11a

212

(K11a

212

)

A knot diagram

Linearized knot diagam

6 1 8 7 10 2 11 3 5 9 4

Solving Sequence

3,8

9,11

1 2 7 5 6 10

, c

Ideals for irreducible components

of X

par

= h−10169u

− 100279u

+ ··· + 16444b + 115784,

− 15886u

− 173333u

+ ··· + 147996a − 951450, u

+ 11u

+ ··· − 408u − 72i

= h−75u

+ 383u

+ ··· + 8b + 212, 636u

a + 43u

+ ··· + 1470a − 238, u

− 5u

+ ··· − 16u + 3i

= h−2u

+ 5u

− 11u

+ 12u

− 11u

+ 6u

+ b − 5u + 1, −2u

+ 3u

− 7u

+ 3u

− 3u

− u

+ a − 2u − 2,

− 2u

+ 5u

− 5u

+ 6u

− 4u

+ 4u

− u + 1i

= hu

a − u

+ au − u

+ b − u + 1, −u

a − 2u

a + 2u

+ a

− 3au + 2u

− a + 3u − 1, u

+ u

+ 2u

+ 1i

= ha, b − 1, v −1i

* 5 irreducible components of dim

= 0, with total 108 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−1.02×10

−1.00×10

+· · ·+1.64×10

b+1.16×10

, −1.59×10

−

1.73 × 10

+ · · · + 1.48 × 10

a − 9.51 × 10

, u

+ 11u

+ · · · − 408u − 72i

(i) Arc colorings











−u









0.107341u

+ 1.17120u

+ ··· + 18.8285u + 6.42889

0.618402u

+ 6.09821u

+ ··· − 54.0570u − 7.04111





0.0977932u

+ 0.457323u

+ ··· + 69.0524u + 14.1574

−0.694661u

− 7.34791u

+ ··· + 195.043u + 36.7964





−0.222793u

− 2.08232u

+ ··· + 5.44757u − 0.157423

−0.0553393u

− 0.402092u

+ ··· + 28.9571u + 8.20360





−0.324472u

− 2.74858u

+ ··· − 8.23791u − 2.15037

0.157869u

+ 2.29762u

+ ··· − 175.909u − 35.7215





−0.480381u

− 5.30821u

+ ··· + 103.723u + 14.5621

−0.150389u

− 1.42623u

+ ··· − 84.6227u − 22.7665





−0.901210u

− 9.04017u

+ ··· + 115.314u + 16.7261

−0.348699u

− 2.61384u

+ ··· − 168.918u − 39.7808





0.400700u

+ 4.88295u

+ ··· − 227.797u − 43.5867

0.911761u

+ 9.80996u

+ ··· − 300.682u − 57.0567





0.400700u

+ 4.88295u

+ ··· − 227.797u − 43.5867

0.911761u

+ 9.80996u

+ ··· − 300.682u − 57.0567



(ii) Obstruction class = −1

(iii) Cusp Shapes = −

4653

4111

−

45527

4111

+ ··· +

398988

4111

u +

53874

4111

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

+ u

+ ··· + 2u + 1

, c

+ 9u

+ ··· − 2u + 1

, c

− 11u

+ ··· − 408u + 72

− 17u

+ ··· − 1920u + 256

, c

− 2u

+ ··· + u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

− 9y

+ ··· − 2y −1

, c

+ 7y

+ ··· + 26y −1

, c

+ 11y

+ ··· + 2016y −5184

− y

+ ··· + 245760y −65536

, c

− 6y

+ ··· + 27y −1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.358353 + 0.924986I

