12n

0794

(K12n

0794

)

A knot diagram

Linearized knot diagam

4 5 11 9 3 1 12 5 1 4 6 7

Solving Sequence

1,6 3,7

5 2 12 8 9 11 4 10

, c

Ideals for irreducible components

of X

par

= h3.64825 × 10

+ 2.17531 × 10

+ ··· + 2.27197 × 10

b + 3.17348 × 10

− 3.41778 × 10

+ 4.19437 × 10

+ ··· + 4.31675 × 10

a − 8.54844 × 10

+ 32u

+ ··· − 17u + 19i

= hu

+ u

+ ··· + b + 3u, u

− u

+ ··· + a − 1, u

+ u

+ ··· + 2u + 1i

* 2 irreducible components of dim

= 0, with total 86 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

= h3.65 × 10

+ 2.18 × 10

+ · · · + 2.27 × 10

b + 3.17 ×

, −3.42 × 10

+ 4.19 × 10

+ · · · + 4.32 × 10

a − 8.55 ×

, u

+ 32u

+ · · · − 17u + 19i

(i) Arc colorings











0.0791748u

− 0.0971649u

+ ··· + 7.13718u + 1.98030

−0.160576u

− 0.957454u

+ ··· + 5.17375u − 13.9679





−u





0.434570u

+ 0.198997u

+ ··· − 3.14705u − 2.64483

−0.802804u

− 0.137974u

+ ··· − 6.93147u − 0.143677





−0.221569u

− 0.256066u

+ ··· − 4.45414u − 5.67050

−0.431397u

− 0.300463u

+ ··· + 0.0481534u − 2.05464





−u

+ u





+ 1

−u

− 2u





0.0300223u

− 0.192535u

+ ··· + 1.41247u − 0.794270

−0.541452u

+ 1.19433u

+ ··· − 21.1227u + 14.5984





−u

− 2u

+ u





−0.254863u

− 0.559737u

+ ··· + 5.39514u − 4.47736

−0.0427600u

− 1.30834u

+ ··· + 10.9051u − 18.4670





0.0300223u

− 0.192535u

+ ··· + 1.41247u − 0.794270

−0.757625u

+ 1.35968u

+ ··· − 24.9663u + 18.2566



(ii) Obstruction class = −1

(iii) Cusp Shapes = −0.759415u

− 2.10567u

+ ··· + 23.3339u − 15.4588

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

− 6u

+ ··· − 27u + 1

, c

− 2u

+ ··· − 2106u + 1161

, c

− u

+ ··· + 430u + 55

, c

+ 2u

+ ··· + 157u + 31

, c

+ 32u

+ ··· + 17u + 19

+ 4u

+ ··· − u + 1

− 2u

+ ··· − 109361u + 34447

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

− 54y

+ ··· + 189y + 1

, c

− 34y

+ ··· − 27367308y + 1347921

, c

+ 25y

+ ··· + 220450y + 3025

, c

+ 24y

+ ··· + 22223y + 961

, c

+ 64y

+ ··· − 2075y + 361

− 50y

+ ··· + 217y + 1

+ 46y

+ ··· + 15032565303y + 1186595809

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.585021 + 0.839577I

a = −0.653745 + 0.824312I

b = 1.156370 − 0.575904I

−0.92653 − 6.48550I 0

u = 0.585021 − 0.839577I

a = −0.653745 − 0.824312I

b = 1.156370 + 0.575904I

−0.92653 + 6.48550I 0

u = 0.844238 + 0.314098I

a = −2.05637 + 0.11980I

b = 1.29281 + 0.70336I

0.71987 + 11.42660I 2.99478 − 7.86086I

u = 0.844238 − 0.314098I

a = −2.05637 − 0.11980I

b = 1.29281 − 0.70336I

0.71987 − 11.42660I 2.99478 + 7.86086I

u = −0.774174 + 0.442382I

a = −1.73133 − 0.65078I

b = 1.280470 − 0.119995I

4.56836 − 2.47145I 9.7968 + 11.8051I

u = −0.774174 − 0.442382I

a = −1.73133 + 0.65078I

b = 1.280470 + 0.119995I

4.56836 + 2.47145I 9.7968 − 11.8051I

u = −0.601969 + 0.651291I

a = 0.198331 + 0.799993I

b = −0.865200 − 0.503209I

−1.65284 − 0.01935I 0.571143 + 0.160005I

u = −0.601969 − 0.651291I

a = 0.198331 − 0.799993I

b = −0.865200 + 0.503209I

−1.65284 + 0.01935I 0.571143 − 0.160005I

u = −0.878561 + 0.090514I

a = −1.54583 − 0.41382I

b = 0.864053 − 0.090063I

3.96123 − 0.33995I 6.36296 − 1.08101I

u = −0.878561 − 0.090514I

a = −1.54583 + 0.41382I

b = 0.864053 + 0.090063I

3.96123 + 0.33995I 6.36296 + 1.08101I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.761968 + 0.375228I

