12a

1059

(K12a

1059

)

A knot diagram

Linearized knot diagam

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

Solving Sequence

5,12 6,8

1 9 11 4 2 3 10 7

, c

Ideals for irreducible components

of X

par

= h−6.14828 × 10

+ 8.50493 × 10

+ ··· + 2.35548 × 10

b + 4.37452 × 10

− 9.04579 × 10

+ 6.37591 × 10

+ ··· + 1.17774 × 10

a − 2.01495 × 10

− 3u

+ ··· + 38u + 10i

= h2u

a − 3u

+ ··· + a − 9, u

+ 2u

+ ··· − a + 2, u

+ u

+ ··· − u + 1i

= hu

+ u

− u

+ 2b − u + 1, u

− 2u

+ a + 1, u

− 3u

+ 2u

+ 1i

= ha, b − 1, v + 1i

* 4 irreducible components of dim

= 0, with total 105 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−6.15 × 10

+ 8.50 × 10

+ · · · + 2.36 × 10

b + 4.37 ×

, −9.05 × 10

+ 6.38 × 10

+ · · · + 1.18 × 10

a − 2.01 ×

, u

− 3u

+ · · · + 38u + 10i

(i) Arc colorings















0.0768064u

− 0.0541369u

+ ··· + 0.400423u + 1.71086

0.261020u

− 0.361070u

+ ··· − 9.03543u − 1.85717





0.0395912u

− 0.155029u

+ ··· + 2.31691u + 0.790017

0.0608242u

− 0.176995u

+ ··· + 0.234757u − 0.377871





0.140551u

− 0.0696244u

+ ··· − 1.72012u + 2.05575

0.615558u

− 0.922281u

+ ··· − 22.1653u − 4.52960









−u

+ 1

−u





−0.00943465u

− 0.0566721u

+ ··· + 2.16486u + 1.21012

−0.00165545u

− 0.0842333u

+ ··· + 2.11565u + 0.0816969





−0.100930u

+ 0.00413956u

+ ··· + 10.2335u + 3.54732

−0.209935u

+ 0.144189u

+ ··· + 9.07278u + 1.58098





−u

+ 2u

−u

+ u





0.0740422u

− 0.0468738u

+ ··· + 2.13281u + 2.06658

0.220414u

− 0.290916u

+ ··· − 6.68558u − 1.35661



(ii) Obstruction class = −1

(iii) Cusp Shapes = 0.00842304u

+ 0.168232u

+ ··· − 43.3018u − 18.3994

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

64(64u

− 256u

+ ··· + 15u − 1)

, c

− u

+ ··· + 17u − 5

, c

− 3u

+ ··· − 834u + 178

, c

− 3u

+ ··· + 38u + 10

+ 9u

+ ··· − 58478u − 6110

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

4096(4096y

− 73728y

+ ··· − 391y + 1)