a = −0.311412 + 0.717346I

b = −0.150073 + 0.860307I

−0.58834 − 1.54269I −4.69839 + 4.51597I

u = −0.358353 − 0.924986I

a = −0.311412 − 0.717346I

b = −0.150073 − 0.860307I

−0.58834 + 1.54269I −4.69839 − 4.51597I

u = −0.966676 + 0.332222I

a = −0.818238 + 0.627994I

b = −0.311396 − 0.164177I

4.64927 + 0.26455I −1.71990 + 1.02803I

u = −0.966676 − 0.332222I

a = −0.818238 − 0.627994I

b = −0.311396 + 0.164177I

4.64927 − 0.26455I −1.71990 − 1.02803I

u = −0.161360 + 1.222540I

a = 0.464053 − 1.047230I

b = −0.11073 − 2.09115I

−8.96802 − 0.88990I −16.2208 + 0.4171I

u = −0.161360 − 1.222540I

a = 0.464053 + 1.047230I

b = −0.11073 + 2.09115I

−8.96802 + 0.88990I −16.2208 − 0.4171I

u = −1.289970 + 0.199680I

a = 0.686320 − 0.541724I

b = −0.058453 + 0.397559I

1.64114 + 11.01570I −7.29016 − 9.56628I

u = −1.289970 − 0.199680I

a = 0.686320 + 0.541724I

b = −0.058453 − 0.397559I

1.64114 − 11.01570I −7.29016 + 9.56628I

u = −0.957767 + 0.906773I

a = 0.311369 + 0.803824I

b = −0.398706 + 0.951941I

−2.39512 + 0.38448I −10.41076 − 2.93354I

u = −0.957767 − 0.906773I

a = 0.311369 − 0.803824I

b = −0.398706 − 0.951941I

−2.39512 − 0.38448I −10.41076 + 2.93354I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.580441 + 1.193400I

a = −0.361294 + 1.095690I

b = −0.81291 + 1.75794I

1.92326 − 5.83662I −4.80851 + 2.86417I

u = −0.580441 − 1.193400I

a = −0.361294 − 1.095690I

b = −0.81291 − 1.75794I

1.92326 + 5.83662I −4.80851 − 2.86417I

u = 0.601065

a = −0.393184

b = 0.378379

−1.08922 −8.82220

u = −0.65100 + 1.34345I

a = 0.271854 − 1.066410I

b = 0.98510 − 2.05670I

−2.0202 − 17.7092I −9.44410 + 10.28902I

u = −0.65100 − 1.34345I

a = 0.271854 + 1.066410I

b = 0.98510 + 2.05670I

−2.0202 + 17.7092I −9.44410 − 10.28902I

u = −0.88646 + 1.29579I

a = −0.280005 − 0.575557I

b = 0.078111 − 1.304770I

−3.47013 − 7.94178I −12.2006 + 9.0681I

u = −0.88646 − 1.29579I

a = −0.280005 + 0.575557I

b = 0.078111 + 1.304770I

−3.47013 + 7.94178I −12.2006 − 9.0681I

u = 0.05150 + 1.63379I

a = 0.067278 − 0.325219I

b = −0.410127 − 0.971726I

−5.85414 + 4.86122I −16.7957 − 3.2884I

u = 0.05150 − 1.63379I

a = 0.067278 + 0.325219I

b = −0.410127 + 0.971726I

−5.85414 − 4.86122I −16.7957 + 3.2884I

II. I

= h−75u

+ 383u

+ · · · + 8b + 212, 636u

a + 43u

+ · · · + 1470a −

238, u

− 5u

+ · · · − 16u + 3i

(i) Arc colorings











−u









9.37500u

− 47.8750u

+ ··· + 161.750u − 26.5000





−

383

+ ··· + a +

−

125

+ ··· +

941

u −





−3.37500au

+ 1.54167u

+ ··· + 21.3750a − 3.66667

−0.250000au

− 4.75000u

+ ··· + 16.5000a + 13.5000





−9.37500au

− 3.66667u

+ ··· + 26.5000a + 1.79167

−

a −

+ ··· + 3a −





−4.87500au

+ 12.2917u

+ ··· + 26.7500a − 25.7917

−7.37500au

+ 13.5000u

+ ··· + 17.6250a − 23.3750





5.87500au

+ 13.7083u

+ ··· + 2.75000a − 6.33333

1.62500au

+ 4.87500u

+ ··· + 12.7500a − 26.7500





−

129

+ ··· + a + 3

−

125

+ ··· +

941

u −





−

129

+ ··· + a + 3

−

125

+ ··· +

941

u −



(ii) Obstruction class = −1

(iii) Cusp Shapes =

−

211

+ ··· + 73u +

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

− u

+ ··· − 26u + 43

, c

+ 29u

+ ··· + 25272u + 1849

, c

+ 5u

+ ··· + 16u + 3)

