12n

0613

(K12n

0613

)

A knot diagram

Linearized knot diagam

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

Solving Sequence

5,9 6,12

10 7 1 4 3 8 2 11

, c

Ideals for irreducible components

of X

par

= hb − u, 5.43932 × 10

+ 8.12908 × 10

+ ··· + 3.35339 × 10

a − 9.00124 × 10

+ u

+ ··· − 5u + 1i

= hb + u, −2006601310117u

− 1475756618264u

+ ··· + 214817393669a − 6503947392620,

+ u

+ ··· + 6u + 1i

= h2.83028 × 10

140

+ 8.71962 × 10

140

+ ··· + 1.13769 × 10

141

b − 1.39265 × 10

141

6.79051 × 10

120

+ 2.06789 × 10

121

+ ··· + 6.50621 × 10

120

a − 3.02432 × 10

121

, u

+ 3u

+ ··· − 14u + 1i

* 3 irreducible components of dim

= 0, with total 102 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

= hb − u, 5.44 × 10

+ 8.13 × 10

+ · · · + 3.35 × 10

a − 9.00 ×

, u

+ u

+ · · · − 5u + 1i

(i) Arc colorings















−1.62204u

− 2.42414u

+ ··· − 16.2084u + 2.68422





−5.53414u

− 6.62833u

+ ··· − 35.0052u + 20.9674

0.249234u

+ 0.273240u

+ ··· + 3.38846u − 0.802100





−7.19778u

− 9.20184u

+ ··· − 52.2087u + 21.0419

0.101749u

+ 0.189658u

+ ··· + 1.30173u + 0.191010





−1.62204u

− 2.42414u

+ ··· − 17.2084u + 2.68422





0.441611u

+ 0.993111u

+ ··· + 10.9819u + 4.63637

0.0376695u

+ 0.0100421u

+ ··· + 1.01416u − 0.742510





0.543360u

+ 1.18277u

+ ··· + 12.2837u + 4.82738

0.0198247u

− 0.00142549u

+ ··· + 1.35196u − 0.830419





−6.03260u

− 7.17481u

+ ··· − 39.7822u + 22.5716

0.249234u

+ 0.273240u

+ ··· + 3.38846u − 0.802100





−8.35596u

− 10.3141u

+ ··· − 49.1564u + 32.2862

0.207248u

+ 0.365116u

+ ··· + 2.95393u − 0.843951





−5.04086u

− 6.12139u

+ ··· − 31.6800u + 19.0711

0.257866u

+ 0.306994u

+ ··· + 2.96350u − 0.815763



(ii) Obstruction class = −1

(iii) Cusp Shapes = 7.99213u

+ 9.89259u

+ ··· + 52.3956u − 21.8422

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

+ 16u

+ ··· − 384u + 256

, c

− 8u

+ ··· − 128u + 16

+ 22u

+ ··· + 27648u + 4096

− 8u

+ ··· + 7u − 6

, c

+ u

+ ··· − 5u + 1

, c

− 23u

+ ··· − 9u

+ 1

− 24u

+ ··· − 24064u − 2544

− 21u

+ ··· − 992u + 64

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

+ 4y

+ ··· − 614400y + 65536

, c

− 16y

+ ··· + 384y + 256

− 30y

+ ··· − 131072000y + 16777216

− 16y

+ ··· − 661y + 36

, c

+ 3y

+ ··· − 11y + 1

, c

− 46y

+ ··· − 18y + 1

+ 14y

+ ··· − 3117275776y + 6471936

+ 9y

+ ··· + 39936y + 4096

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.390564 + 0.967977I

a = −1.60621 − 0.49572I

b = −0.390564 + 0.967977I

9.63313 + 1.78314I 5.24416 − 2.15129I

u = −0.390564 − 0.967977I

a = −1.60621 + 0.49572I

b = −0.390564 − 0.967977I

9.63313 − 1.78314I 5.24416 + 2.15129I

u = −0.859015 + 0.595187I

a = −0.70225 − 1.35017I

b = −0.859015 + 0.595187I

3.11013 + 9.06642I −0.91274 − 7.85173I

u = −0.859015 − 0.595187I

a = −0.70225 + 1.35017I

b = −0.859015 − 0.595187I

3.11013 − 9.06642I −0.91274 + 7.85173I

u = −0.519398 + 0.932460I

a = −0.647989 − 0.004890I

