

a = −0.659918 − 1.245080I

b = 0.147057 − 1.026510I

−10.74150 + 5.90257I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.405149 + 0.030083I

a = −1.61760 − 1.88667I

b = 1.048300 − 0.659964I

4.09237 − 1.00331I 10.38328 + 0.46979I

u = −0.405149 − 0.030083I

a = −1.61760 + 1.88667I

b = 1.048300 + 0.659964I

4.09237 + 1.00331I 10.38328 − 0.46979I

u = 0.373698 + 0.075865I

a = 1.72252 − 2.37204I

b = −1.054630 − 0.839020I

2.05319 + 5.88077I 6.97041 − 5.00849I

u = 0.373698 − 0.075865I

a = 1.72252 + 2.37204I

b = −1.054630 + 0.839020I

2.05319 − 5.88077I 6.97041 + 5.00849I

u = 0.256387 + 0.066382I

a = 3.22271 + 0.78997I

b = −0.548321 + 0.680367I

−0.110048 + 1.027080I 3.94313 − 1.31174I

u = 0.256387 − 0.066382I

a = 3.22271 − 0.78997I

b = −0.548321 − 0.680367I

−0.110048 − 1.027080I 3.94313 + 1.31174I

II.

= h−u

+ b − u, −u

+ a, u

+ 4u

+ 6u

+ 5u

+ 3u

− u

+ u

− u + 1i

(i) Arc colorings











−u





−u

+ u





+ u





+ 1

−u

− 2u





+ 2u

+ u

− u

+ 3u

+ 2u

+ u





− u

+ 3u

− 2u

+ 4u

− u

+ 3u

+ u

+ 1

−u

− 3u

+ u

− 3u

+ 2u

− 2u

+ u

− u + 1





−u

+ u





−u

− u

+ u





+ u

+ 1

−u

− 2u

− u





− u

+ 3u

− 3u

+ 4u

− 3u

+ 3u

− 2u

+ u

− u + 1

+ 2u

− u

+ u

− u + 1



(ii) Obstruction class = −1

(iii) Cusp Shapes = −4u

− 12u

− 4u

− 12u

− 8u

− 4u

+ 2

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

+ 2u

+ 3u

+ u + 1)

, c

+ u

− u + 1)

− 3u

+ 4u

− 3u + 2)

, c

+ 4u

+ 6u

+ 5u

+ 3u

− u

+ u

− u + 1

− 8u

+ ··· − u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ 2y

+ 7y

+ 5y + 1)

, c

+ 2y

+ 3y

+ y + 1)

− y

+ 2y

+ 7y + 4)

, c

+ 8y

+ ··· + y + 1

− 8y

+ ··· + 9y + 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.400261 + 0.917946I

a = 0.947685 − 0.332294I

b = 0.547424 + 0.585652I

0.98010 + 1.39709I 3.77019 − 3.86736I

u = −0.400261 − 0.917946I

a = 0.947685 + 0.332294I

b = 0.547424 − 0.585652I

0.98010 − 1.39709I 3.77019 + 3.86736I

u = 0.590343 + 0.870977I

a = −1.137770 + 0.249897I

b = −0.547424 + 1.120870I

−2.62503 − 7.64338I −1.77019 + 6.51087I

u = 0.590343 − 0.870977I

a = −1.137770 − 0.249897I

b = −0.547424 − 1.120870I

−2.62503 + 7.64338I −1.77019 − 6.51087I

u = −0.709936 + 0.494274I

a = 0.162512 + 0.626600I

b = −0.547424 + 1.120870I

−2.62503 − 7.64338I −1.77019 + 6.51087I

u = −0.709936 − 0.494274I

a = 0.162512 − 0.626600I

b = −0.547424 − 1.120870I

−2.62503 + 7.64338I −1.77019 − 6.51087I

u = −0.152052 + 1.241420I

a = 0.69948 − 1.82707I

b = 0.547424 − 0.585652I

0.98010 − 1.39709I 3.77019 + 3.86736I

u = −0.152052 − 1.241420I

a = 0.69948 + 1.82707I

b = 0.547424 + 0.585652I

0.98010 + 1.39709I 3.77019 − 3.86736I

u = 0.552313 + 0.323472I

a = −0.004890 + 0.262180I

b = 0.547424 + 0.585652I

0.98010 + 1.39709I 3.77019 − 3.86736I

u = 0.552313 − 0.323472I

a = −0.004890 − 0.262180I

b = 0.547424 − 0.585652I

0.98010 − 1.39709I 3.77019 + 3.86736I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.119592 + 1.365250I