+ 7u

+ ··· + 10u + 1)

, c

− 2u

+ ··· − 22u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

− 29y

+ ··· − 25272y + 1849

, c

+ 31y

+ ··· − 7699036y + 3418801

, c

+ 23y

+ ··· + 140y + 9)

+ 7y

+ ··· − 4y + 1)

, c

− 4y

+ ··· − 18y + 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.323607 + 0.937654I

a = −0.175351 − 0.450939I

b = −1.42855 − 2.11019I

−0.65303 + 8.38929I −8.7813 − 13.2523I

u = 0.323607 + 0.937654I

a = 2.11473 − 0.35700I

b = 1.05507 − 1.24949I

−0.65303 + 8.38929I −8.7813 − 13.2523I

u = 0.323607 − 0.937654I

a = −0.175351 + 0.450939I

b = −1.42855 + 2.11019I

−0.65303 − 8.38929I −8.7813 + 13.2523I

u = 0.323607 − 0.937654I

a = 2.11473 + 0.35700I

b = 1.05507 + 1.24949I

−0.65303 − 8.38929I −8.7813 + 13.2523I

u = −0.407223 + 0.893066I

a = −0.791967 + 0.557123I

b = 0.506201 + 0.724691I

1.70318 − 0.95050I −2.58255 + 0.79026I

u = −0.407223 + 0.893066I

a = −0.28278 + 1.70972I

b = −1.24717 + 1.80857I

1.70318 − 0.95050I −2.58255 + 0.79026I

u = −0.407223 − 0.893066I

a = −0.791967 − 0.557123I

b = 0.506201 − 0.724691I

1.70318 + 0.95050I −2.58255 − 0.79026I

u = −0.407223 − 0.893066I

a = −0.28278 − 1.70972I

b = −1.24717 − 1.80857I

1.70318 + 0.95050I −2.58255 − 0.79026I

u = 0.285005 + 0.986264I

a = 0.906188 + 0.471916I

b = −0.680137 + 0.614572I

1.39070 + 5.45819I −4.75268 − 7.85090I

u = 0.285005 + 0.986264I

a = −0.18402 − 1.83089I

b = −0.98618 − 2.55701I

1.39070 + 5.45819I −4.75268 − 7.85090I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.285005 − 0.986264I

a = 0.906188 − 0.471916I

b = −0.680137 − 0.614572I

1.39070 − 5.45819I −4.75268 + 7.85090I

u = 0.285005 − 0.986264I

a = −0.18402 + 1.83089I

b = −0.98618 + 2.55701I

1.39070 − 5.45819I −4.75268 + 7.85090I

u = −0.204395 + 0.939901I

a = 0.159162 − 0.415191I

b = 1.60287 − 1.64255I

0.14515 − 3.09361I −8.82386 + 5.93072I

u = −0.204395 + 0.939901I

a = 1.66507 + 1.03102I

b = 0.64754 + 1.27304I

0.14515 − 3.09361I −8.82386 + 5.93072I

u = −0.204395 − 0.939901I

a = 0.159162 + 0.415191I

b = 1.60287 + 1.64255I

0.14515 + 3.09361I −8.82386 − 5.93072I

u = −0.204395 − 0.939901I

a = 1.66507 − 1.03102I

b = 0.64754 − 1.27304I

0.14515 + 3.09361I −8.82386 − 5.93072I

u = −0.988537 + 0.351198I

a = 0.225935 + 0.946460I

b = −0.0017989 − 0.1085760I

−1.77149 − 4.10144I −9.97996 + 6.24934I

u = −0.988537 + 0.351198I

a = 0.588772 + 0.758163I

b = −0.473418 + 0.617705I

−1.77149 − 4.10144I −9.97996 + 6.24934I

u = −0.988537 − 0.351198I

a = 0.225935 − 0.946460I

b = −0.0017989 + 0.1085760I

−1.77149 + 4.10144I −9.97996 − 6.24934I

u = −0.988537 − 0.351198I

a = 0.588772 − 0.758163I

b = −0.473418 − 0.617705I

−1.77149 + 4.10144I −9.97996 − 6.24934I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.080650 + 0.243992I