a = 1.51651 + 0.13278I

b = −1.057950 + 0.707192I

−0.72761 − 4.58564I 1.01495 + 4.58399I

u = −0.761968 − 0.375228I

a = 1.51651 − 0.13278I

b = −1.057950 − 0.707192I

−0.72761 + 4.58564I 1.01495 − 4.58399I

u = 0.087906 + 1.195280I

a = −1.036050 − 0.725247I

b = 1.336380 − 0.253283I

4.71460 + 0.88214I 0

u = 0.087906 − 1.195280I

a = −1.036050 + 0.725247I

b = 1.336380 + 0.253283I

4.71460 − 0.88214I 0

u = 0.046584 + 1.212660I

a = −0.563907 + 1.049470I

b = −0.263145 + 1.187020I

−4.47402 − 2.56568I 0

u = 0.046584 − 1.212660I

a = −0.563907 − 1.049470I

b = −0.263145 − 1.187020I

−4.47402 + 2.56568I 0

u = 0.776255 + 0.084754I

a = 1.96737 + 0.45778I

b = −1.044090 − 0.751566I

4.20666 + 3.23614I 6.34201 − 8.24044I

u = 0.776255 − 0.084754I

a = 1.96737 − 0.45778I

b = −1.044090 + 0.751566I

4.20666 − 3.23614I 6.34201 + 8.24044I

u = −0.109251 + 1.214890I

a = 0.80584 + 2.16972I

b = −0.484418 − 0.064884I

−4.41125 + 1.64954I 0

u = −0.109251 − 1.214890I

a = 0.80584 − 2.16972I

b = −0.484418 + 0.064884I

−4.41125 − 1.64954I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.320207 + 1.177390I

a = 0.418143 − 0.634187I

b = −1.087520 + 0.478535I

0.881245 + 0.747708I 0

u = 0.320207 − 1.177390I

a = 0.418143 + 0.634187I

b = −1.087520 − 0.478535I

0.881245 − 0.747708I 0

u = −0.489550 + 1.132460I

a = −0.845195 − 0.209506I

b = 0.961776 − 0.091917I

0.75256 − 4.50250I 0

u = −0.489550 − 1.132460I

a = −0.845195 + 0.209506I

b = 0.961776 + 0.091917I

0.75256 + 4.50250I 0

u = 0.168395 + 1.254750I

a = 0.909624 − 0.738354I

b = −1.68054 + 0.07433I

1.09519 + 2.03459I 0

u = 0.168395 − 1.254750I

a = 0.909624 + 0.738354I

b = −1.68054 − 0.07433I

1.09519 − 2.03459I 0

u = 0.622042 + 0.266962I

a = −0.333728 + 1.061650I

b = 0.328416 − 1.217050I

−2.34650 + 4.70127I 1.66541 − 6.89019I

u = 0.622042 − 0.266962I

a = −0.333728 − 1.061650I

b = 0.328416 + 1.217050I

−2.34650 − 4.70127I 1.66541 + 6.89019I

u = 0.201780 + 1.344270I

a = 0.47779 − 1.40922I

b = −1.357800 − 0.380695I

0.11696 + 3.16123I 0

u = 0.201780 − 1.344270I

a = 0.47779 + 1.40922I

b = −1.357800 + 0.380695I

0.11696 − 3.16123I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.331726 + 1.319540I