, c

− 19y

+ ··· − 749y + 25

, c

+ 31y

+ ··· − 180424y + 31684

, c

− 33y

+ ··· + 896y + 100

+ 3y

+ ··· − 52394384y + 37332100

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.832821 + 0.547125I

a = −0.86558 − 1.12589I

b = −0.800463 + 0.066461I

−9.55612 − 8.85033I −14.7980 + 4.0064I

u = −0.832821 − 0.547125I

a = −0.86558 + 1.12589I

b = −0.800463 − 0.066461I

−9.55612 + 8.85033I −14.7980 − 4.0064I

u = 0.758122 + 0.726911I

a = −0.598468 + 0.868086I

b = −0.909897 − 0.239586I

−3.21428 + 2.58317I −14.0149 − 7.3951I

u = 0.758122 − 0.726911I

a = −0.598468 − 0.868086I

b = −0.909897 + 0.239586I

−3.21428 − 2.58317I −14.0149 + 7.3951I

u = −0.254953 + 1.055630I

a = 0.191552 + 1.039430I

b = 0.408014 − 0.285100I

−5.53222 − 1.14690I −22.5523 + 4.7902I

u = −0.254953 − 1.055630I

a = 0.191552 − 1.039430I

b = 0.408014 + 0.285100I

−5.53222 + 1.14690I −22.5523 − 4.7902I

u = 0.377700 + 0.817120I

a = 0.930523 − 0.994516I

b = 1.103510 + 0.283151I

−2.13828 − 7.70452I −10.95675 + 8.64865I

u = 0.377700 − 0.817120I

a = 0.930523 + 0.994516I

b = 1.103510 − 0.283151I

−2.13828 + 7.70452I −10.95675 − 8.64865I

u = −0.304901 + 0.821700I

a = 1.12461 + 1.25299I

b = 1.316850 − 0.071626I

−7.8932 + 13.6180I −12.3598 − 8.2723I

u = −0.304901 − 0.821700I

a = 1.12461 − 1.25299I

b = 1.316850 + 0.071626I

−7.8932 − 13.6180I −12.3598 + 8.2723I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.191870 + 0.245310I

a = −0.597452 − 0.473091I

b = −1.368890 + 0.168011I

−0.40005 − 4.16689I −6.41890 + 7.16086I

u = 1.191870 − 0.245310I

a = −0.597452 + 0.473091I

b = −1.368890 − 0.168011I

−0.40005 + 4.16689I −6.41890 − 7.16086I

u = −1.096270 + 0.573423I

a = −0.932566 − 0.275848I

b = −1.361430 − 0.074950I

−8.26421 + 6.83120I −17.2078 − 8.7853I

u = −1.096270 − 0.573423I

a = −0.932566 + 0.275848I

b = −1.361430 + 0.074950I

−8.26421 − 6.83120I −17.2078 + 8.7853I

u = −1.244400 + 0.106432I

a = −0.500503 + 0.821730I

b = −1.86027 + 0.16899I

−2.57552 + 1.10250I −12.15322 + 1.49488I

u = −1.244400 − 0.106432I

a = −0.500503 − 0.821730I

b = −1.86027 − 0.16899I

−2.57552 − 1.10250I −12.15322 − 1.49488I

u = −0.737757

a = 0.738275

b = 0.681107

−1.10279 −8.36790

u = 1.288170 + 0.175763I

a = 0.202837 − 0.012188I

b = 0.693144 + 1.009580I

−4.92002 − 2.79762I −16.6701 + 3.7773I

u = 1.288170 − 0.175763I

a = 0.202837 + 0.012188I

b = 0.693144 − 1.009580I

−4.92002 + 2.79762I −16.6701 − 3.7773I

u = 0.062119 + 0.674628I

a = −1.066350 − 0.720953I

b = −0.548733 − 0.123939I

3.02249 + 0.79229I −0.26606 − 2.46888I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.062119 − 0.674628I