b = −0.519398 + 0.932460I

1.88830 + 3.18747I 4.96056 − 5.55794I

u = −0.519398 − 0.932460I

a = −0.647989 + 0.004890I

b = −0.519398 − 0.932460I

1.88830 − 3.18747I 4.96056 + 5.55794I

u = 0.275358 + 0.858528I

a = 0.738399 − 0.042001I

b = 0.275358 + 0.858528I

2.15595 + 1.03231I 4.92013 − 2.65648I

u = 0.275358 − 0.858528I

a = 0.738399 + 0.042001I

b = 0.275358 − 0.858528I

2.15595 − 1.03231I 4.92013 + 2.65648I

u = 0.657277 + 0.519284I

a = 0.91075 − 1.90121I

b = 0.657277 + 0.519284I

5.54728 − 3.21063I 1.80460 + 6.59174I

u = 0.657277 − 0.519284I

a = 0.91075 + 1.90121I

b = 0.657277 − 0.519284I

5.54728 + 3.21063I 1.80460 − 6.59174I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.791811

a = −1.98040

b = −0.791811

−1.01617 −9.04870

u = −0.755035

a = −0.694813

b = −0.755035

−1.77548 −4.53550

u = 0.621825 + 1.097920I

a = 1.294920 − 0.198954I

b = 0.621825 + 1.097920I

9.99995 − 7.71025I 4.49240 + 6.45370I

u = 0.621825 − 1.097920I

a = 1.294920 + 0.198954I

b = 0.621825 − 1.097920I

9.99995 + 7.71025I 4.49240 − 6.45370I

u = 0.313313 + 0.638057I

a = −1.166610 − 0.622327I

b = 0.313313 + 0.638057I

−2.47132 − 5.60513I −2.05099 + 8.20859I

u = 0.313313 − 0.638057I

a = −1.166610 + 0.622327I

b = 0.313313 − 0.638057I

−2.47132 + 5.60513I −2.05099 − 8.20859I

u = −0.956018 + 0.923610I

a = −0.573225 + 0.070285I

b = −0.956018 + 0.923610I

−0.91090 + 3.64926I 4.33113 − 1.37429I

u = −0.956018 − 0.923610I

a = −0.573225 − 0.070285I

b = −0.956018 − 0.923610I

−0.91090 − 3.64926I 4.33113 + 1.37429I

u = 1.086610 + 0.795029I

a = 0.574623 + 0.109929I

b = 1.086610 + 0.795029I

−4.85287 + 0.14998I −1.49645 − 3.04413I

u = 1.086610 − 0.795029I

a = 0.574623 − 0.109929I

b = 1.086610 − 0.795029I

−4.85287 − 0.14998I −1.49645 + 3.04413I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −1.06617 + 0.94422I

a = −1.051680 + 0.248881I

b = −1.06617 + 0.94422I

1.89136 + 7.99794I −1.89042 − 4.55066I

u = −1.06617 − 0.94422I

a = −1.051680 − 0.248881I

b = −1.06617 − 0.94422I

1.89136 − 7.99794I −1.89042 + 4.55066I

u = −0.075680 + 0.568202I

a = 1.265330 − 0.049232I

b = −0.075680 + 0.568202I

0.51553 + 1.38561I 2.36633 − 4.82018I

u = −0.075680 − 0.568202I

a = 1.265330 + 0.049232I

b = −0.075680 − 0.568202I

0.51553 − 1.38561I 2.36633 + 4.82018I

u = 1.03468 + 1.01787I

a = 0.546848 + 0.069159I

b = 1.03468 + 1.01787I

−3.90029 − 8.39051I 2.20035 + 3.96164I

u = 1.03468 − 1.01787I

a = 0.546848 − 0.069159I

b = 1.03468 − 1.01787I

−3.90029 + 8.39051I 2.20035 − 3.96164I

u = 1.09517 + 1.16567I

a = 0.950401 + 0.099835I

b = 1.09517 + 1.16567I

7.31268 − 11.42420I 0

u = 1.09517 − 1.16567I

a = 0.950401 − 0.099835I

b = 1.09517 − 1.16567I

7.31268 + 11.42420I 0

u = −1.21195 + 1.18977I

a = −0.876418 + 0.125795I

b = −1.21195 + 1.18977I

4.7481 + 16.9486I 0

u = −1.21195 − 1.18977I

a = −0.876418 − 0.125795I

b = −1.21195 − 1.18977I

4.7481 − 16.9486I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.267983 + 0.096022I