a = −0.856190 − 0.655908I

b = −0.047350 + 0.413085I

3.39022 − 5.68113I −3.92911 + 4.67272I

u = 1.080650 + 0.243992I

a = 0.724773 + 0.544582I

b = 0.249139 − 0.068035I

3.39022 − 5.68113I −3.92911 + 4.67272I

u = 1.080650 − 0.243992I

a = −0.856190 + 0.655908I

b = −0.047350 − 0.413085I

3.39022 + 5.68113I −3.92911 − 4.67272I

u = 1.080650 − 0.243992I

a = 0.724773 − 0.544582I

b = 0.249139 + 0.068035I

3.39022 + 5.68113I −3.92911 − 4.67272I

u = −0.118764 + 0.883260I

a = 1.240850 + 0.207363I

b = −0.794679 + 0.293981I

0.57130 + 1.50593I −8.88680 + 0.90138I

u = −0.118764 + 0.883260I

a = −0.11523 − 1.91114I

b = 0.64321 − 2.55956I

0.57130 + 1.50593I −8.88680 + 0.90138I

u = −0.118764 − 0.883260I

a = 1.240850 − 0.207363I

b = −0.794679 − 0.293981I

0.57130 − 1.50593I −8.88680 − 0.90138I

u = −0.118764 − 0.883260I

a = −0.11523 + 1.91114I

b = 0.64321 + 2.55956I

0.57130 − 1.50593I −8.88680 − 0.90138I

u = 0.375701 + 1.185220I

a = −0.185369 − 0.878085I

b = 0.06699 − 1.99722I

−4.64275 + 3.93521I −11.18615 − 4.33934I

u = 0.375701 + 1.185220I

a = 0.543890 + 1.086350I

b = 0.68365 + 1.43792I

−4.64275 + 3.93521I −11.18615 − 4.33934I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.375701 − 1.185220I

a = −0.185369 + 0.878085I

b = 0.06699 + 1.99722I

−4.64275 − 3.93521I −11.18615 + 4.33934I

u = 0.375701 − 1.185220I

a = 0.543890 − 1.086350I

b = 0.68365 − 1.43792I

−4.64275 − 3.93521I −11.18615 + 4.33934I

u = 0.366522 + 0.661253I

a = −1.43742 − 0.22873I

b = 0.789147 + 0.111369I

0.15412 − 5.32337I −7.89175 + 4.81078I

u = 0.366522 + 0.661253I

a = −0.25927 + 1.87585I

b = 1.20633 + 1.72823I

0.15412 − 5.32337I −7.89175 + 4.81078I

u = 0.366522 − 0.661253I

a = −1.43742 + 0.22873I

b = 0.789147 − 0.111369I

0.15412 + 5.32337I −7.89175 − 4.81078I

u = 0.366522 − 0.661253I

a = −0.25927 − 1.87585I

b = 1.20633 − 1.72823I

0.15412 + 5.32337I −7.89175 − 4.81078I

u = 0.733621 + 0.056495I

a = −0.712576 + 0.589887I

b = 0.390901 + 0.249697I

−1.027180 + 0.066620I −7.89585 − 0.16999I

u = 0.733621 + 0.056495I

a = 0.000334 − 0.690063I

b = 0.498708 − 0.023336I

−1.027180 + 0.066620I −7.89585 − 0.16999I

u = 0.733621 − 0.056495I

a = −0.712576 − 0.589887I

b = 0.390901 − 0.249697I

−1.027180 − 0.066620I −7.89585 + 0.16999I

u = 0.733621 − 0.056495I

a = 0.000334 + 0.690063I

b = 0.498708 + 0.023336I

−1.027180 − 0.066620I −7.89585 + 0.16999I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.461229 + 1.192960I