a = −0.66702 − 2.48612I

b = −0.547424 − 1.120870I

−2.62503 + 7.64338I −1.77019 − 6.51087I

u = 0.119592 − 1.365250I

a = −0.66702 + 2.48612I

b = −0.547424 + 1.120870I

−2.62503 − 7.64338I −1.77019 + 6.51087I

III. I

= hb − a − u, 6a

u + 5a

u + · · · + 12a − 1, u

+ 1i

(i) Arc colorings















−u





a + u









u − a − u

u − 2a − u





+ 3a

u − 4a

− 3au + 2

+ 4a

u − 6a

− 4au + 1





−u

a + u





−u

a + 2u





au − 1





u − 4a

− 8a

u + 9a

+ 6au − 1

+ 5a

u + a

+ 4a

u − 12a

− 16a

u − 7a

− 6au + 12a + 4u + 3



(ii) Obstruction class = 1

(iii) Cusp Shapes = −4a

− 16a

u + 28a

+ 24au + 4a + 4u − 8

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

− 3u

+ 5u

− 4u

+ 2u

− u + 1)

, c

+ 3u

+ 5u

+ 4u

+ 2u

+ u

+ 1

− u

+ 5u

+ 6u

− 3u

+ 1

, c

+ 1)

(u + 1)

− u

+ 2u

− u + 1)

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

+ y

+ 5y

+ 6y

+ 3y + 1)

, c

+ 3y

+ 5y

+ 4y

+ 2y

+ y + 1)

− y

+ 5y

+ 6y

− 3y + 1)

, c

(y + 1)

(y − 1)

− 3y

+ 5y

− 4y

+ 2y

− y + 1)

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.000000I

a = −1.073950 − 0.441248I

b = −1.073950 + 0.558752I

− 5.69302I 2.00000 + 5.51057I

u = 1.000000I

a = 1.002190 − 0.704458I

b = 1.002190 + 0.295542I

1.89061 + 0.92430I 5.71672 − 0.79423I

u = 1.000000I

a = −0.428243 − 0.335469I

b = −0.428243 + 0.664531I

−1.89061 + 0.92430I −1.71672 − 0.79423I

u = 1.000000I

a = 1.00219 − 1.29554I

b = 1.002190 − 0.295542I

1.89061 − 0.92430I 5.71672 + 0.79423I

u = 1.000000I

a = −0.42824 − 1.66453I

b = −0.428243 − 0.664531I

−1.89061 − 0.92430I −1.71672 + 0.79423I

u = 1.000000I

a = −1.07395 − 1.55875I

b = −1.073950 − 0.558752I

5.69302I 2.00000 − 5.51057I

u = − 1.000000I

a = −1.073950 + 0.441248I

b = −1.073950 − 0.558752I

5.69302I 2.00000 − 5.51057I

u = − 1.000000I

a = 1.002190 + 0.704458I

b = 1.002190 − 0.295542I

1.89061 − 0.92430I 5.71672 + 0.79423I

u = − 1.000000I

a = −0.428243 + 0.335469I

b = −0.428243 − 0.664531I

−1.89061 − 0.92430I −1.71672 + 0.79423I

u = − 1.000000I

a = 1.00219 + 1.29554I

b = 1.002190 + 0.295542I

1.89061 + 0.92430I 5.71672 − 0.79423I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = − 1.000000I