a = −3.81929 − 5.94198I

b = 0.267983 + 0.096022I

−2.01749 + 2.84138I −3.8195 + 16.5875I

u = 0.267983 − 0.096022I

a = −3.81929 + 5.94198I

b = 0.267983 − 0.096022I

−2.01749 − 2.84138I −3.8195 − 16.5875I

II. I

= hb + u, −2.01 × 10

− 1.48 × 10

+ · · · + 2.15 × 10

a −

6.50 × 10

, u

+ u

+ · · · + 6u + 1i

(i) Arc colorings















9.34096u

+ 6.86982u

+ ··· + 89.6739u + 30.2766

−u





14.5794u

+ 8.87809u

+ ··· + 142.535u + 28.7075

0.590428u

+ 0.491225u

+ ··· + 6.48590u + 2.47114





−30.2766u

− 20.9357u

+ ··· − 297.306u − 90.9859

−0.439803u

− 0.428977u

+ ··· − 4.50594u − 2.28936





9.34096u

+ 6.86982u

+ ··· + 90.6739u + 30.2766

−u





−8.47114u

− 6.88072u

+ ··· − 81.7691u − 36.3410

0.340599u

+ 0.259687u

+ ··· + 3.43451u + 0.698927





−8.91095u

− 7.30969u

+ ··· − 86.2751u − 38.6303

0.499053u

+ 0.260079u

+ ··· + 3.80936u + 0.688101





13.3986u

+ 7.89564u

+ ··· + 131.564u + 23.7653

0.590428u

+ 0.491225u

+ ··· + 6.48590u + 2.47114





20.5604u

+ 11.9205u

+ ··· + 201.038u + 37.4919

1.44804u

+ 0.929665u

+ ··· + 12.8961u + 4.26770





13.2901u

+ 8.02853u

+ ··· + 129.393u + 25.4774

0.579602u

+ 0.321944u

+ ··· + 5.13644u + 2.03134



(ii) Obstruction class = 1

(iii) Cusp Shapes

= −

8090826551153

214817393669

−

5909957309789

214817393669

+ ··· −

76582895018229

214817393669

u −

30531044823813

214817393669

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

− 13u

+ ··· − 8u + 1

+ u

+ ··· − 4u

+ 1

+ 15u

+ ··· + 132u + 29

− 5u

+ ··· − 19u + 13

, c

+ u

+ ··· + 6u + 1

, c

− 2u

+ ··· − u + 1

− u

+ ··· − 4u

+ 1

− 3u

+ ··· − 8u

+ 1

− 10u

+ ··· + 3u

+ 1

+ 2u

+ ··· + u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

+ 3y

+ ··· − 8y + 1

, c

− 13y

+ ··· − 8y + 1

− 23y

+ ··· − 7738y + 841

− 10y

+ ··· + 1017y + 169

, c

− 7y

+ ··· − 20y + 1

, c

− 12y

+ ··· + 17y + 1

+ 13y

+ ··· − 16y + 1

+ 8y

+ ··· + 6y + 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.858443 + 0.472828I

a = −0.268594 − 0.545737I

b = 0.858443 − 0.472828I

6.63217 − 1.18036I 3.98252 − 0.95830I

u = −0.858443 − 0.472828I

a = −0.268594 + 0.545737I

b = 0.858443 + 0.472828I

6.63217 + 1.18036I 3.98252 + 0.95830I

u = −0.969570 + 0.104792I

a = 0.958370 − 1.015960I

b = 0.969570 − 0.104792I

−4.48502 + 5.07387I −8.63863 − 8.30587I

u = −0.969570 − 0.104792I

a = 0.958370 + 1.015960I

b = 0.969570 + 0.104792I

−4.48502 − 5.07387I −8.63863 + 8.30587I

u = −0.362670 + 0.880683I

a = 0.684664 − 0.540153I

b = 0.362670 − 0.880683I

4.53253 − 2.07273I 8.32895 + 4.83845I

u = −0.362670 − 0.880683I

a = 0.684664 + 0.540153I

b = 0.362670 + 0.880683I

4.53253 + 2.07273I 8.32895 − 4.83845I

u = 0.647068 + 0.985785I

a = −0.320022 − 0.399758I

b = −0.647068 − 0.985785I

3.43411 − 0.50011I 2.53542 + 4.24945I

u = 0.647068 − 0.985785I

a = −0.320022 + 0.399758I

b = −0.647068 + 0.985785I

3.43411 + 0.50011I 2.53542 − 4.24945I

u = 1.153990 + 0.411356I

a = −0.864989 − 0.491617I

b = −1.153990 − 0.411356I

−2.39449 − 2.98768I 1.98501 + 3.10922I

u = 1.153990 − 0.411356I

a = −0.864989 + 0.491617I

b = −1.153990 + 0.411356I

−2.39449 + 2.98768I 1.98501 − 3.10922I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.027480 + 0.719532I