a = 0.735450 + 0.704350I

b = 0.941882 + 0.432336I

−4.33727 + 4.33344I 0. − 7.98095I

u = 0.461229 + 1.192960I

a = −0.079786 − 0.637262I

b = −0.29680 − 1.88578I

−4.33727 + 4.33344I 0. − 7.98095I

u = 0.461229 − 1.192960I

a = 0.735450 − 0.704350I

b = 0.941882 − 0.432336I

−4.33727 − 4.33344I 0. + 7.98095I

u = 0.461229 − 1.192960I

a = −0.079786 + 0.637262I

b = −0.29680 + 1.88578I

−4.33727 − 4.33344I 0. + 7.98095I

u = 0.261513 + 1.263160I

a = 0.008648 + 0.711153I

b = 0.111760 + 1.082130I

−2.36014 − 1.61358I 0

u = 0.261513 + 1.263160I

a = 0.056995 − 0.282130I

b = 0.796685 − 0.665417I

−2.36014 − 1.61358I 0

u = 0.261513 − 1.263160I

a = 0.008648 − 0.711153I

b = 0.111760 − 1.082130I

−2.36014 + 1.61358I 0

u = 0.261513 − 1.263160I

a = 0.056995 + 0.282130I

b = 0.796685 + 0.665417I

−2.36014 + 1.61358I 0

u = −0.386093 + 1.315540I

a = 0.321924 − 0.776161I

b = −0.07289 − 2.11359I

−6.83745 − 8.51873I 0

u = −0.386093 + 1.315540I

a = 0.567468 − 1.208310I

b = 1.22818 − 2.05777I

−6.83745 − 8.51873I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.386093 − 1.315540I

a = 0.321924 + 0.776161I

b = −0.07289 + 2.11359I

−6.83745 + 8.51873I 0

u = −0.386093 − 1.315540I

a = 0.567468 + 1.208310I

b = 1.22818 + 2.05777I

−6.83745 + 8.51873I 0

u = 0.790023 + 1.128140I

a = −0.183542 + 0.797397I

b = 0.321793 + 1.049820I

−2.51334 + 3.34840I 0

u = 0.790023 + 1.128140I

a = 0.286168 − 0.668765I

b = 0.038092 − 1.366730I

−2.51334 + 3.34840I 0

u = 0.790023 − 1.128140I

a = −0.183542 − 0.797397I

b = 0.321793 − 1.049820I

−2.51334 − 3.34840I 0

u = 0.790023 − 1.128140I

a = 0.286168 + 0.668765I

b = 0.038092 + 1.366730I

−2.51334 − 3.34840I 0

u = −0.341744 + 0.520197I

a = −0.607007 + 0.115057I

b = −0.304801 + 1.331690I

2.67726 − 2.50734I 0.46124 + 4.14494I

u = −0.341744 + 0.520197I

a = −2.20469 + 1.12056I

b = −0.885119 − 0.256430I

2.67726 − 2.50734I 0.46124 + 4.14494I

u = −0.341744 − 0.520197I

a = −0.607007 − 0.115057I

b = −0.304801 − 1.331690I

2.67726 + 2.50734I 0.46124 − 4.14494I

u = −0.341744 − 0.520197I

a = −2.20469 − 1.12056I

b = −0.885119 + 0.256430I

2.67726 + 2.50734I 0.46124 − 4.14494I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.598145 + 1.270670I

