11a

351

(K11a

351

)

A knot diagram

Linearized knot diagam

7 6 1 10 11 9 4 3 2 5 8

Solving Sequence

6,9 3,7

2 10 1 4 8 11 5

, c

Ideals for irreducible components

of X

par

= h5u

+ 60u

+ ··· + b + 130, 35u

+ 195u

+ ··· + 19a − 844, u

+ 11u

+ ··· + 85u + 19i

= h4u

+ 38u

+ ··· + b + 71, 3u

− 4u

+ ··· + 17a − 272, u

+ 10u

+ ··· + 102u + 17i

= h−779024089a

u − 1957109432a

u + ··· + 3952254721a + 13062915505,

u + 3a

u + ··· − 24a

− 5, u

− u + 1i

= h10206521a

+ 21936282a

+ ··· − 55249693a − 29498003, a

− 7a

+ ··· + 50a + 317,

− u

+ 2u + 1i

= h9901203u

− 97655512u

+ ··· + 45127189b − 2967898,

− 6933305u

+ 80845633u

+ ··· + 45127189a − 67619382, u

− 9u

+ ··· − 3u

+ 1i

= h−a

− a

+ b + a, a

+ a

+ 2a

+ a

+ a + 1, u − 1i

= ha

+ a

+ b, a

+ a

+ 2a

+ a

+ a + 1, u − 1i

= hb + 1, a, u − 1i

= ha, b

− b

+ 2b

− b

+ b − 1, v −1i

* 9 irreducible components of dim

= 0, with total 124 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

= h5u

+ 60u

+ · · · + b + 130, 35u

+ 195u

+ · · · + 19a −

844, u

+ 11u

+ · · · + 85u + 19i

(i) Arc colorings











−1.84211u

− 10.2632u

+ ··· + 138.789u + 44.4211

−5u

− 60u

+ ··· − 496u − 130









−6.84211u

− 70.2632u

+ ··· − 357.211u − 85.5789

−5u

− 60u

+ ··· − 496u − 130





0.473684u

+ 4.21053u

+ ··· − 2.63158u − 2.73684

+ 10u

+ ··· + 44u + 9





3.15789u

+ 20.7368u

+ ··· − 156.211u − 50.5789

15u

+ 160u

+ ··· + 929u + 231





12.1579u

+ 118.737u

+ ··· + 457.789u + 104.421

21u

+ 180u

+ ··· + 548u + 155





−0.526316u

− 4.78947u

+ ··· − 12.6316u − 1.73684

−u

− 9u

+ ··· − 32u − 10





2.57895u

+ 37.3684u

+ ··· + 428.895u + 117.211

−10u

− 94u

+ ··· − 302u − 65





−1.63158u

− 23.9474u

+ ··· − 287.158u − 77.6842

+ 71u

+ ··· + 343u + 83





−1.63158u

− 23.9474u

+ ··· − 287.158u − 77.6842

+ 71u

+ ··· + 343u + 83



(ii) Obstruction class = −1

(iii) Cusp Shapes = 20u

+ 204u

+ 914u

+ 2234u

+ 2754u

−94u

−6024u

−

9048u

− 3284u

+ 8196u

+ 15768u

+ 14640u

+ 8642u

+ 3488u

+ 1062u + 264

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

+ u

+ ··· + 2u + 2

, c

+ u

+ ··· + u + 1

, c

− 11u

+ ··· − 85u + 19

, c

+ 6u

+ ··· + 8u + 8

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ 9y

+ ··· + 48y + 4

, c

+ 7y

+ ··· + 21y + 1

, c

− 11y

+ ··· + 3795y + 361

, c

− 12y

+ ··· + 160y + 64

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.380977 + 0.787211I

a = −1.029130 − 0.000584I

b = 0.393453 + 0.808033I

5.25768 − 4.77897I 4.31247 + 4.75614I

u = −0.380977 − 0.787211I

a = −1.029130 + 0.000584I

b = 0.393453 − 0.808033I

5.25768 + 4.77897I 4.31247 − 4.75614I

u = 1.279880 + 0.358721I

a = 0.170555 + 0.671225I

b = −0.052349 − 0.395411I

−2.56459 − 2.34570I −6.28872 + 0.46963I

u = 1.279880 − 0.358721I

a = 0.170555 − 0.671225I

b = −0.052349 + 0.395411I

−2.56459 + 2.34570I −6.28872 − 0.46963I

u = −1.22875 + 0.75885I

a = 0.284860 + 0.655547I

b = 0.403315 − 1.238380I

8.29097 + 6.33547I 5.46130 − 6.31546I

u = −1.22875 − 0.75885I

a = 0.284860 − 0.655547I

b = 0.403315 + 1.238380I

8.29097 − 6.33547I 5.46130 + 6.31546I

u = −1.16827 + 1.01352I

a = 0.104611 − 1.132590I

b = −1.20879 + 1.21269I

2.8802 + 18.5253I 0.82769 − 9.63606I

u = −1.16827 − 1.01352I

a = 0.104611 + 1.132590I

b = −1.20879 − 1.21269I

2.8802 − 18.5253I 0.82769 + 9.63606I

u = −1.54277 + 0.30640I

a = −0.064517 − 0.349095I

b = −0.120682 + 0.887722I

−0.76511 + 3.23091I 8.87467 − 5.88690I

u = −1.54277 − 0.30640I

a = −0.064517 + 0.349095I

b = −0.120682 − 0.887722I

−0.76511 − 3.23091I 8.87467 + 5.88690I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −1.20852 + 1.02268I