a = 0.048327 − 0.358842I

b = −1.027480 − 0.719532I

4.91059 + 5.90541I 1.71844 − 3.95716I

u = 1.027480 − 0.719532I

a = 0.048327 + 0.358842I

b = −1.027480 + 0.719532I

4.91059 − 5.90541I 1.71844 + 3.95716I

u = 0.470860 + 0.507733I

a = −2.04467 + 0.62131I

b = −0.470860 − 0.507733I

−0.39120 − 2.98356I −1.48889 + 12.19524I

u = 0.470860 − 0.507733I

a = −2.04467 − 0.62131I

b = −0.470860 + 0.507733I

−0.39120 + 2.98356I −1.48889 − 12.19524I

u = 1.015410 + 0.828466I

a = −0.835698 − 0.057216I

b = −1.015410 − 0.828466I

−1.82515 − 4.29426I −2.89416 + 5.12116I

u = 1.015410 − 0.828466I

a = −0.835698 + 0.057216I

b = −1.015410 + 0.828466I

−1.82515 + 4.29426I −2.89416 − 5.12116I

u = −1.23379 + 0.77502I

a = 0.728855 − 0.197315I

b = 1.23379 − 0.77502I

−5.39649 + 0.76944I −5.69205 − 1.85880I

u = −1.23379 − 0.77502I

a = 0.728855 + 0.197315I

b = 1.23379 + 0.77502I

−5.39649 − 0.76944I −5.69205 + 1.85880I

u = −1.08883 + 0.97192I

a = 0.712895 − 0.033605I

b = 1.08883 − 0.97192I

−4.58982 + 8.86717I −6.46501 − 9.30335I

u = −1.08883 − 0.97192I

a = 0.712895 + 0.033605I

b = 1.08883 + 0.97192I

−4.58982 − 8.86717I −6.46501 + 9.30335I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.301500 + 0.088234I

a = 1.20086 + 7.48943I

b = 0.301500 − 0.088234I

−2.07217 + 2.98695I −23.8716 − 31.2516I

u = −0.301500 − 0.088234I

a = 1.20086 − 7.48943I

b = 0.301500 + 0.088234I

−2.07217 − 2.98695I −23.8716 + 31.2516I

III. I

= h2.83 × 10

140

+ 8.72 × 10

140

+ · · · + 1.14 × 10

141

b − 1.39 ×

141

, 6.79 × 10

120

+ 2.07 × 10

121

+ · · · + 6.51 × 10

120

a − 3.02 ×

121

, u

+ 3u

+ · · · − 14u + 1i

(i) Arc colorings















−1.04370u

− 3.17834u

+ ··· − 112.473u + 4.64836

−0.248774u

− 0.766430u

+ ··· − 25.7903u + 1.22410





0.352601u

+ 1.15475u

+ ··· + 9.77743u + 5.15330

0.0884410u

+ 0.277756u

+ ··· + 5.39711u + 0.961781





−0.459789u

− 1.51384u

+ ··· − 18.0243u − 5.98347

−0.181840u

− 0.582355u

+ ··· − 10.3425u − 1.14025





−0.794923u

− 2.41191u

+ ··· − 86.6830u + 3.42426

−0.248774u

− 0.766430u

+ ··· − 25.7903u + 1.22410





0.641629u

+ 2.09620u

+ ··· + 28.3668u + 7.12371

0.188784u

+ 0.597549u

+ ··· + 12.0992u + 0.968939





0.459789u

+ 1.51384u

+ ··· + 18.0243u + 5.98347

0.184999u

+ 0.586827u

+ ··· + 11.7654u + 1.00577





0.182173u

+ 0.616405u

+ ··· + 2.12767u + 3.43309

0.0819875u

+ 0.260591u

+ ··· + 4.25265u + 0.758426





0.182173u

+ 0.616405u

+ ··· + 2.12767u + 3.43309

0.0524818u

+ 0.165721u

+ ··· + 2.21890u + 0.634265





0.442236u

+ 1.43983u

+ ··· + 14.1699u + 6.21203

0.0885446u

+ 0.276604u

+ ··· + 5.53392u + 0.945606



(ii) Obstruction class = −1

(iii) Cusp Shapes = −0.726576u

− 2.21182u

+ ··· − 75.1418u + 5.51596

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

+ 3u

+ 5u

+ 4u

+ 2u

+ u + 1)