a = 0.364362 + 1.030040I

b = 0.72567 + 1.78948I

0.12476 + 11.63330I 0

u = 0.598145 + 1.270670I

a = −0.282009 − 1.154280I

b = −1.01814 − 2.10114I

0.12476 + 11.63330I 0

u = 0.598145 − 1.270670I

a = 0.364362 − 1.030040I

b = 0.72567 − 1.78948I

0.12476 − 11.63330I 0

u = 0.598145 − 1.270670I

a = −0.282009 + 1.154280I

b = −1.01814 + 2.10114I

0.12476 − 11.63330I 0

u = 0.255236 + 0.508176I

a = 0.494661 − 0.107326I

b = 0.75887 + 1.28212I

2.67098 − 2.77341I −0.394325 + 0.708366I

u = 0.255236 + 0.508176I

a = −2.79447 − 0.04340I

b = −0.731661 + 0.492551I

2.67098 − 2.77341I −0.394325 + 0.708366I

u = 0.255236 − 0.508176I

a = 0.494661 + 0.107326I

b = 0.75887 − 1.28212I

2.67098 + 2.77341I −0.394325 − 0.708366I

u = 0.255236 − 0.508176I

a = −2.79447 + 0.04340I

b = −0.731661 − 0.492551I

2.67098 + 2.77341I −0.394325 − 0.708366I

u = −0.58449 + 1.51506I

a = −0.162437 − 0.495879I

b = 0.227921 − 1.342130I

−5.13435 − 2.75063I 0

u = −0.58449 + 1.51506I

a = −0.024617 − 0.210269I

b = −0.521920 − 0.498154I

−5.13435 − 2.75063I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.58449 − 1.51506I

a = −0.162437 + 0.495879I

b = 0.227921 + 1.342130I

−5.13435 + 2.75063I 0

u = −0.58449 − 1.51506I

a = −0.024617 + 0.210269I

b = −0.521920 + 0.498154I

−5.13435 + 2.75063I 0

III.