a = −0.121691 + 1.002120I

b = 1.08577 − 1.07970I

−2.9800 + 13.9622I −2.59981 − 9.26713I

u = −1.20852 − 1.02268I

a = −0.121691 − 1.002120I

b = 1.08577 + 1.07970I

−2.9800 − 13.9622I −2.59981 + 9.26713I

u = 0.035423 + 0.412947I

a = 1.80300 + 0.46760I

b = −0.145251 − 0.677138I

0.27480 − 1.44128I 1.93375 + 5.30960I

u = 0.035423 − 0.412947I

a = 1.80300 − 0.46760I

b = −0.145251 + 0.677138I

0.27480 + 1.44128I 1.93375 − 5.30960I

u = −1.28602 + 0.99596I

a = 0.062844 − 0.836469I

b = −0.855461 + 1.000990I

−1.34679 + 8.40080I −0.52134 − 6.47139I

u = −1.28602 − 0.99596I

a = 0.062844 + 0.836469I

b = −0.855461 − 1.000990I

−1.34679 − 8.40080I −0.52134 + 6.47139I

II. I

= h4u

+ 38u

+ · · · + b + 71, 3u

− 4u

+ · · · + 17a − 272, u

10u

+ · · · + 102u + 17i

(i) Arc colorings











−0.176471u

+ 0.235294u

+ ··· + 70.2353u + 16

−4u

− 38u

+ ··· − 371u − 71









−4.17647u

− 37.7647u

+ ··· − 300.765u − 55

−4u

− 38u

+ ··· − 371u − 71





−1.47059u

− 12.7059u

+ ··· − 80.7059u − 13

−2u

− 18u

+ ··· − 136u − 25





−2.17647u

− 21.7647u

+ ··· − 266.765u − 52

+ 8u

+ ··· + 3u − 3





−8.17647u

− 71.7647u

+ ··· − 476.765u − 83

−7u

− 67u

+ ··· − 714u − 139





0.529412u

+ 4.29412u

+ ··· + 14.2941u + 3

+ 8u

+ ··· + 43u + 9





−1.76471u

− 19.6471u

+ ··· − 338.647u − 68

+ 26u

+ ··· + 136u + 21





−0.0588235u

+ 2.41176u

+ ··· + 156.412u + 35

−4u

− 36u

+ ··· − 289u − 52





−0.0588235u

+ 2.41176u

+ ··· + 156.412u + 35

−4u

− 36u

+ ··· − 289u − 52



(ii) Obstruction class = −1

(iii) Cusp Shapes = −15u

− 131u

− 625u

− 1949u

− 4347u

− 7138u

−

8765u

− 8007u

− 5383u

− 2560u

− 816u − 127

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

− u

+ u

− 1)

, c

+ u

− u

+ 8u

+ u

+ 8u

− 8u

+ 4u

+ u

+ 4u

− 3u + 1

, c

− 10u

+ ··· − 102u + 17

, c

+ 3u

+ 2u

+ u

− 2u − 4)

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

− 2y

+ 3y

− 5y

+ 3y

− 2y + 1)

, c

+ 2y

+ ··· − y + 1

, c

+ 6y

+ ··· + 918y + 289

, c

− 5y

+ 6y

+ 8y

− 15y

− 12y + 16)

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −1.014560 + 0.523445I

a = −0.208887 − 0.713790I

b = −1.14261 + 1.15043I

−1.71358 + 4.97819I 0.7768 − 21.8821I

u = −1.014560 − 0.523445I

a = −0.208887 + 0.713790I

b = −1.14261 − 1.15043I

−1.71358 − 4.97819I 0.7768 + 21.8821I

u = −0.681059 + 0.947774I

a = −0.626037 − 0.871204I

b = −0.399338 + 1.186680I

10.0009 7.28456 + 0.I

u = −0.681059 − 0.947774I

a = −0.626037 + 0.871204I

b = −0.399338 − 1.186680I

10.0009 7.28456 + 0.I

u = −1.011620 + 0.702683I

a = 0.146588 + 0.944898I

b = 1.19430 − 1.17568I

3.78738 + 10.11610I 0.74000 − 10.55076I

u = −1.011620 − 0.702683I

a = 0.146588 − 0.944898I

b = 1.19430 + 1.17568I

3.78738 − 10.11610I 0.74000 + 10.55076I

u = −0.216157 + 0.620958I

a = 0.399338 + 1.147190I

b = 0.626037 − 0.495944I

2.30081 4.68187 + 0.I

u = −0.216157 − 0.620958I

a = 0.399338 − 1.147190I

b = 0.626037 + 0.495944I

2.30081 4.68187 + 0.I

u = −1.02353 + 1.42273I

a = 0.665667 + 0.092024I

b = −0.608739 − 0.560847I

3.78738 − 10.11610I 0.74000 + 10.55076I

u = −1.02353 − 1.42273I

a = 0.665667 − 0.092024I

b = −0.608739 + 0.560847I

3.78738 + 10.11610I 0.74000 − 10.55076I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −1.05308 + 1.90895I