, c

+ u

− u

− 2u

+ u + 1)

− 3u

+ u

+ 2u + 1)

+ u

+ ··· + 30108u + 22357

, c

+ 3u

+ ··· − 14u + 1

, c

+ u

+ ··· + 76002u + 31907

+ u

+ 1)

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ y

+ 5y

+ 6y

+ 3y + 1)

, c

− 3y

+ 5y

− 4y

+ 2y

− y + 1)

− 7y

+ 15y

− 2y + 1)

− 21y

+ ··· − 2279703318y + 499835449

, c

− 9y

+ ··· + 44y + 1

, c

− 45y

+ ··· − 3001288400y + 1018056649

+ y

+ 3y

+ 2y + 1)

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.629593 + 0.781806I

a = −1.239320 + 0.091509I

b = −1.12594 − 0.99017I

0.03467 − 4.08827I 3.88998 + 3.35903I

u = 0.629593 − 0.781806I

a = −1.239320 − 0.091509I

b = −1.12594 + 0.99017I

0.03467 + 4.08827I 3.88998 − 3.35903I

u = 0.330707 + 0.926113I

a = 0.810156 − 0.090576I

b = 1.69106 − 0.76622I

7.03641 − 0.49080I 7.54346 + 4.11452I

u = 0.330707 − 0.926113I

a = 0.810156 + 0.090576I

b = 1.69106 + 0.76622I

7.03641 + 0.49080I 7.54346 − 4.11452I

u = −1.069080 + 0.043286I

a = 0.761004 + 0.883218I

b = 1.023650 + 0.361469I

−3.74655 − 4.08827I −3.54346 + 3.35903I

u = −1.069080 − 0.043286I

a = 0.761004 − 0.883218I

b = 1.023650 − 0.361469I

−3.74655 + 4.08827I −3.54346 − 3.35903I

u = 1.023650 + 0.361469I

a = −1.019380 − 0.530277I

b = −1.069080 + 0.043286I

−3.74655 − 4.08827I −3.54346 + 3.35903I

u = 1.023650 − 0.361469I

a = −1.019380 + 0.530277I

b = −1.069080 − 0.043286I

−3.74655 + 4.08827I −3.54346 − 3.35903I

u = −1.091250 + 0.090133I

a = −0.266053 − 0.682083I

b = 0.011750 − 1.180710I

3.25520 − 2.33941I 0.11002 + 5.70297I

u = −1.091250 − 0.090133I

a = −0.266053 + 0.682083I

b = 0.011750 + 1.180710I

3.25520 + 2.33941I 0.11002 − 5.70297I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.542828 + 0.716452I

a = 1.380360 + 0.143081I

b = 0.238962 − 0.272108I

0.03467 + 2.23966I 3.88998 − 1.77057I

u = −0.542828 − 0.716452I

a = 1.380360 − 0.143081I

b = 0.238962 + 0.272108I

0.03467 − 2.23966I 3.88998 + 1.77057I

u = −0.358866 + 1.095930I

a = −0.688574 − 0.095537I

b = −1.90461 − 0.46488I

5.14581 − 4.27792I 3.82674 + 0.60183I

u = −0.358866 − 1.095930I

a = −0.688574 + 0.095537I

b = −1.90461 + 0.46488I

5.14581 + 4.27792I 3.82674 − 0.60183I

u = 0.011750 + 1.180710I

a = −0.607068 − 0.304005I

b = −1.091250 − 0.090133I

3.25520 + 2.33941I 0. − 5.70297I

u = 0.011750 − 1.180710I

a = −0.607068 + 0.304005I

b = −1.091250 + 0.090133I

3.25520 − 2.33941I 0. + 5.70297I

u = −0.755849 + 0.949728I

a = 1.024450 + 0.081577I

b = 1.36656 − 1.07638I

−1.85594 + 8.85698I 0. − 8.07537I

u = −0.755849 − 0.949728I

a = 1.024450 − 0.081577I

b = 1.36656 + 1.07638I

−1.85594 − 8.85698I 0. + 8.07537I

u = −1.030050 + 0.657859I

a = 0.988705 − 0.253254I

b = 1.41741 − 0.53201I

−3.74655 + 2.23966I −3.54346 + 0.I

u = −1.030050 − 0.657859I

a = 0.988705 + 0.253254I

b = 1.41741 + 0.53201I

−3.74655 − 2.23966I −3.54346 + 0.I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.167396 + 0.661515I