a = 1.35514 − 0.94546I

b = −1.019720 − 0.935363I

−0.19484 + 7.23478I 0

u = 0.331726 − 1.319540I

a = 1.35514 + 0.94546I

b = −1.019720 + 0.935363I

−0.19484 − 7.23478I 0

u = −0.380858 + 1.315350I

a = −0.930411 − 0.962245I

b = 0.739624 − 0.217715I

−0.42239 − 4.83795I 0

u = −0.380858 − 1.315350I

a = −0.930411 + 0.962245I

b = 0.739624 + 0.217715I

−0.42239 + 4.83795I 0

u = −0.580317 + 0.214057I

a = 3.38471 − 0.40273I

b = −0.891148 + 0.455999I

−1.63250 − 3.94273I 3.88858 + 5.95678I

u = −0.580317 − 0.214057I

a = 3.38471 + 0.40273I

b = −0.891148 − 0.455999I

−1.63250 + 3.94273I 3.88858 − 5.95678I

u = −0.084571 + 1.382930I

a = −0.054497 + 0.537587I

b = 0.045186 + 0.944137I

−5.41837 − 1.91442I 0

u = −0.084571 − 1.382930I

a = −0.054497 − 0.537587I

b = 0.045186 − 0.944137I

−5.41837 + 1.91442I 0

u = 0.562673 + 0.242422I

a = −0.55392 + 1.40968I

b = 0.920370 + 0.284651I

7.32966 + 1.28471I 0.07472 − 6.09575I

u = 0.562673 − 0.242422I

a = −0.55392 − 1.40968I

b = 0.920370 − 0.284651I

7.32966 − 1.28471I 0.07472 + 6.09575I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.235874 + 1.386730I

a = 1.69465 + 0.80471I

b = −1.178050 + 0.518685I

−6.75272 − 6.96733I 0

u = −0.235874 − 1.386730I

a = 1.69465 − 0.80471I

b = −1.178050 − 0.518685I

−6.75272 + 6.96733I 0

u = −0.190501 + 1.394310I

a = −0.048935 − 0.246393I

b = −0.90235 − 1.14942I

−7.39171 − 0.99406I 0

u = −0.190501 − 1.394310I

a = −0.048935 + 0.246393I

b = −0.90235 + 1.14942I

−7.39171 + 0.99406I 0

u = 0.420221 + 0.405604I

a = −2.51276 − 0.10334I

b = 0.464174 + 0.701970I

−3.13089 − 1.54804I −1.36292 − 1.90908I

u = 0.420221 − 0.405604I

a = −2.51276 + 0.10334I

b = 0.464174 − 0.701970I

−3.13089 + 1.54804I −1.36292 + 1.90908I

u = 0.23300 + 1.40172I

a = 0.136138 + 1.020950I

b = 0.642226 + 0.477177I

2.04560 + 4.25350I 0

u = 0.23300 − 1.40172I

a = 0.136138 − 1.020950I

b = 0.642226 − 0.477177I

2.04560 − 4.25350I 0

u = 0.25005 + 1.40302I

a = 0.452465 − 0.063748I

b = 0.51101 − 1.40622I

−7.67530 + 7.91631I 0

u = 0.25005 − 1.40302I

a = 0.452465 + 0.063748I

b = 0.51101 + 1.40622I

−7.67530 − 7.91631I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.16140 + 1.41858I

a = −1.24247 + 0.74107I

b = 0.915024 + 0.747286I

−8.91641 + 0.61969I 0

u = 0.16140 − 1.41858I

a = −1.24247 − 0.74107I

b = 0.915024 − 0.747286I

−8.91641 − 0.61969I 0

u = 0.537783 + 0.087841I

a = 2.96586 − 1.04036I

b = −1.52148 − 0.18593I

4.68996 + 0.46786I 7.22305 + 1.64442I

u = 0.537783 − 0.087841I

a = 2.96586 + 1.04036I

b = −1.52148 + 0.18593I

4.68996 − 0.46786I 7.22305 − 1.64442I

u = −0.462909 + 0.260608I

a = 1.080330 + 0.319178I

b = −0.662469 − 0.970115I

−2.09947 + 1.48120I 2.08400 + 2.14333I

u = −0.462909 − 0.260608I

a = 1.080330 − 0.319178I

b = −0.662469 + 0.970115I

−2.09947 − 1.48120I 2.08400 − 2.14333I

u = 0.33871 + 1.44643I

a = −1.15336 + 1.08090I

b = 1.34420 + 0.82627I

−4.9007 + 15.7068I 0

u = 0.33871 − 1.44643I

a = −1.15336 − 1.08090I

b = 1.34420 − 0.82627I

−4.9007 − 15.7068I 0

u = −0.30870 + 1.45326I

a = −0.867601 − 0.899252I

b = 1.274760 − 0.368438I

−1.42486 − 6.45156I 0

u = −0.30870 − 1.45326I

a = −0.867601 + 0.899252I

b = 1.274760 + 0.368438I

−1.42486 + 6.45156I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.29407 + 1.45891I