a = −0.376670 − 0.098951I

b = 0.330356 + 0.297557I

−1.71358 − 4.97819I 0.7768 + 21.8821I

u = −1.05308 − 1.90895I

a = −0.376670 + 0.098951I

b = 0.330356 − 0.297557I

−1.71358 + 4.97819I 0.7768 − 21.8821I

III. I

= h−7.79 × 10

u − 1.96 × 10

u + · · · + 3.95 × 10

a + 1.31 ×

, 2a

u + 3a

u + · · · − 24a

− 5, u

− u + 1i

(i) Arc colorings











0.0624042a

u + 0.156775a

u + ··· − 0.316598a − 1.04641





u − 1





0.0624042a

u + 0.156775a

u + ··· + 0.683402a − 1.04641

0.0624042a

u + 0.156775a

u + ··· − 0.316598a − 1.04641





0.125388a

u − 0.0120961a

u + ··· − 1.79526a − 0.515904

0.234099a

u − 0.232380a

u + ··· − 1.93225a − 0.405863





−0.0155084a

u − 0.125977a

u + ··· − 0.624139a + 1.47218

0.0310168a

u + 0.251955a

u + ··· + 1.24828a − 2.94436





0.0624042a

u + 0.156775a

u + ··· + 1.68340a − 1.04641

−0.0624042a

u − 0.156775a

u + ··· − 0.683402a + 1.04641





−a

−0.108711a

u + 0.220284a

u + ··· + 0.136985a − 0.110041





0.0627102a

u − 0.0703413a

u + ··· + 0.570348a + 1.12072

−0.182654a

u + 0.0102801a

u + ··· − 4.10199a − 0.770574





0.197356a

u − 0.278756a

u + ··· + 2.01543a + 0.720538

0.0883103a

u − 0.662405a

u + ··· − 3.40104a + 1.50629





0.197356a

u − 0.278756a

u + ··· + 2.01543a + 0.720538

0.0883103a

u − 0.662405a

u + ··· − 3.40104a + 1.50629



(ii) Obstruction class = −1

(iii) Cusp Shapes

= −

20810162524

12483517597

u +

12117017480

12483517597

u + ··· −

108344247808

12483517597

a +

6755523522

12483517597

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

+ 3u

+ ··· − 12u + 61

, c

+ u

+ ··· − 6u + 1

, c

+ u + 1)

, c

− u

− 2u

+ u

+ u + 1)

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

− 13y

+ ··· + 17912y + 3721

, c

− y

+ ··· + 8y + 1

, c

+ y + 1)

, c

− 5y

+ 8y

− 3y

− y − 1)

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.500000 + 0.866025I

a = −0.448982 − 0.894591I

b = 1.33834 + 0.88084I

0.32910 − 5.59035I 2.51511 + 11.35885I

u = 0.500000 + 0.866025I

a = −0.301250 − 0.932572I

b = 0.50256 + 1.40555I

5.87256 + 0.34107I 6.74431 + 3.42962I

u = 0.500000 + 0.866025I

a = 0.972249 − 0.372860I

b = 0.175892 + 0.206047I

0.32910 − 2.52919I 2.51511 + 2.49755I

u = 0.500000 + 0.866025I

a = 0.452147 + 0.960216I

b = −0.718535 − 0.910912I

0.32910 − 2.52919I 2.51511 + 2.49755I

u = 0.500000 + 0.866025I

a = 0.550143 + 0.975912I

b = −1.57593 − 1.21167I

5.87256 − 8.46060I 6.74431 + 10.42679I

u = 0.500000 + 0.866025I

a = 0.232340 + 0.431805I

b = −1.256950 − 0.014690I

2.40108 − 4.05977I 3.48114 + 6.92820I

u = 0.500000 + 0.866025I

a = −0.97541 + 1.48195I

b = −0.456587 − 0.763331I

0.32910 − 5.59035I 2.51511 + 11.35885I

u = 0.500000 + 0.866025I

a = −0.23234 − 1.75999I

b = 0.873537 + 0.678780I

2.40108 − 4.05977I 3.48114 + 6.92820I

u = 0.500000 + 0.866025I

a = −1.77747 + 0.14328I

b = 0.308955 − 0.410827I

5.87256 + 0.34107I 6.74431 + 3.42962I

u = 0.500000 + 0.866025I

a = 1.52858 − 1.76520I

b = 0.308723 + 1.006240I

5.87256 − 8.46060I 6.74431 + 10.42679I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.500000 − 0.866025I