a = −0.98845 + 1.53779I

b = 0.414199 − 0.088722I

−1.85594 + 2.52906I 0.17326 − 2.94577I

u = −0.167396 − 0.661515I

a = −0.98845 − 1.53779I

b = 0.414199 + 0.088722I

−1.85594 − 2.52906I 0.17326 + 2.94577I

u = 0.388273 + 0.497540I

a = 1.242770 + 0.262742I

b = 1.39675 − 1.46025I

7.03641 − 2.33941I 7.54346 + 5.70297I

u = 0.388273 − 0.497540I

a = 1.242770 − 0.262742I

b = 1.39675 + 1.46025I

7.03641 + 2.33941I 7.54346 − 5.70297I

u = −0.490886 + 0.302457I

a = −1.174830 + 0.743568I

b = −1.32499 − 1.79381I

5.14581 + 7.10813I 3.82674 − 10.41931I

u = −0.490886 − 0.302457I

a = −1.174830 − 0.743568I

b = −1.32499 + 1.79381I

5.14581 − 7.10813I 3.82674 + 10.41931I

u = −1.12594 + 0.99017I

a = 0.827967 − 0.081233I

b = 0.629593 − 0.781806I

0.03467 + 4.08827I 0

u = −1.12594 − 0.99017I

a = 0.827967 + 0.081233I

b = 0.629593 + 0.781806I

0.03467 − 4.08827I 0

u = 1.41741 + 0.53201I

a = −0.738267 − 0.365826I

b = −1.030050 − 0.657859I

−3.74655 − 2.23966I 0

u = 1.41741 − 0.53201I

a = −0.738267 + 0.365826I

b = −1.030050 + 0.657859I

−3.74655 + 2.23966I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.414199 + 0.088722I

a = −1.51570 + 2.52480I

b = −0.167396 − 0.661515I

−1.85594 − 2.52906I 0.17326 + 2.94577I

u = 0.414199 − 0.088722I

a = −1.51570 − 2.52480I

b = −0.167396 + 0.661515I

−1.85594 + 2.52906I 0.17326 − 2.94577I

u = 0.238962 + 0.272108I

a = −3.44289 + 0.10691I

b = −0.542828 − 0.716452I

0.03467 − 2.23966I 3.88998 + 1.77057I

u = 0.238962 − 0.272108I

a = −3.44289 − 0.10691I

b = −0.542828 + 0.716452I

0.03467 + 2.23966I 3.88998 − 1.77057I

u = −0.61144 + 1.52100I

a = 0.327664 − 0.363021I

b = 0.0642708 − 0.0873744I

3.25520 − 0.49080I 0

u = −0.61144 − 1.52100I

a = 0.327664 + 0.363021I

b = 0.0642708 + 0.0873744I

3.25520 + 0.49080I 0

u = 1.36656 + 1.07638I

a = −0.708821 − 0.108545I

b = −0.755849 − 0.949728I

−1.85594 − 8.85698I 0

u = 1.36656 − 1.07638I

a = −0.708821 + 0.108545I

b = −0.755849 + 0.949728I

−1.85594 + 8.85698I 0

u = 1.69106 + 0.76622I

a = 0.012472 − 0.431621I

b = 0.330707 − 0.926113I

7.03641 + 0.49080I 0

u = 1.69106 − 0.76622I

a = 0.012472 + 0.431621I

b = 0.330707 + 0.926113I

7.03641 − 0.49080I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.0642708 + 0.0873744I