a = 0.812866 + 0.905342I

b = −1.08796 + 0.91104I

−6.61106 − 8.42932I 0

u = −0.29407 − 1.45891I

a = 0.812866 − 0.905342I

b = −1.08796 − 0.91104I

−6.61106 + 8.42932I 0

u = −0.15940 + 1.55376I

a = −0.323360 + 0.186562I

b = −0.528474 − 0.501666I

−8.96596 − 2.72922I 0

u = −0.15940 − 1.55376I

a = −0.323360 − 0.186562I

b = −0.528474 + 0.501666I

−8.96596 + 2.72922I 0

u = −0.226546 + 0.361814I

a = −0.207356 + 0.203335I

b = −0.236794 + 0.345165I

0.028670 − 0.891534I 0.60339 + 7.68948I

u = −0.226546 − 0.361814I

a = −0.207356 − 0.203335I

b = −0.236794 − 0.345165I

0.028670 + 0.891534I 0.60339 − 7.68948I

u = 0.05123 + 1.58208I

a = 0.0639758 + 0.0036631I

b = 0.792248 − 0.599111I

−9.31745 − 4.59027I 0

u = 0.05123 − 1.58208I

a = 0.0639758 − 0.0036631I

b = 0.792248 + 0.599111I

−9.31745 + 4.59027I 0

II.

= hu

+ u

+ · · · + b + 3u, u

− u

+ · · · + a − 1, u

+ u

+ · · · + 2u + 1i

(i) Arc colorings











−u

+ u

+ ··· + 9u + 1

−u

− u

+ ··· − 2u

− 3u





−u





−u

− u

+ ··· − 8u

+ 3

−u

+ u

+ ··· + u + 1





+ 18u

+ ··· − 12u

+ 15u

−u

− 3u

+ ··· − 5u − 1





−u

+ u





+ 1

−u

− 2u





−2u

− 2u

+ ··· − 12u − 2

+ u

+ ··· − 2u

+ 2u





−u

− 2u

+ u





−u

+ u

+ ··· + 10u + 1

−u

− u

+ ··· − u

− 3u





−2u

− 2u

+ ··· − 12u − 2

+ 2u

+ ··· + 7u

+ 4u



(ii) Obstruction class = 1

(iii) Cusp Shapes = −u

+ 10u

+ 2u

+ 84u

+ 52u

+ 276u

+ 194u

420u

+ 292u

+ 227u

+ 135u

− 85u

− 84u

− 67u

− 54u

+ 53u

+ 25u + 11

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

− 3u

+ ··· + 4u

+ 1

+ 3u

+ ··· + 3u + 1

+ 6u

+ ··· − u + 1

+ u

+ ··· + 9u

+ 1

− 3u

+ ··· − 3u + 1

, c

+ u

+ ··· + 2u + 1

− u

+ ··· + 9u

+ 1

+ u

+ ··· + 6u

+ 1

+ 6u

+ ··· + u + 1

+ u

+ ··· + 7u

+ 1

− u

+ ··· − 2u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

− 11y

+ ··· + 8y + 1

, c

− 15y

+ ··· + 3y + 1

, c

+ 12y

+ ··· − 3y + 1

, c

+ 15y

+ ··· + 18y + 1

, c

+ 19y

+ ··· + 12y + 1

− 3y

+ ··· + 12y + 1

− y

+ ··· + 14y + 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.773934 + 0.231488I