a = −0.42824 + 1.66453I

b = −0.428243 + 0.664531I

−1.89061 + 0.92430I −1.71672 − 0.79423I

u = − 1.000000I

a = −1.07395 + 1.55875I

b = −1.073950 + 0.558752I

− 5.69302I 2.00000 + 5.51057I

IV. I

= h−u

+ b − u, −u

+ a, u

+ 6u

+ · · · + 2u + 1i

(i) Arc colorings











−u





−u

+ u





+ u





+ 1

−u

− 2u





+ 2u

+ u

− u

+ 3u

+ 2u

+ u





+ u

+ ··· + 2u + 2

+ 5u

+ 10u

+ 12u

+ 11u

+ u

+ 7u

+ 2u

+ 4u

+ u

+ 2u + 1





−u

+ u





−u

− u

+ u





+ u

+ 1

−u

− 2u

− u





+ 10u

+ ··· + 2u + 1

+ 10u

+ ··· + 3u + 2



(ii) Obstruction class = −1

(iii) Cusp Shapes = −4u

− 12u

− 8u

− 4u − 2

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

+ 3u

+ 4u

+ 2u

+ 1)

, c

+ u

+ 2u

+ 2u + 1)

+ u

− 1)

, c

+ 6u

+ ··· + 2u + 1

− 12u

+ ··· − 2u

+ 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

− y

+ 4y

− 2y

+ 8y

+ 1)

, c

+ 3y

+ 4y

+ 2y

+ 1)

− y

+ 2y − 1)

, c

+ 12y

+ ··· + 2y

+ 1

− 12y

+ ··· + 32y

+ 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.548726 + 0.858326I

a = 1.047560 + 0.142976I

b = 0.498832 + 1.001300I

−0.26574 + 2.82812I 1.50976 − 2.97945I

u = −0.548726 − 0.858326I

a = 1.047560 − 0.142976I

b = 0.498832 − 1.001300I

−0.26574 − 2.82812I 1.50976 + 2.97945I

u = 0.588153 + 0.781101I

a = −0.873073 + 0.334040I

b = −0.284920 + 1.115140I

−4.40332 −5.01951 + 0.I

u = 0.588153 − 0.781101I

a = −0.873073 − 0.334040I

b = −0.284920 − 1.115140I

−4.40332 −5.01951 + 0.I

u = 0.345660 + 1.030350I

a = −1.059570 − 0.724507I

b = −0.713912 + 0.305839I

−0.26574 + 2.82812I 1.50976 − 2.97945I

u = 0.345660 − 1.030350I

a = −1.059570 + 0.724507I

b = −0.713912 − 0.305839I

−0.26574 − 2.82812I 1.50976 + 2.97945I

u = −0.651446 + 0.573590I

a = 0.366526 + 0.541550I

b = −0.284920 + 1.115140I

−4.40332 −5.01951 + 0.I

u = −0.651446 − 0.573590I

a = 0.366526 − 0.541550I

b = −0.284920 − 1.115140I

−4.40332 −5.01951 + 0.I

u = 0.663361 + 0.478912I

a = −0.164529 + 0.522390I

b = 0.498832 + 1.001300I

−0.26574 + 2.82812I 1.50976 − 2.97945I

u = 0.663361 − 0.478912I

a = −0.164529 − 0.522390I

b = 0.498832 − 1.001300I

−0.26574 − 2.82812I 1.50976 + 2.97945I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.224719 + 1.187070I

a = −0.93863 − 1.49291I

b = −0.713912 − 0.305839I

−0.26574 − 2.82812I 1.50976 + 2.97945I

u = 0.224719 − 1.187070I

a = −0.93863 + 1.49291I

b = −0.713912 + 0.305839I

−0.26574 + 2.82812I 1.50976 − 2.97945I

u = −0.114635 + 1.337240I

a = 0.61347 − 2.33854I

b = 0.498832 − 1.001300I

−0.26574 − 2.82812I 1.50976 + 2.97945I

u = −0.114635 − 1.337240I

a = 0.61347 + 2.33854I

b = 0.498832 + 1.001300I

−0.26574 + 2.82812I 1.50976 − 2.97945I

u = 0.063294 + 1.354690I

a = −0.34821 − 2.46983I

b = −0.284920 − 1.115140I

−4.40332 −5.01951 + 0.I

u = 0.063294 − 1.354690I

a = −0.34821 + 2.46983I

b = −0.284920 + 1.115140I

−4.40332 −5.01951 + 0.I

u = −0.570379 + 0.156725I

a = −0.143533 + 0.149114I

b = −0.713912 + 0.305839I

−0.26574 + 2.82812I 1.50976 − 2.97945I

u = −0.570379 − 0.156725I

a = −0.143533 − 0.149114I

b = −0.713912 − 0.305839I

−0.26574 − 2.82812I 1.50976 + 2.97945I

V. u-Polynomials

Crossings u-Polynomials at each crossing

+ 2u

+ 3u

+ u + 1)