a = −1.066350 + 0.720953I

b = −0.548733 + 0.123939I

3.02249 − 0.79229I −0.26606 + 2.46888I

u = −1.307770 + 0.250331I

a = 0.089765 + 0.665827I

b = −0.340750 + 0.653216I

−1.25101 + 2.53582I −5.26256 − 1.09268I

u = −1.307770 − 0.250331I

a = 0.089765 − 0.665827I

b = −0.340750 − 0.653216I

−1.25101 − 2.53582I −5.26256 + 1.09268I

u = 1.376180 + 0.215614I

a = −0.007963 − 1.118930I

b = −0.93586 − 1.62045I

−4.46084 − 3.77438I −17.8969 + 4.8599I

u = 1.376180 − 0.215614I

a = −0.007963 + 1.118930I

b = −0.93586 + 1.62045I

−4.46084 + 3.77438I −17.8969 − 4.8599I

u = −0.181936 + 0.531158I

a = −2.10293 + 1.17618I

b = −0.852184 + 0.229977I

0.533620 + 0.994797I −12.5887 − 7.1482I

u = −0.181936 − 0.531158I

a = −2.10293 − 1.17618I

b = −0.852184 − 0.229977I

0.533620 − 0.994797I −12.5887 + 7.1482I

u = 1.43812 + 0.32819I

a = 1.024740 + 0.167678I

b = 3.38065 − 0.99960I

−13.4573 − 17.7785I −15.9854 + 8.9050I

u = 1.43812 − 0.32819I

a = 1.024740 − 0.167678I

b = 3.38065 + 0.99960I

−13.4573 + 17.7785I −15.9854 − 8.9050I

u = −1.46219 + 0.31744I

a = 0.886952 − 0.098679I

b = 3.18286 + 0.68484I

−8.0205 + 11.8161I −14.4580 − 8.0646I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −1.46219 − 0.31744I

a = 0.886952 + 0.098679I

b = 3.18286 − 0.68484I

−8.0205 − 11.8161I −14.4580 + 8.0646I

u = 1.53956 + 0.03471I

a = −0.926435 + 0.236128I

b = −3.32141 + 0.36741I

−17.7030 + 7.3147I −19.0498 − 4.2883I

u = 1.53956 − 0.03471I

a = −0.926435 − 0.236128I

b = −3.32141 − 0.36741I

−17.7030 − 7.3147I −19.0498 + 4.2883I

u = 1.51262 + 0.38346I

a = 0.770644 − 0.138564I

b = 2.50061 − 0.54552I

−11.37270 − 4.09288I −21.9706 + 0.I

u = 1.51262 − 0.38346I

a = 0.770644 + 0.138564I

b = 2.50061 + 0.54552I

−11.37270 + 4.09288I −21.9706 + 0.I

u = −1.61211

a = −0.778308

b = −3.05374

−12.1718 −21.8720

u = −0.184289 + 0.301680I

a = 1.096640 − 0.014738I

b = −0.099433 − 0.437896I

−0.612808 + 0.881258I −10.27041 − 7.59569I

u = −0.184289 − 0.301680I

a = 1.096640 + 0.014738I

b = −0.099433 + 0.437896I

−0.612808 − 0.881258I −10.27041 + 7.59569I

II.

= h2u

a−3u

+· · · + a−9, u

+2u

+· · · − a+2, u

+· · · − u+1i

(i) Arc colorings















−

a +

+ ··· −

a +





+ u

+ ··· + 3u − 1

a −

+ ··· +

a −





− 9u

+ 33u

− 60u

+ 48u

+ 3u

− 25u

+ 2u

+ 9u

− u

− 1

− 8u

+ 26u

− 42u

+ 31u

− 2u

− 8u

− 2u

+ 5u









−u

+ 1

−u





a +

+ ··· +

a +

+ ··· +

a +





− 10u

+ ··· − 6u

− u

− 9u

+ ··· − 2u

− u





−u

+ 2u

−u

+ u





a +

+ ··· +

a −

a +

+ ··· +

a +



(ii) Obstruction class = −1

(iii) Cusp Shapes = 4u

− 52u

+ 4u

+ 292u

− 48u

− 912u

+ 244u

1684u

−672u

−1752u

+ 1056u

+ 752u

−896u

+ 212u

+ 332u

−180u

−

64u

− 156u

+ 112u

+ 96u

− 64u

+ 20u

+ 8u

− 8u

− 20u

+ 12u − 14

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

25(25u

+ 175u

+ ··· − 6914990u + 533119)

, c

− u

+ ··· + 2u

+ 1

, c

+ u

+ ··· + u + 1)

, c

+ u

+ ··· − u + 1)

− 3u

+ ··· − u + 1)

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

625

· (625y

− 20625y

+ ··· − 3671828841416y + 284215868161)

, c

− 41y

+ ··· + 4y + 1

, c

+ 25y

+ ··· + 3y + 1)

, c

− 27y

+ ··· + 3y + 1)