a = −2.08394 − 0.31153I

b = 1.282150 − 0.263447I

4.46749 − 1.83303I 7.57936 + 0.69386I

u = −0.773934 − 0.231488I

a = −2.08394 + 0.31153I

b = 1.282150 + 0.263447I

4.46749 + 1.83303I 7.57936 − 0.69386I

u = −0.214946 + 1.181900I

a = −0.677293 − 1.058070I

b = 1.59277 + 0.19212I

1.81304 − 1.52738I 7.36454 + 0.16276I

u = −0.214946 − 1.181900I

a = −0.677293 + 1.058070I

b = 1.59277 − 0.19212I

1.81304 + 1.52738I 7.36454 − 0.16276I

u = 0.207784 + 1.231320I

a = 1.113550 + 0.166807I

b = −1.303010 + 0.187111I

4.69100 + 1.96995I 2.62542 − 4.79081I

u = 0.207784 − 1.231320I

a = 1.113550 − 0.166807I

b = −1.303010 − 0.187111I

4.69100 − 1.96995I 2.62542 + 4.79081I

u = −0.038102 + 1.259780I

a = 0.48564 + 1.79761I

b = 0.318175 + 0.845570I

−5.44116 + 2.12330I −7.44188 − 2.77053I

u = −0.038102 − 1.259780I

a = 0.48564 − 1.79761I

b = 0.318175 − 0.845570I

−5.44116 − 2.12330I −7.44188 + 2.77053I

u = 0.622411 + 0.160441I

a = 1.46043 − 1.42137I

b = −1.086800 − 0.210154I

7.94870 + 0.94161I 11.28164 − 0.01284I

u = 0.622411 − 0.160441I

a = 1.46043 + 1.42137I

b = −1.086800 + 0.210154I

7.94870 − 0.94161I 11.28164 + 0.01284I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.370236 + 1.364330I

a = −1.119980 − 0.827045I

b = 1.088670 − 0.482755I

−0.53522 − 6.08319I 2.90511 + 6.25752I

u = −0.370236 − 1.364330I

a = −1.119980 + 0.827045I

b = 1.088670 + 0.482755I

−0.53522 + 6.08319I 2.90511 − 6.25752I

u = 0.27236 + 1.38898I

a = 0.169437 − 1.185730I

b = −0.899855 − 0.319836I

2.95502 + 4.25254I 5.77944 − 3.56884I

u = 0.27236 − 1.38898I

a = 0.169437 + 1.185730I

b = −0.899855 + 0.319836I

2.95502 − 4.25254I 5.77944 + 3.56884I

u = −0.07316 + 1.53250I

a = 0.048434 + 0.355139I

b = 0.205474 − 0.413665I

−8.72912 − 3.55791I −0.20761 + 3.94043I

u = −0.07316 − 1.53250I

a = 0.048434 − 0.355139I

b = 0.205474 + 0.413665I

−8.72912 + 3.55791I −0.20761 − 3.94043I

u = −0.132177 + 0.304356I

a = 0.60372 + 3.51396I

b = 0.302437 − 0.618636I

−2.23494 − 2.68244I 2.11398 + 3.46850I

u = −0.132177 − 0.304356I

a = 0.60372 − 3.51396I

b = 0.302437 + 0.618636I

−2.23494 + 2.68244I 2.11398 − 3.46850I

III. u-Polynomials

Crossings u-Polynomials at each crossing

− 3u

+ ··· + 4u

+ 1)(u

− 6u

+ ··· − 27u + 1)

+ 3u

+ ··· + 3u + 1)(u

− 2u

+ ··· − 2106u + 1161)

+ 6u

+ ··· − u + 1)(u

− u

+ ··· + 430u + 55)

+ u

+ ··· + 9u

+ 1)(u

+ 2u

+ ··· + 157u + 31)

− 3u

+ ··· − 3u + 1)(u

− 2u

+ ··· − 2106u + 1161)

, c

+ u

+ ··· + 2u + 1)(u

+ 32u

+ ··· + 17u + 19)

− u

+ ··· + 9u

+ 1)(u

+ 2u

+ ··· + 157u + 31)

+ u

+ ··· + 6u

+ 1)(u

+ 4u

+ ··· − u + 1)

+ 6u

+ ··· + u + 1)(u

− u

+ ··· + 430u + 55)

+ u

+ ··· + 7u

+ 1)(u

− 2u

+ ··· − 109361u + 34447)

− u

+ ··· − 2u + 1)(u

+ 32u

+ ··· + 17u + 19)

IV. Riley Polynomials

Crossings Riley Polynomials at each crossing

− 11y

+ ··· + 8y + 1)(y

− 54y

+ ··· + 189y + 1)

, c

− 15y

+ ··· + 3y + 1)

· (y

− 34y

+ ··· − 27367308y + 1347921)

, c

+ 12y

+ ··· − 3y + 1)(y

+ 25y

+ ··· + 220450y + 3025)

, c

+ 15y

+ ··· + 18y + 1)(y

+ 24y

+ ··· + 22223y + 961)

, c

+ 19y

+ ··· + 12y + 1)(y

+ 64y

+ ··· − 2075y + 361)

− 3y

+ ··· + 12y + 1)(y

− 50y

+ ··· + 217y + 1)

− y

+ ··· + 14y + 1)

· (y

+ 46y

+ ··· + 15032565303y + 1186595809)