a = −3.42782 − 6.54788I

b = −0.61144 − 1.52100I

3.25520 + 0.49080I 0.11002 − 4.11452I

u = 0.0642708 − 0.0873744I

a = −3.42782 + 6.54788I

b = −0.61144 + 1.52100I

3.25520 − 0.49080I 0.11002 + 4.11452I

u = −1.90461 + 0.46488I

a = −0.087205 − 0.399494I

b = −0.358866 − 1.095930I

5.14581 + 4.27792I 0

u = −1.90461 − 0.46488I

a = −0.087205 + 0.399494I

b = −0.358866 + 1.095930I

5.14581 − 4.27792I 0

u = 1.39675 + 1.46025I

a = −0.137267 − 0.372220I

b = 0.388273 − 0.497540I

7.03641 + 2.33941I 0

u = 1.39675 − 1.46025I

a = −0.137267 + 0.372220I

b = 0.388273 + 0.497540I

7.03641 − 2.33941I 0

u = −1.32499 + 1.79381I

a = 0.166087 − 0.318804I

b = −0.490886 − 0.302457I

5.14581 − 7.10813I 0

u = −1.32499 − 1.79381I

a = 0.166087 + 0.318804I

b = −0.490886 + 0.302457I

5.14581 + 7.10813I 0

IV. u-Polynomials

Crossings u-Polynomials at each crossing

((u

+ 3u

+ 5u

+ 4u

+ 2u

+ u + 1)

)(u

− 13u

+ ··· − 8u + 1)

· (u

+ 16u

+ ··· − 384u + 256)

((u

+ u

− u

− 2u

+ u + 1)

)(u

+ u

+ ··· − 4u

+ 1)

· (u

− 8u

+ ··· − 128u + 16)

((u

− 3u

+ u

+ 2u + 1)

)(u

+ 15u

+ ··· + 132u + 29)

· (u

+ 22u

+ ··· + 27648u + 4096)

− 5u

+ ··· − 19u + 13)(u

− 8u

+ ··· + 7u − 6)

· (u

+ u

+ ··· + 30108u + 22357)

, c

+ u

+ ··· + 6u + 1)(u

+ u

+ ··· − 5u + 1)

· (u

+ 3u

+ ··· − 14u + 1)

, c

− 2u

+ ··· − u + 1)(u

− 23u

+ ··· − 9u

+ 1)

· (u

+ u

+ ··· + 76002u + 31907)

((u

+ u

− u

− 2u

+ u + 1)

)(u

− u

+ ··· − 4u

+ 1)

· (u

− 8u

+ ··· − 128u + 16)

((u

+ 3u

+ 5u

+ 4u

+ 2u

+ u + 1)

)(u

− 3u

+ ··· − 8u

+ 1)

· (u

− 24u

+ ··· − 24064u − 2544)

((u

+ u

+ 1)

)(u

− 10u

+ ··· + 3u

+ 1)

· (u

− 21u

+ ··· − 992u + 64)

+ 2u

+ ··· + u + 1)(u

− 23u

+ ··· − 9u

+ 1)

· (u

+ u

+ ··· + 76002u + 31907)

V. Riley Polynomials

Crossings Riley Polynomials at each crossing

((y

+ y

+ 5y

+ 6y

+ 3y + 1)

)(y

+ 3y

+ ··· − 8y + 1)

· (y

+ 4y

+ ··· − 614400y + 65536)

, c

((y

− 3y

+ 5y

− 4y

+ 2y

− y + 1)

)(y

− 13y

+ ··· − 8y + 1)

· (y

− 16y

+ ··· + 384y + 256)

((y

− 7y

+ 15y

− 2y + 1)

)(y

− 23y

+ ··· − 7738y + 841)

· (y

− 30y

+ ··· − 131072000y + 16777216)

− 10y

+ ··· + 1017y + 169)(y

− 16y

+ ··· − 661y + 36)

· (y

− 21y

+ ··· − 2279703318y + 499835449)

, c

− 7y

+ ··· − 20y + 1)(y

+ 3y

+ ··· − 11y + 1)

· (y

− 9y

+ ··· + 44y + 1)

, c

− 12y

+ ··· + 17y + 1)(y

− 46y

+ ··· − 18y + 1)

· (y

− 45y

+ ··· − 3001288400y + 1018056649)

((y

+ y

+ 5y

+ 6y

+ 3y + 1)

)(y

+ 13y

+ ··· − 16y + 1)

· (y

+ 14y

+ ··· − 3117275776y + 6471936)

((y

+ y

+ 3y

+ 2y + 1)

)(y

+ 8y

+ ··· + 6y + 1)

· (y

+ 9y

+ ··· + 39936y + 4096)