− 3u

+ 5u

− 4u

+ 2u

− u + 1)

· ((u

+ 3u

+ 4u

+ 2u

+ 1)

)(u

+ 36u

+ ··· + 19u + 4)

, c

+ u

− u + 1)

+ u

+ 2u

+ 2u + 1)

· (u

+ 3u

+ ··· + u

+ 1)(u

− 2u

+ ··· − 5u + 2)

+ u

− 1)

− 3u

+ 4u

− 3u + 2)

· (u

− u

+ 5u

+ 6u

− 3u

+ 1)(u

+ 2u

+ ··· − 1177u + 202)

, c

+ 1)

+ 4u

+ 6u

+ 5u

+ 3u

− u

+ u

− u + 1)

· (u

+ 6u

+ ··· + 2u + 1)(u

− u

+ ··· − 158u + 17)

, c

+ 1)

+ 4u

+ 6u

+ 5u

+ 3u

− u

+ u

− u + 1)

· (u

+ 6u

+ ··· + 2u + 1)(u

− u

+ ··· − 100u + 17)

+ 2u

+ 3u

+ u + 1)

+ 3u

+ 4u

+ 2u

+ 1)

· (u

+ 3u

+ 5u

+ 4u

+ 2u

+ u

+ 1)

· (u

− 10u

+ ··· − 18835u + 1862)

((u + 1)

)(u

− 8u

+ ··· − u + 1)(u

− 12u

+ ··· − 2u

+ 1)

· (u

− 29u

+ ··· − 3906u + 289)

+ u

− u + 1)

− u

+ 2u

− u + 1)

· (u

+ u

+ 2u

+ 2u + 1)

· (u

+ 8u

+ ··· + 1172713u + 156832)

VI. Riley Polynomials

Crossings Riley Polynomials at each crossing

+ 2y

+ 7y

+ 5y + 1)

− y

+ 4y

− 2y

+ 8y

+ 1)

· ((y

+ y

+ 5y

+ 6y

+ 3y + 1)

)(y

+ 8y

+ ··· + 191y + 16)

, c

+ 2y

+ 3y

+ y + 1)

+ 3y

+ 4y

+ 2y

+ 1)

· ((y

+ 3y

+ 5y

+ 4y

+ 2y

+ y + 1)

)(y

+ 36y

+ ··· + 19y + 4)

− y

+ 2y − 1)

− y

+ 2y

+ 7y + 4)

· (y

− y

+ 5y

+ 6y

− 3y + 1)

· (y

− 20y

+ ··· − 1880229y + 40804)

, c

((y + 1)

)(y

+ 8y

+ ··· + y + 1)(y

+ 12y

+ ··· + 2y

+ 1)

· (y

+ 81y

+ ··· − 13438y + 289)

, c

((y + 1)

)(y

+ 8y

+ ··· + y + 1)(y

+ 12y

+ ··· + 2y

+ 1)

· (y

+ 29y

+ ··· + 3906y + 289)

+ 2y

+ 7y

+ 5y + 1)

− y

+ 4y

− 2y

+ 8y

+ 1)

· (y

+ 3y

+ 5y

+ 4y

+ 2y

+ y + 1)

· (y

+ 12y

+ ··· + 54812019y + 3467044)

((y − 1)

)(y

− 8y

+ ··· + 9y + 1)(y

− 12y

+ ··· + 32y

+ 1)

· (y

+ 49y

+ ··· + 20899954y + 83521)

+ 2y

+ 3y

+ y + 1)

− 3y

+ 5y

− 4y

+ 2y

− y + 1)

· (y

+ 3y

+ 4y

+ 2y

+ 1)

· (y

+ 24y

+ ··· + 1500857096879y + 24596276224)