+ y

+ ··· − y + 1)

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.006930 + 0.206480I

a = 1.106440 + 0.089649I

b = 0.700491 + 0.212708I

−4.85148 − 3.89629I −11.54228 + 4.15365I

u = 1.006930 + 0.206480I

a = −0.062835 − 0.576338I

b = 0.716396 + 0.426617I

−4.85148 − 3.89629I −11.54228 + 4.15365I

u = 1.006930 − 0.206480I

a = 1.106440 − 0.089649I

b = 0.700491 − 0.212708I

−4.85148 + 3.89629I −11.54228 − 4.15365I

u = 1.006930 − 0.206480I

a = −0.062835 + 0.576338I

b = 0.716396 − 0.426617I

−4.85148 + 3.89629I −11.54228 − 4.15365I

u = −0.832034 + 0.169903I

a = 0.837632 + 0.478792I

b = 0.728628 − 0.013221I

−1.081760 − 0.029483I −7.62798 − 0.47071I

u = −0.832034 + 0.169903I

a = 0.541539 − 0.269552I

b = 0.764830 − 0.085001I

−1.081760 − 0.029483I −7.62798 − 0.47071I

u = −0.832034 − 0.169903I

a = 0.837632 − 0.478792I

b = 0.728628 + 0.013221I

−1.081760 + 0.029483I −7.62798 + 0.47071I

u = −0.832034 − 0.169903I

a = 0.541539 + 0.269552I

b = 0.764830 + 0.085001I

−1.081760 + 0.029483I −7.62798 + 0.47071I

u = 0.266850 + 0.721202I

a = 1.39335 + 0.53326I

b = 0.755461 + 0.165673I

−3.58803 − 7.69168I −9.96957 + 6.90287I

u = 0.266850 + 0.721202I

a = −1.34228 + 1.44900I

b = −1.176110 + 0.077817I

−3.58803 − 7.69168I −9.96957 + 6.90287I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.266850 − 0.721202I

a = 1.39335 − 0.53326I

b = 0.755461 − 0.165673I

−3.58803 + 7.69168I −9.96957 − 6.90287I

u = 0.266850 − 0.721202I

a = −1.34228 − 1.44900I

b = −1.176110 − 0.077817I

−3.58803 + 7.69168I −9.96957 − 6.90287I

u = 0.703536 + 0.310326I

a = 0.375402 + 1.132660I

b = 0.726738 + 0.185162I

−5.20234 + 3.85600I −12.77500 − 2.05029I

u = 0.703536 + 0.310326I

a = 1.35245 − 1.17888I

b = 0.727398 − 0.288938I

−5.20234 + 3.85600I −12.77500 − 2.05029I

u = 0.703536 − 0.310326I

a = 0.375402 − 1.132660I

b = 0.726738 − 0.185162I

−5.20234 − 3.85600I −12.77500 + 2.05029I

u = 0.703536 − 0.310326I

a = 1.35245 + 1.17888I

b = 0.727398 + 0.288938I

−5.20234 − 3.85600I −12.77500 + 2.05029I

u = −0.228391 + 0.710789I

a = 0.824807 − 0.489046I

b = 0.348965 + 0.017513I

0.89469 + 3.64220I −4.89571 − 4.72167I

u = −0.228391 + 0.710789I

a = −0.98019 − 1.20859I

b = −1.058380 + 0.072042I

0.89469 + 3.64220I −4.89571 − 4.72167I

u = −0.228391 − 0.710789I

a = 0.824807 + 0.489046I

b = 0.348965 − 0.017513I

0.89469 − 3.64220I −4.89571 + 4.72167I

u = −0.228391 − 0.710789I

a = −0.98019 + 1.20859I

b = −1.058380 − 0.072042I

0.89469 − 3.64220I −4.89571 + 4.72167I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.169829 + 0.699155I