a = −0.448982 + 0.894591I

b = 1.33834 − 0.88084I

0.32910 + 5.59035I 2.51511 − 11.35885I

u = 0.500000 − 0.866025I

a = −0.301250 + 0.932572I

b = 0.50256 − 1.40555I

5.87256 − 0.34107I 6.74431 − 3.42962I

u = 0.500000 − 0.866025I

a = 0.972249 + 0.372860I

b = 0.175892 − 0.206047I

0.32910 + 2.52919I 2.51511 − 2.49755I

u = 0.500000 − 0.866025I

a = 0.452147 − 0.960216I

b = −0.718535 + 0.910912I

0.32910 + 2.52919I 2.51511 − 2.49755I

u = 0.500000 − 0.866025I

a = 0.550143 − 0.975912I

b = −1.57593 + 1.21167I

5.87256 + 8.46060I 6.74431 − 10.42679I

u = 0.500000 − 0.866025I

a = 0.232340 − 0.431805I

b = −1.256950 + 0.014690I

2.40108 + 4.05977I 3.48114 − 6.92820I

u = 0.500000 − 0.866025I

a = −0.97541 − 1.48195I

b = −0.456587 + 0.763331I

0.32910 + 5.59035I 2.51511 − 11.35885I

u = 0.500000 − 0.866025I

a = −0.23234 + 1.75999I

b = 0.873537 − 0.678780I

2.40108 + 4.05977I 3.48114 − 6.92820I

u = 0.500000 − 0.866025I

a = −1.77747 − 0.14328I

b = 0.308955 + 0.410827I

5.87256 − 0.34107I 6.74431 − 3.42962I

u = 0.500000 − 0.866025I

a = 1.52858 + 1.76520I

b = 0.308723 − 1.006240I

5.87256 + 8.46060I 6.74431 − 10.42679I

IV. I

= h1.02 × 10

+ 2.19 × 10

+ · · · − 5.52 × 10

a − 2.95 ×

, a

− 7a

+ · · · + 50a + 317, u

− u

+ 2u + 1i

(i) Arc colorings











−0.771383a

− 1.65789a

+ ··· + 4.17563a + 2.22938









−0.771383a

− 1.65789a

+ ··· + 5.17563a + 2.22938

−0.771383a

− 1.65789a

+ ··· + 4.17563a + 2.22938





−2.38899a

− 1.48429a

+ ··· + 0.191963a + 0.432924

−3.26466a

− 1.33077a

+ ··· + 0.127827a − 1.90249





−3.45130a

− 1.73595a

+ ··· + 3.15566a − 1.38448

5.95147a

+ 8.73616a

+ ··· + 4.17563a + 1.71700





−1.85369a

− 0.341548a

+ ··· − 3.58272a + 4.48596

3.94220a

+ 3.86768a

+ ··· − 3.42705a + 5.69058





−a

0.875666a

− 0.153515a

+ ··· + 0.0641357a + 2.33541





−5.23127a

− 4.21557a

+ ··· + 1.83391a − 0.272488

2.39529a

+ 2.70451a

+ ··· − 0.144882a + 1.16474





−7.86359a

− 7.45546a

+ ··· − 2.31526a + 3.05851

−1.07236a

− 0.0986639a

+ ··· − 0.769606a + 0.360690





−7.86359a

− 7.45546a

+ ··· − 2.31526a + 3.05851

−1.07236a

− 0.0986639a

+ ··· − 0.769606a + 0.360690



(ii) Obstruction class = −1

(iii) Cusp Shapes =

99852548

4410487

71190288

4410487

+ ··· −

4811112

4410487

a −

25276838

4410487

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

− u

+ ··· − 40u + 7)

, c

− u

+ ··· − 24u + 1

, c

+ u

− 2u + 1)

, c

− u

− 2u

+ u

+ u + 1)

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ 15y

+ ··· + 136y + 49)

, c

− 19y

+ ··· − 140y + 1

, c

− y

+ 6y

− 4y + 1)

, c

− 5y

+ 8y

− 3y

− y − 1)

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.621964 + 0.187730I

a = −0.719862 + 1.116280I

b = −1.058220 − 0.214730I

−2.96077 + 2.52919I −9.48489 − 2.49755I

u = −0.621964 + 0.187730I

a = 0.590718 + 1.260270I

b = −1.91701 − 1.41092I

2.58269 + 8.46060I −5.25569 − 10.42679I

u = −0.621964 + 0.187730I

a = −0.21396 − 1.42839I

b = 1.27174 + 1.23977I

−2.96077 + 5.59035I −9.4849 − 11.3589I

u = −0.621964 + 0.187730I

a = 0.277604 + 0.458266I

b = 1.68999 − 0.50252I

2.58269 − 0.34107I −5.25569 − 3.42962I

u = −0.621964 + 0.187730I

a = 1.49834 + 0.40807I

b = 1.215460 − 0.396898I

2.58269 − 0.34107I −5.25569 − 3.42962I

u = −0.621964 + 0.187730I

a = −0.52719 − 1.68162I

b = −0.936656 + 0.894531I

−2.96077 + 2.52919I −9.48489 − 2.49755I

u = −0.621964 + 0.187730I

a = 0.13210 + 1.90315I

b = 0.01117 − 1.83111I

−0.88879 + 4.05977I −8.51886 − 6.92820I

u = −0.621964 + 0.187730I

a = 0.70008 + 2.70840I

b = 0.622489 − 0.315887I

−2.96077 + 5.59035I −9.4849 − 11.3589I

u = −0.621964 + 0.187730I

a = 0.72825 − 2.71120I

b = 0.1026320 + 0.0179107I

−0.88879 + 4.05977I −8.51886 − 6.92820I

u = −0.621964 + 0.187730I

a = −1.34411 − 3.08700I

b = −0.853187 + 0.155291I

2.58269 + 8.46060I −5.25569 − 10.42679I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.621964 − 0.187730I