= h−2u

+ 5u

+ · · · +b + 1, −2u

+ 3u

+ · · · +a − 2, u

− 2u

+ · · · −u + 1i

(i) Arc colorings











−u









− 3u

+ 7u

− 3u

+ 3u

+ u

+ 2u + 2

− 5u

+ 11u

− 12u

+ 11u

− 6u

+ 5u − 1





+ 6u

− 6u

+ 7u

− 2u + 4

− 4u

+ 9u

− 8u

+ 7u

− 3u

+ 3u





−u

+ 3u

− 7u

+ 10u

− 11u

+ 10u

− 7u + 4

− 2u

+ 5u

− 5u

+ 5u

− 2u

+ u + 1





−u

+ u

− 3u

− u

− 2u

− 3

−u

+ 2u

− 5u

+ 5u

− 6u

+ 4u

− 3u





− 5u

+ 11u

− 13u

+ 12u

− 9u

+ 6u − 1

−u

+ 2u

− 5u

+ 5u

− 6u

+ 3u − 2





− 8u

+ 17u

− 20u

+ 17u

− 11u

+ 8u − 3

−2u

+ 4u

− 9u

+ 8u

− 7u

+ 3u − 3





− 2u

+ 5u

+ 2u

− 2u

+ 6u

+ 4

− 4u

+ 9u

− 7u

+ 6u

− u

+ 3u + 1





− 2u

+ 5u

+ 2u

− 2u

+ 6u

+ 4

− 4u

+ 9u

− 7u

+ 6u

− u

+ 3u + 1



(ii) Obstruction class = 1

(iii) Cusp Shapes = −5u

+ 15u

− 33u

+ 42u

− 36u

+ 22u

− 18u − 3

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

− 2u

+ 3u

+ u

− 2u

− u + 1

, c

+ 4u

+ 10u

+ 16u

+ 19u

+ 17u

+ 12u

+ 5u + 1

− 2u

+ 5u

− 5u

+ 6u

− 4u

+ 4u

− u + 1

− 3u

+ 3u

− u

+ u

+ 1

, c

− 2u

+ 3u

− u

− 2u

+ u + 1

, c

− u

+ 2u

− u

+ 1

+ 2u

+ 5u

+ 6u

+ 4u

+ u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

− 4y

+ 10y

− 16y

+ 19y

− 17y

+ 12y

− 5y + 1

, c

+ 4y

+ 10y

+ 12y

+ 19y

+ 27y

+ 12y

− y + 1

, c

+ 6y

+ 17y

+ 27y

+ 34y

+ 32y

+ 20y

+ 7y + 1

− 3y

+ y

− y

+ 5y

− 2y

+ 1

, c

− y

+ 4y

− 4y

+ 6y

− 5y

+ 5y

− 2y + 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.792109 + 0.738037I

a = −0.382665 + 0.800987I

b = 0.073913 + 0.733193I

−2.49555 + 0.86293I −13.14261 − 3.03469I

u = 0.792109 − 0.738037I

a = −0.382665 − 0.800987I

b = 0.073913 − 0.733193I

−2.49555 − 0.86293I −13.14261 + 3.03469I

u = −0.289722 + 0.810357I

a = −1.207080 − 0.334530I

b = 0.08655 − 1.63964I

−0.50761 − 7.31144I −8.44025 + 5.07969I

u = −0.289722 − 0.810357I

a = −1.207080 + 0.334530I

b = 0.08655 + 1.63964I

−0.50761 + 7.31144I −8.44025 − 5.07969I

u = 0.010381 + 0.674737I

a = 1.24580 + 1.30467I

b = −0.28206 + 1.43052I

1.91736 + 3.67399I −5.72808 − 5.47869I

u = 0.010381 − 0.674737I

a = 1.24580 − 1.30467I

b = −0.28206 − 1.43052I

1.91736 − 3.67399I −5.72808 + 5.47869I

u = 0.48723 + 1.51401I

a = −0.156057 − 0.473494I

b = −0.378403 − 1.209690I

−5.49394 + 5.83988I −13.6891 − 9.4941I

u = 0.48723 − 1.51401I

a = −0.156057 + 0.473494I

b = −0.378403 + 1.209690I

−5.49394 − 5.83988I −13.6891 + 9.4941I

IV.

= hu

a−u

+au−u

+b−u+1, −u

a+2u

+· · ·−a−1, u

+2u

+1i

(i) Arc colorings











−u









−u

a + u

− au + u

+ u − 1





−u

+ au − u

+ a − u + 1

−u

a − u

a − au − 1





−u

a + u

+ 2u

− a + 3u + 2

−u

a − u

a − au + u

− a + u + 1





a + u

a + au + u

− a + u + 2

a + u

a − u

+ au − u

− u + 1





a + u

a − u

+ 2au − u

− u + 2

−u

+ au − 2u

− 2u





a + 2u

a + 2au + u

+ u + 1

a − u

+ au − u

+ a − 2u





a − u

− u

+ 2a − u

−au + a − 1





a − u

− u

+ 2a − u

−au + a − 1



(ii) Obstruction class = 1

(iii) Cusp Shapes = −6u

− 6u

− 7u − 7

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

− 2u

− u

+ 3u

+ u

− 2u

+ 1

, c

+ 4u

+ 10u

+ 17u

+ 21u

+ 17u

+ 10u

+ 4u + 1

+ u

+ 2u

+ 1)

+ u

+ 1)

, c

− 2u

+ u

+ 3u

− u

− 2u

+ 1

, c

− 3u

+ 3u

− u

+ 2u

− u

+ 1

− u

+ 2u

+ 1)

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

− 4y

+ 10y

− 17y

+ 21y

− 17y

+ 10y

− 4y + 1

, c

+ 4y

+ 6y

+ 15y

+ 33y

+ 15y

+ 6y

+ 4y + 1

, c

+ 3y

+ 6y

+ 4y + 1)

− y

+ 2y

+ 1)