a = −0.27507 + 1.43355I

b = −0.982543 + 0.271641I

−2.35081 + 0.37332I −7.79326 + 0.53471I

u = 0.169829 + 0.699155I

a = −0.129943 − 0.165869I

b = −0.264670 − 0.891458I

−2.35081 + 0.37332I −7.79326 + 0.53471I

u = 0.169829 − 0.699155I

a = −0.27507 − 1.43355I

b = −0.982543 − 0.271641I

−2.35081 − 0.37332I −7.79326 − 0.53471I

u = 0.169829 − 0.699155I

a = −0.129943 + 0.165869I

b = −0.264670 + 0.891458I

−2.35081 − 0.37332I −7.79326 − 0.53471I

u = −0.379833 + 0.540597I

a = 1.91795 + 1.04697I

b = 1.285490 + 0.431592I

−8.44109 + 1.73295I −15.3118 − 4.0988I

u = −0.379833 + 0.540597I

a = −0.70200 − 2.19064I

b = −0.195589 − 0.222195I

−8.44109 + 1.73295I −15.3118 − 4.0988I

u = −0.379833 − 0.540597I

a = 1.91795 − 1.04697I

b = 1.285490 − 0.431592I

−8.44109 − 1.73295I −15.3118 + 4.0988I

u = −0.379833 − 0.540597I

a = −0.70200 + 2.19064I

b = −0.195589 + 0.222195I

−8.44109 − 1.73295I −15.3118 + 4.0988I

u = 1.351750 + 0.104838I

a = 0.918606 − 0.092731I

b = 3.58585 − 0.17980I

−6.82103 − 0.39832I −11.93478 − 1.62643I

u = 1.351750 + 0.104838I

a = −0.387734 + 0.353048I

b = 0.384313 − 0.303024I

−6.82103 − 0.39832I −11.93478 − 1.62643I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.351750 − 0.104838I

a = 0.918606 + 0.092731I

b = 3.58585 + 0.17980I

−6.82103 + 0.39832I −11.93478 + 1.62643I

u = 1.351750 − 0.104838I

a = −0.387734 − 0.353048I

b = 0.384313 + 0.303024I

−6.82103 + 0.39832I −11.93478 + 1.62643I

u = −1.363600 + 0.194579I

a = −0.776181 − 0.304313I

b = −3.24492 + 0.96961I

−8.06303 + 3.51597I −14.7951 − 5.1228I

u = −1.363600 + 0.194579I

a = 0.815095 − 0.090094I

b = 3.99423 + 2.25543I

−8.06303 + 3.51597I −14.7951 − 5.1228I

u = −1.363600 − 0.194579I

a = −0.776181 + 0.304313I

b = −3.24492 − 0.96961I

−8.06303 − 3.51597I −14.7951 + 5.1228I

u = −1.363600 − 0.194579I

a = 0.815095 + 0.090094I

b = 3.99423 − 2.25543I

−8.06303 − 3.51597I −14.7951 + 5.1228I

u = −1.360050 + 0.270550I

a = −0.801459 − 0.128170I

b = −3.02150 − 2.03985I

−7.18585 + 3.12979I −12.91872 − 1.86186I

u = −1.360050 + 0.270550I

a = 0.231493 − 0.068682I

b = −0.845504 + 1.046880I

−7.18585 + 3.12979I −12.91872 − 1.86186I

u = −1.360050 − 0.270550I

a = −0.801459 + 0.128170I

b = −3.02150 + 2.03985I

−7.18585 − 3.12979I −12.91872 + 1.86186I

u = −1.360050 − 0.270550I

a = 0.231493 + 0.068682I

b = −0.845504 − 1.046880I

−7.18585 − 3.12979I −12.91872 + 1.86186I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.39028 + 0.28253I