a = −0.719862 − 1.116280I

b = −1.058220 + 0.214730I

−2.96077 − 2.52919I −9.48489 + 2.49755I

u = −0.621964 − 0.187730I

a = 0.590718 − 1.260270I

b = −1.91701 + 1.41092I

2.58269 − 8.46060I −5.25569 + 10.42679I

u = −0.621964 − 0.187730I

a = −0.21396 + 1.42839I

b = 1.27174 − 1.23977I

−2.96077 − 5.59035I −9.4849 + 11.3589I

u = −0.621964 − 0.187730I

a = 0.277604 − 0.458266I

b = 1.68999 + 0.50252I

2.58269 + 0.34107I −5.25569 + 3.42962I

u = −0.621964 − 0.187730I

a = 1.49834 − 0.40807I

b = 1.215460 + 0.396898I

2.58269 + 0.34107I −5.25569 + 3.42962I

u = −0.621964 − 0.187730I

a = −0.52719 + 1.68162I

b = −0.936656 − 0.894531I

−2.96077 − 2.52919I −9.48489 + 2.49755I

u = −0.621964 − 0.187730I

a = 0.13210 − 1.90315I

b = 0.01117 + 1.83111I

−0.88879 − 4.05977I −8.51886 + 6.92820I

u = −0.621964 − 0.187730I

a = 0.70008 − 2.70840I

b = 0.622489 + 0.315887I

−2.96077 − 5.59035I −9.4849 + 11.3589I

u = −0.621964 − 0.187730I

a = 0.72825 + 2.71120I

b = 0.1026320 − 0.0179107I

−0.88879 − 4.05977I −8.51886 + 6.92820I

u = −0.621964 − 0.187730I

a = −1.34411 + 3.08700I

b = −0.853187 − 0.155291I

2.58269 − 8.46060I −5.25569 + 10.42679I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.12196 + 1.05376I

a = 0.243796 + 1.155300I

b = −1.015060 − 0.944107I

−2.96077 − 5.59035I −9.4849 + 11.3589I

u = 1.12196 + 1.05376I

a = −0.784279 − 0.888215I

b = 1.50413 + 0.48312I

−0.88879 − 4.05977I −8.51886 + 6.92820I

u = 1.12196 + 1.05376I

a = 0.307340 + 0.744258I

b = −1.234520 − 0.304051I

−0.88879 − 4.05977I −8.51886 + 6.92820I

u = 1.12196 + 1.05376I

a = −0.116394 − 0.734680I

b = 0.654122 + 0.391067I

−2.96077 − 2.52919I −9.48489 + 2.49755I

u = 1.12196 + 1.05376I

a = −0.489819 + 0.435548I

b = 0.382798 − 0.494752I

2.58269 + 0.34107I −5.25569 + 3.42962I

u = 1.12196 + 1.05376I

a = −0.187266 − 0.580148I

b = 1.087870 + 0.575772I

−2.96077 − 5.59035I −9.4849 + 11.3589I

u = 1.12196 + 1.05376I

a = 0.013279 + 0.587324I

b = −1.046510 − 0.808228I

2.58269 − 8.46060I −5.25569 + 10.42679I

u = 1.12196 + 1.05376I

a = −0.07140 − 1.41932I

b = 0.92646 + 1.33661I

2.58269 − 8.46060I −5.25569 + 10.42679I

u = 1.12196 + 1.05376I

a = 0.481693 + 0.286853I

b = −0.965395 − 0.181113I

−2.96077 − 2.52919I −9.48489 + 2.49755I

u = 1.12196 + 1.05376I

a = −0.018914 + 0.225356I

b = 0.057687 + 0.179198I

2.58269 + 0.34107I −5.25569 + 3.42962I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.12196 − 1.05376I