, c

− 3y

+ y

+ 3y

+ y

+ 4y

− y

− 2y + 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.175098 + 0.691825I

a = 1.258400 + 0.403038I

b = −0.799065 − 0.398882I

1.13814 + 2.37936I −4.06162 − 4.69148I

u = 0.175098 + 0.691825I

a = −0.87507 + 1.88950I

b = 0.00729 + 1.99959I

1.13814 + 2.37936I −4.06162 − 4.69148I

u = 0.175098 − 0.691825I

a = 1.258400 − 0.403038I

b = −0.799065 + 0.398882I

1.13814 − 2.37936I −4.06162 + 4.69148I

u = 0.175098 − 0.691825I

a = −0.87507 − 1.88950I

b = 0.00729 − 1.99959I

1.13814 − 2.37936I −4.06162 + 4.69148I

u = −0.675098 + 1.227920I

a = −0.243445 + 0.679234I

b = −0.693631 + 0.465880I

−4.42801 − 3.38562I −12.43838 + 2.38747I

u = −0.675098 + 1.227920I

a = −0.139876 − 0.483891I

b = −0.01459 − 1.49846I

−4.42801 − 3.38562I −12.43838 + 2.38747I

u = −0.675098 − 1.227920I

a = −0.243445 − 0.679234I

b = −0.693631 − 0.465880I

−4.42801 + 3.38562I −12.43838 − 2.38747I

u = −0.675098 − 1.227920I

a = −0.139876 + 0.483891I

b = −0.01459 + 1.49846I

−4.42801 + 3.38562I −12.43838 − 2.38747I

V. I

= ha, b − 1, v − 1i

(i) Arc colorings























−1





−1





−1









−1











(ii) Obstruction class = −1

(iii) Cusp Shapes = −18

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

u − 1

, c

u + 1

, c

(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

−4.93480 −18.0000

VI. u-Polynomials

Crossings u-Polynomials at each crossing

, c

(u − 1)(u

− 2u

+ 3u

+ u

− 2u

− u + 1)

· (u

− 2u

− u

+ 3u

+ u

− 2u

+ 1)(u

+ u

+ ··· + 2u + 1)

· (u

− u

+ ··· − 26u + 43)

, c

(u + 1)(u

+ 4u

+ 10u

+ 16u

+ 19u

+ 17u

+ 12u

+ 5u + 1)

· (u

+ 4u

+ 10u

+ 17u

+ 21u

+ 17u

+ 10u

+ 4u + 1)

· (u

+ 9u

+ ··· − 2u + 1)(u

+ 29u

+ ··· + 25272u + 1849)

u(u

+ u

+ 2u

+ 1)

− 2u

+ ··· − u + 1)

· (u

− 11u

+ ··· − 408u + 72)(u

+ 5u

+ ··· + 16u + 3)

(u − 1)(u

+ u

+ 1)

− 3u

+ 3u

− u

+ u

+ 1)

· (u

− 17u

+ ··· − 1920u + 256)(u

+ 7u

+ ··· + 10u + 1)

, c

(u − 1)(u

− 2u

+ 3u

− u

− 2u

+ u + 1)

· (u

− 2u

+ u

+ 3u

− u

− 2u

+ 1)(u

+ u

+ ··· + 2u + 1)

· (u

− u

+ ··· − 26u + 43)

, c

(u + 1)(u

− 3u

+ ··· − u

+ 1)(u

− u

+ ··· − u

+ 1)

· (u

− 2u

+ ··· + u + 1)(u

− 2u

+ ··· − 22u + 1)

u(u

− u

+ 2u

+ 1)

+ 2u

+ ··· + u + 1)

· (u

− 11u

+ ··· − 408u + 72)(u

+ 5u

+ ··· + 16u + 3)

VII. Riley Polynomials

Crossings Riley Polynomials at each crossing

, c

(y −1)(y

− 4y

+ 10y

− 17y

+ 21y

− 17y

+ 10y

− 4y + 1)

· (y

− 4y

+ 10y

− 16y

+ 19y

− 17y

+ 12y

− 5y + 1)

· (y

− 9y

+ ··· − 2y −1)(y

− 29y

+ ··· − 25272y + 1849)

, c

(y −1)(y

+ 4y

+ 6y

+ 15y

+ 33y

+ 15y

+ 6y

+ 4y + 1)

· (y

+ 4y

+ 10y

+ 12y

+ 19y

+ 27y

+ 12y

− y + 1)

· (y

+ 7y

+ ··· + 26y −1)

· (y

+ 31y

+ ··· − 7699036y + 3418801)

, c

y(y

+ 3y

+ 6y

+ 4y + 1)

· (y

+ 6y

+ 17y

+ 27y

+ 34y

+ 32y

+ 20y

+ 7y + 1)

· (y

+ 11y

+ ··· + 2016y −5184)(y

+ 23y

+ ··· + 140y + 9)

(y −1)(y

− y

+ 2y

+ 1)

− 3y

+ ··· − 2y

+ 1)

· (y

− y

+ ··· + 245760y −65536)(y

+ 7y

+ ··· − 4y + 1)

, c

(y −1)(y

− 3y

+ y

+ 3y

+ y

+ 4y

− y

− 2y + 1)

· (y

− y

+ 4y

− 4y

+ 6y

− 5y

+ 5y

− 2y + 1)

· (y

− 6y

+ ··· + 27y −1)(y

− 4y

+ ··· − 18y + 1)