a = −0.893925 − 0.133521I

b = −3.12549 + 0.97945I

−4.25247 − 7.24749I −9.92864 + 5.63452I

u = 1.39028 + 0.28253I

a = 0.082294 + 0.578132I

b = 0.382082 + 0.552723I

−4.25247 − 7.24749I −9.92864 + 5.63452I

u = 1.39028 − 0.28253I

a = −0.893925 + 0.133521I

b = −3.12549 − 0.97945I

−4.25247 + 7.24749I −9.92864 − 5.63452I

u = 1.39028 − 0.28253I

a = 0.082294 − 0.578132I

b = 0.382082 − 0.552723I

−4.25247 + 7.24749I −9.92864 − 5.63452I

u = −1.42059 + 0.09196I

a = 1.085040 + 0.253869I

b = 3.38504 + 0.97196I

−11.61500 − 2.69486I −17.4134 + 2.4278I

u = −1.42059 + 0.09196I

a = −0.272288 − 0.773726I

b = 0.134709 − 1.163670I

−11.61500 − 2.69486I −17.4134 + 2.4278I

u = −1.42059 − 0.09196I

a = 1.085040 − 0.253869I

b = 3.38504 − 0.97196I

−11.61500 + 2.69486I −17.4134 − 2.4278I

u = −1.42059 − 0.09196I

a = −0.272288 + 0.773726I

b = 0.134709 + 1.163670I

−11.61500 + 2.69486I −17.4134 − 2.4278I

u = −1.40881 + 0.28598I

a = 0.178934 − 0.868467I

b = 1.10783 − 1.01091I

−8.9306 + 11.3520I −14.5534 − 7.3132I

u = −1.40881 + 0.28598I

a = −1.104570 + 0.226478I

b = −3.42336 − 0.88023I

−8.9306 + 11.3520I −14.5534 − 7.3132I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −1.40881 − 0.28598I

a = 0.178934 + 0.868467I

b = 1.10783 + 1.01091I

−8.9306 − 11.3520I −14.5534 + 7.3132I

u = −1.40881 − 0.28598I

a = −1.104570 − 0.226478I

b = −3.42336 + 0.88023I

−8.9306 − 11.3520I −14.5534 + 7.3132I

u = 1.42434 + 0.20546I

a = 1.029910 + 0.423098I

b = 3.20762 − 0.64618I

−14.1830 − 4.4767I −19.0263 + 3.5734I

u = 1.42434 + 0.20546I

a = −1.070140 + 0.500011I

b = −2.72487 + 1.14691I

−14.1830 − 4.4767I −19.0263 + 3.5734I

u = 1.42434 − 0.20546I

a = 1.029910 − 0.423098I

b = 3.20762 + 0.64618I

−14.1830 + 4.4767I −19.0263 − 3.5734I

u = 1.42434 − 0.20546I

a = −1.070140 − 0.500011I

b = −2.72487 − 1.14691I

−14.1830 + 4.4767I −19.0263 − 3.5734I

u = 0.179795 + 0.471439I

a = 1.11876 − 1.63717I

b = 1.72380 − 0.44845I

−3.15470 − 0.99510I −9.51394 + 6.82295I

u = 0.179795 + 0.471439I

a = −0.51110 + 2.18288I

b = −0.096933 − 0.875944I

−3.15470 − 0.99510I −9.51394 + 6.82295I

u = 0.179795 − 0.471439I

a = 1.11876 + 1.63717I

b = 1.72380 + 0.44845I

−3.15470 + 0.99510I −9.51394 − 6.82295I

u = 0.179795 − 0.471439I

a = −0.51110 − 2.18288I

b = −0.096933 + 0.875944I

−3.15470 + 0.99510I −9.51394 − 6.82295I

III. I

= hu

+ u

− u

+ 2b − u + 1, u

− 2u

+ a + 1, u

− 3u

+ 2u

+ 1i

(i) Arc colorings















−u

+ 2u

− 1

−

+ ··· +

u −





−u

+ 3u

− 2u

−u

−

+ 2u

+ u





−2u

+ 4u

− 2

−2u

− u

+ 2u

+ u









−u

+ 1

−u





−

+ 4u

+ ··· −

u +

−

+ ··· +





−2u

+ 6u

− u

− 4u + 1

−2u

− u

+ 4u

+ u





−u

+ 2u

−u

+ u





−u

+ 2u

− u −

− u



(ii) Obstruction class = 1

(iii) Cusp Shapes = 4u

− 8u

− 8

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

64(64u

− 192u

+ 256u

− 192u

+ 92u

− 28u + 5)