a = 0.243796 − 1.155300I

b = −1.015060 + 0.944107I

−2.96077 + 5.59035I −9.4849 − 11.3589I

u = 1.12196 − 1.05376I

a = −0.784279 + 0.888215I

b = 1.50413 − 0.48312I

−0.88879 + 4.05977I −8.51886 − 6.92820I

u = 1.12196 − 1.05376I

a = 0.307340 − 0.744258I

b = −1.234520 + 0.304051I

−0.88879 + 4.05977I −8.51886 − 6.92820I

u = 1.12196 − 1.05376I

a = −0.116394 + 0.734680I

b = 0.654122 − 0.391067I

−2.96077 + 2.52919I −9.48489 − 2.49755I

u = 1.12196 − 1.05376I

a = −0.489819 − 0.435548I

b = 0.382798 + 0.494752I

2.58269 − 0.34107I −5.25569 − 3.42962I

u = 1.12196 − 1.05376I

a = −0.187266 + 0.580148I

b = 1.087870 − 0.575772I

−2.96077 + 5.59035I −9.4849 − 11.3589I

u = 1.12196 − 1.05376I

a = 0.013279 − 0.587324I

b = −1.046510 + 0.808228I

2.58269 + 8.46060I −5.25569 − 10.42679I

u = 1.12196 − 1.05376I

a = −0.07140 + 1.41932I

b = 0.92646 − 1.33661I

2.58269 + 8.46060I −5.25569 − 10.42679I

u = 1.12196 − 1.05376I

a = 0.481693 − 0.286853I

b = −0.965395 + 0.181113I

−2.96077 + 2.52919I −9.48489 − 2.49755I

u = 1.12196 − 1.05376I

a = −0.018914 − 0.225356I

b = 0.057687 − 0.179198I

2.58269 − 0.34107I −5.25569 − 3.42962I

= h9.90 × 10

− 9.77 × 10

+ · · · + 4.51 × 10

b − 2.97 × 10

, −6.93 ×

+8.08×10

+· · ·+4.51×10

a−6.76×10

, u

−9u

+· · ·−3u

+1i

(i) Arc colorings











0.153639u

− 1.79151u

+ ··· + 2.24516u + 1.49842

−0.219407u

+ 2.16401u

+ ··· + 1.56419u + 0.0657674









−0.0657674u

+ 0.372500u

+ ··· + 3.80934u + 1.56419

−0.219407u

+ 2.16401u

+ ··· + 1.56419u + 0.0657674





−0.862994u

+ 7.09186u

+ ··· + 1.03984u − 0.290444

−0.675088u

+ 5.31678u

+ ··· + 0.709556u + 0.862994





0.342986u

− 3.06182u

+ ··· + 2.31093u + 1.71782

0.107949u

− 0.626322u

+ ··· + 1.15543u − 0.178694





−3.20937u

+ 27.2035u

+ ··· + 5.85762u + 1.67985

−1.35831u

+ 11.4178u

+ ··· + 3.23433u + 2.85186





−0.271837u

+ 2.92517u

+ ··· + 2.48372u − 1.34134

0.0839308u

− 1.15008u

+ ··· − 0.153439u + 0.187906





0.119355u

− 1.14339u

+ ··· − 3.89881u + 3.26977

0.0404788u

+ 0.0678868u

+ ··· + 1.91295u + 0.197670





−1.66613u

+ 15.1247u

+ ··· + 8.18078u − 2.09281

0.0199111u

− 0.114853u

+ ··· − 0.736002u + 1.34910





−1.66613u

+ 15.1247u

+ ··· + 8.18078u − 2.09281

0.0199111u

− 0.114853u

+ ··· − 0.736002u + 1.34910



(ii) Obstruction class = 1

(iii) Cusp Shapes = −

566889690

45127189

4768864478

45127189

+ ··· +

1705220671

45127189

u +

1179786730

45127189

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

+ 5u

+ ··· − 14u

+ 5

, c

+ 3u

+ ··· + 5u + 1

+ 9u

+ ··· − 3u

+ 1

, c

− 11u

+ ··· − 26u

+ 5

− 9u

+ ··· − 3u

+ 1

, c

− 3u

+ ··· − 5u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ 5y

+ 12y

+ 22y

+ 39y

+ 16y

− 3y

− y

− 14y + 5)

, c

− 9y

+ ··· + y + 1

, c

− 3y

+ ··· − 6y + 1

, c

− 11y

+ ··· − 26y + 5)

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.821430 + 0.174947I

a = −0.09635 − 1.43572I

b = 0.118953 + 0.649652I

−2.73306 + 4.26272I −8.25212 − 5.64920I

u = −0.821430 − 0.174947I

a = −0.09635 + 1.43572I

b = 0.118953 − 0.649652I

−2.73306 − 4.26272I −8.25212 + 5.64920I

u = 0.973474 + 0.672727I

a = −0.120474 + 0.775350I

b = −1.037340 − 0.908780I

−1.82255 − 4.54196I −4.29864 + 3.11401I

u = 0.973474 − 0.672727I

a = −0.120474 − 0.775350I

b = −1.037340 + 0.908780I

−1.82255 + 4.54196I −4.29864 − 3.11401I

u = −0.490238 + 1.134900I

a = −0.705233 − 0.258301I

b = 0.489256 − 0.079506I

−1.82255 − 4.54196I −4.29864 + 3.11401I

u = −0.490238 − 1.134900I

a = −0.705233 + 0.258301I

b = 0.489256 + 0.079506I

−1.82255 + 4.54196I −4.29864 − 3.11401I

u = 0.947805 + 0.931675I

a = 0.117417 − 1.009620I

b = 0.96989 + 1.07473I

3.55383 − 7.96405I 2.92507 + 6.02428I

u = 0.947805 − 0.931675I

a = 0.117417 + 1.009620I

b = 0.96989 − 1.07473I

3.55383 + 7.96405I 2.92507 − 6.02428I

u = 0.624760 + 0.114740I

a = 1.015600 − 0.186789I

b = 1.59870 + 0.48840I

2.89253 + 0.54689I 18.6210 − 11.9306I

u = 0.624760 − 0.114740I

a = 1.015600 + 0.186789I

b = 1.59870 − 0.48840I

2.89253 − 0.54689I 18.6210 + 11.9306I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.05532 + 1.04300I

a = −0.530965 − 0.863445I

b = 1.38342 + 0.39958I

−0.24582 − 3.85817I 5.50469 + 2.33081I

u = 1.05532 − 1.04300I

a = −0.530965 + 0.863445I

b = 1.38342 − 0.39958I

−0.24582 + 3.85817I 5.50469 − 2.33081I

u = −0.116259 + 0.447931I

a = 2.34373 + 1.74010I

b = −1.074080 + 0.328248I

3.55383 − 7.96405I 2.92507 + 6.02428I

u = −0.116259 − 0.447931I

a = 2.34373 − 1.74010I

b = −1.074080 − 0.328248I

3.55383 + 7.96405I 2.92507 − 6.02428I

u = −0.404943 + 0.173477I

a = −0.59962 + 3.36092I

b = −0.111711 − 1.056540I

−0.24582 + 3.85817I 5.50469 − 2.33081I

u = −0.404943 − 0.173477I

a = −0.59962 − 3.36092I

b = −0.111711 + 1.056540I

−0.24582 − 3.85817I 5.50469 + 2.33081I

u = 1.19409 + 1.04649I

a = 0.326099 + 0.687739I

b = −1.017300 − 0.504325I

−2.73306 − 4.26272I −8.25212 + 5.64920I

u = 1.19409 − 1.04649I

a = 0.326099 − 0.687739I

b = −1.017300 + 0.504325I

−2.73306 + 4.26272I −8.25212 − 5.64920I

u = 1.53742 + 1.29075I

a = −0.250200 + 0.210167I

b = 0.180215 − 0.433147I

2.89253 + 0.54689I 18.6210 − 11.9306I

u = 1.53742 − 1.29075I

a = −0.250200 − 0.210167I

b = 0.180215 + 0.433147I

2.89253 − 0.54689I 18.6210 + 11.9306I

VI. I

= h−a

− a

+ b + a, a

+ a

+ 2a

+ a

+ a + 1, u − 1i

(i) Arc colorings











+ a

− a









+ a

− a





+ a

−a





+ a





−a

− a

−a





−a

+ a

+ 2a

+ a + 2





+ a

+ a + 1

+ a





+ a

+ a + 1

+ a

+ 1





+ a

+ a + 1

+ a

+ 1



(ii) Obstruction class = −1

(iii) Cusp Shapes = 4a

+ 4a

+ 4a − 6

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

− u

+ 2u

− u

+ u − 1

, c

+ u

− u

− 4u

− 3u − 1

, c

(u + 1)

, c

− u

− 2u

+ u

+ u + 1

, c

− 2u

+ 3u

+ u

− 3u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ 3y

+ 4y

+ y

− y − 1

, c

− 3y

+ 3y

− 8y

+ y − 1

, c

(y − 1)

, c

− 5y

+ 8y

− 3y

− y − 1

, c

+ 2y

+ 7y

− 15y

+ 7y − 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.00000

a = 0.339110 + 0.822375I

b = −0.896438 − 0.890762I

−2.96077 − 1.53058I −9.48489 + 4.43065I

u = 1.00000

a = 0.339110 − 0.822375I

b = −0.896438 + 0.890762I

−2.96077 + 1.53058I −9.48489 − 4.43065I

u = 1.00000

a = −0.766826

b = 1.70062

−0.888787 −8.51890

u = 1.00000

a = −0.455697 + 1.200150I

b = −0.453870 + 0.402731I

2.58269 + 4.40083I −5.25569 − 3.49859I

u = 1.00000

a = −0.455697 − 1.200150I

b = −0.453870 − 0.402731I

2.58269 − 4.40083I −5.25569 + 3.49859I

VII. I

= ha

+ a

+ b, a

+ a

+ 2a

+ a

+ a + 1, u − 1i

(i) Arc colorings











−a

− a









−a

− a

+ a

−a

− a





−a

− a

− 3a

− a − 2

−a





−a

− a

+ 2a

−a

− a

+ a





+ a

− a

−a





−a

− a





−a

− a

+ 2a − 1

+ a





+ 3a

− a + 2

+ a

+ 1





+ 3a

− a + 2

+ a

+ 1



(ii) Obstruction class = −1

(iii) Cusp Shapes = 4a

+ 4a

+ 4a − 6

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

− u

+ 2u

− u

+ u − 1

, c

− 2u

+ 3u

+ u

− 3u + 1

, c

(u + 1)

, c

− u

− 2u

+ u

+ u + 1

, c

+ u

− u

− 4u

− 3u − 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ 3y

+ 4y

+ y

− y − 1

, c

+ 2y

+ 7y

− 15y

+ 7y − 1

, c

(y − 1)