, c

+ 1)

, c

− 3u

+ 2u

+ 1

+ u

+ 2u

+ 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

4096(4096y

− 4096y

+ 3584y

+ 128y

+ 272y

+ 136y + 25)

, c

(y + 1)

, c

− 3y

+ 2y + 1)

+ y

+ 2y + 1)

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.307140 + 0.215080I

a = −0.122561 − 0.744862I

b = −1.26489 − 1.09229I

−3.02413 − 2.82812I −11.50976 + 2.97945I

u = 1.307140 − 0.215080I

a = −0.122561 + 0.744862I

b = −1.26489 + 1.09229I

−3.02413 + 2.82812I −11.50976 − 2.97945I

u = −1.307140 + 0.215080I

a = −0.122561 + 0.744862I

b = −0.520029 + 0.214851I

−3.02413 + 2.82812I −11.50976 − 2.97945I

u = −1.307140 − 0.215080I

a = −0.122561 − 0.744862I

b = −0.520029 − 0.214851I

−3.02413 − 2.82812I −11.50976 + 2.97945I

u = 0.569840I

a = −1.75488

b = −0.715080 + 0.377439I

1.11345 −4.98050

u = − 0.569840I

a = −1.75488

b = −0.715080 − 0.377439I

1.11345 −4.98050

IV. I

= ha, b − 1, v + 1i

(i) Arc colorings







−1













−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

, c

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

v = −1.00000

a = 0

b = 1.00000

−3.28987 −12.0000

V. u-Polynomials

Crossings u-Polynomials at each crossing

, c

102400(u − 1)(64u

− 192u

+ 256u

− 192u

+ 92u

− 28u + 5)

· (64u

− 256u

+ ··· + 15u − 1)

· (25u

+ 175u

+ ··· − 6914990u + 533119)

, c

(u − 1)(u

+ 1)

− u

+ ··· + 17u − 5)(u

− u

+ ··· + 2u

+ 1)

, c

u(u

+ 1)

+ u

+ ··· + u + 1)

− 3u

+ ··· − 834u + 178)

, c

u(u

− 3u

+ 2u

+ 1)(u

+ u

+ ··· − u + 1)

· (u

− 3u

+ ··· + 38u + 10)

, c

(u + 1)(u

+ 1)

− u

+ ··· + 17u − 5)(u

− u

+ ··· + 2u

+ 1)

u(u

+ u

+ 2u

+ 1)(u

− 3u

+ ··· − u + 1)

· (u

+ 9u

+ ··· − 58478u − 6110)

VI. Riley Polynomials

Crossings Riley Polynomials at each crossing

, c

10485760000(y −1)

· (4096y

− 4096y

+ 3584y

+ 128y

+ 272y

+ 136y + 25)

· (4096y

− 73728y

+ ··· − 391y + 1)

· (625y

− 20625y

+ ··· − 3671828841416y + 284215868161)

, c

(y −1)(y + 1)

− 19y

+ ··· − 749y + 25)

· (y

− 41y

+ ··· + 4y + 1)

, c

y(y + 1)

+ 25y

+ ··· + 3y + 1)

· (y

+ 31y

+ ··· − 180424y + 31684)

, c

y(y

− 3y

+ 2y + 1)

− 27y

+ ··· + 3y + 1)

· (y

− 33y

+ ··· + 896y + 100)

y(y

+ y

+ 2y + 1)

+ y

+ ··· − y + 1)

· (y

+ 3y

+ ··· − 52394384y + 37332100)