, c

− 5y

+ 8y

− 3y

− y − 1

, c

− 3y

+ 3y

− 8y

+ y − 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.00000

a = 0.339110 + 0.822375I

b = 0.557328 + 0.068387I

−2.96077 − 1.53058I −9.48489 + 4.43065I

u = 1.00000

a = 0.339110 − 0.822375I

b = 0.557328 − 0.068387I

−2.96077 + 1.53058I −9.48489 − 4.43065I

u = 1.00000

a = −0.766826

b = −0.933791

−0.888787 −8.51890

u = 1.00000

a = −0.455697 + 1.200150I

b = 0.90957 − 1.60288I

2.58269 + 4.40083I −5.25569 − 3.49859I

u = 1.00000

a = −0.455697 − 1.200150I

b = 0.90957 + 1.60288I

2.58269 − 4.40083I −5.25569 + 3.49859I

VIII. I

= hb + 1, a, u − 1i

(i) Arc colorings











−1









−1





−1





−1













−1











(ii) Obstruction class = 1

(iii) Cusp Shapes = −12

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

u − 1

, c

u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

y − 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.00000

a = 0

b = −1.00000

−3.28987 −12.0000

IX. I

= ha, b

− b

+ 2b

− b

+ b − 1, v − 1i

(i) Arc colorings























+ 1

















+ b





+ b

+ 1

− b

+ b

+ 1





+ b

+ 1

− b

+ b

+ 1



(ii) Obstruction class = −1

(iii) Cusp Shapes = −4b

+ 4b

− 4b + 6

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

− u

+ 2u

− u

+ u − 1

, c

+ u

− 2u

− u

+ u − 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ 3y

+ 4y

+ y

− y − 1

, c

− 5y

+ 8y

− 3y

− y − 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

v = 1.00000

a = 0

b = −0.339110 + 0.822375I

0.32910 + 1.53058I 2.51511 − 4.43065I

v = 1.00000

a = 0

b = −0.339110 − 0.822375I

0.32910 − 1.53058I 2.51511 + 4.43065I

v = 1.00000

a = 0

b = 0.766826

2.40108 3.48110

v = 1.00000

a = 0

b = 0.455697 + 1.200150I

5.87256 − 4.40083I 6.74431 + 3.49859I

v = 1.00000

a = 0

b = 0.455697 − 1.200150I

5.87256 + 4.40083I 6.74431 − 3.49859I

X. u-Polynomials

Crossings u-Polynomials at each crossing

, c

u(u

− u

+ 2u

− u

+ u − 1)

− u

+ u

− 1)

· (u

+ u

+ ··· + 2u + 2)(u

+ 5u

+ ··· − 14u

+ 5)

· ((u

− u

+ ··· − 40u + 7)

)(u

+ 3u

+ ··· − 12u + 61)

, c

(u − 1)(u

− 2u

+ 3u

+ u

− 3u + 1)(u

− u

+ 2u

− u

+ u − 1)

· (u

+ u

− u

− 4u

− 3u − 1)

· (u

+ u

− u

+ 8u

+ u

+ 8u

− 8u

+ 4u

+ u

+ 4u

− 3u + 1)

· (u

+ u

+ ··· + u + 1)(u

+ u

+ ··· − 6u + 1)

· (u

+ 3u

+ ··· + 5u + 1)(u

− u

+ ··· − 24u + 1)

(u + 1)

+ u + 1)

+ u

− 2u + 1)

· (u

− 10u

+ ··· − 102u + 17)(u

− 11u

+ ··· − 85u + 19)

· (u

+ 9u

+ ··· − 3u

+ 1)

, c

u(u

− u

− 2u

+ u

+ u + 1)

+ u

− 2u

− u

+ u − 1)

· ((u

+ 3u

+ 2u

+ u

− 2u − 4)

)(u

+ 6u

+ ··· + 8u + 8)

· (u

− 11u

+ ··· − 26u

+ 5)

(u − 1)(u + 1)

+ u + 1)

+ u

− 2u + 1)

· (u

− 10u

+ ··· − 102u + 17)(u

− 11u

+ ··· − 85u + 19)

· (u

− 9u

+ ··· − 3u

+ 1)

, c

(u + 1)(u

− 2u

+ 3u

+ u

− 3u + 1)(u

− u

+ 2u

− u

+ u − 1)

· (u

+ u

− u

− 4u

− 3u − 1)

· (u

+ u

− u

+ 8u

+ u

+ 8u

− 8u

+ 4u

+ u

+ 4u

− 3u + 1)

· (u

+ u

+ ··· + u + 1)(u

− 3u

+ ··· − 5u + 1)

· (u

+ u

+ ··· − 6u + 1)(u

− u

+ ··· − 24u + 1)

XI. Riley Polynomials

Crossings Riley Polynomials at each crossing

, c

y(y

+ 3y

+ 4y

+ y

− y − 1)

· (y

− 2y

+ 3y

− 5y

+ 3y

− 2y + 1)

· (y

+ 5y

+ 12y

+ 22y

+ 39y

+ 16y

− 3y

− y

− 14y + 5)

· (y

+ 9y

+ ··· + 48y + 4)(y

− 13y

+ ··· + 17912y + 3721)

· (y

+ 15y

+ ··· + 136y + 49)

, c

(y − 1)(y

− 3y

+ ··· + y − 1)(y

+ 2y

+ ··· + 7y − 1)

· (y

+ 3y

+ 4y

+ y

− y − 1)(y

+ 2y

+ ··· − y + 1)

· (y

+ 7y

+ ··· + 21y + 1)(y

− 9y

+ ··· + y + 1)

· (y

− y

+ ··· + 8y + 1)(y

− 19y

+ ··· − 140y + 1)

, c

(y − 1)

+ y + 1)

− y

+ 6y

− 4y + 1)

· (y

+ 6y

+ ··· + 918y + 289)(y

− 11y

+ ··· + 3795y + 361)

· (y

− 3y

+ ··· − 6y + 1)

, c

y(y

− 5y

+ 8y

− 3y

− y − 1)

· (y

− 5y

+ 6y

+ 8y

− 15y

− 12y + 16)

· ((y

− 11y

+ ··· − 26y + 5)

)(y

− 12y

+ ··· + 160y + 64)