12n

0463

(K12n

0463

)

A knot diagram

Linearized knot diagam

3 6 9 11 10 2 5 11 7 1 7 5

Solving Sequence

3,6

2 7

1,10

11 5 4 9 8 12

, c

Ideals for irreducible components

of X

par

= h1.95032 × 10

+ 1.71447 × 10

+ ··· + 4.19522 × 10

b + 2.83748 × 10

6.77996 × 10

+ 1.77525 × 10

+ ··· + 4.19522 × 10

a + 2.18312 × 10

, u

+ u

+ ··· − 4u + 1i

= h−22u

− 181u

+ ··· + 163b − 517, −236u

+ 207u

+ ··· + 489a − 656, u

+ 4u

+ ··· + u + 3i

* 2 irreducible components of dim

= 0, with total 76 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.

= h1.95 × 10

+ 1.71 × 10

+ · · · + 4.20 × 10

b + 2.84 × 10

, 6.78 ×

+1.78×10

+· · ·+4.20×10

a+2.18×10

, u

+· · ·−4u+1i

(i) Arc colorings















+ u





+ 1





−0.0161612u

− 0.00423161u

+ ··· + 9.21492u − 5.20384

−4.64891u

− 4.08673u

+ ··· + 8.22561u − 0.676360





1.35701u

− 1.90195u

+ ··· + 15.5812u − 3.61076

−0.690005u

− 0.579020u

+ ··· − 0.467421u + 2.14333





0.0705764u

+ 1.77602u

+ ··· + 7.98057u − 8.40092

−1.38197u

− 3.25826u

+ ··· + 15.1658u − 1.78365





−3.43593u

− 4.84658u

+ ··· + 27.2515u − 12.4708

0.831823u

+ 1.66029u

+ ··· − 4.45631u + 2.03328





2.85272u

− 0.882312u

+ ··· + 16.7462u − 5.66879

−1.66635u

− 1.20242u

+ ··· − 2.09986u + 2.60564





−2.83296u

− 0.179396u

+ ··· − 13.2309u + 6.27694

−1.18756u

− 1.89146u

+ ··· + 4.35427u − 0.0534336





−0.245429u

− 0.791586u

+ ··· + 10.2920u − 3.11445

−2.79987u

− 2.53249u

+ ··· + 6.69697u − 0.0731651



(ii) Obstruction class = −1

(iii) Cusp Shapes = −1.53377u

− 2.13196u

+ ··· + 30.2938u − 21.3146

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

+ 25u

+ ··· + 14u − 1

, c

− u

+ ··· − 4u − 1

, c

+ u

+ ··· + 20u − 1

+ 57u

+ ··· − 5u − 1

+ 2u

+ ··· − 20u − 8

+ 12u

+ ··· + 6371062u − 656059

− 16u

+ ··· + 4109u − 103

+ 17u

+ ··· − 1408u − 121

− 2u

+ ··· + 2391u − 4381

− 5u

+ ··· − 406462u − 931379

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

+ 17y

+ ··· + 290y −1

, c

+ 25y

+ ··· + 14y −1

, c

+ 81y

+ ··· − 90y −1

+ 114y

+ ··· − 39y −1

− 6y

+ ··· + 3024y −64

− 102y

+ ··· + 13754392721800y −430413411481

− 40y

+ ··· + 8276171y −10609

+ 5y

+ ··· − 20328y −14641

− 106y

+ ··· − 199156203y −19193161

+ 47y

+ ··· − 15214664971620y −867466841641

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.349956 + 0.946672I

a = −0.303689 − 0.199224I

b = −2.29980 − 2.68295I

−12.39530 − 1.32883I −10.52705 + 0.14046I

u = −0.349956 − 0.946672I

a = −0.303689 + 0.199224I

b = −2.29980 + 2.68295I

−12.39530 + 1.32883I −10.52705 − 0.14046I

u = −0.924015 + 0.413182I

a = 1.43213 − 0.45322I

b = 0.39289 − 1.40886I

−10.15880 + 9.30058I 0.80484 − 3.88564I

u = −0.924015 − 0.413182I

a = 1.43213 + 0.45322I

b = 0.39289 + 1.40886I

−10.15880 − 9.30058I 0.80484 + 3.88564I

u = −0.966093 + 0.416915I

a = −0.349131 + 0.038307I

b = −0.007320 + 0.449427I

1.114500 + 0.475775I −1.77277 − 7.35288I

u = −0.966093 − 0.416915I

a = −0.349131 − 0.038307I

b = −0.007320 − 0.449427I

1.114500 − 0.475775I −1.77277 + 7.35288I

u = 0.321525 + 1.004170I

a = −1.47698 − 1.06277I

b = 1.04811 − 2.34391I

−13.15110 + 0.96971I −6.75666 − 1.21694I

u = 0.321525 − 1.004170I

a = −1.47698 + 1.06277I

b = 1.04811 + 2.34391I

−13.15110 − 0.96971I −6.75666 + 1.21694I

u = −0.276056 + 0.903211I

a = −0.236831 − 1.280450I

b = −0.587986 − 0.401848I

−1.86758 − 2.05981I −0.46331 + 1.96537I

u = −0.276056 − 0.903211I

a = −0.236831 + 1.280450I

b = −0.587986 + 0.401848I

−1.86758 + 2.05981I −0.46331 − 1.96537I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.846735 + 0.415561I

a = 1.293880 + 0.511117I

b = 0.365878 + 1.061840I

0.02058 − 4.34656I 0.26821 + 3.69834I

u = 0.846735 − 0.415561I

a = 1.293880 − 0.511117I

b = 0.365878 − 1.061840I

0.02058 + 4.34656I 0.26821 − 3.69834I

u = 0.397636 + 0.979748I

a = −0.015757 + 0.428561I

b = −1.39141 + 1.12780I

−3.43752 + 1.28189I −5.91191 − 1.08703I

u = 0.397636 − 0.979748I

a = −0.015757 − 0.428561I

b = −1.39141 − 1.12780I

−3.43752 − 1.28189I −5.91191 + 1.08703I

u = −0.408296 + 0.978654I

a = 1.27837 + 0.98027I

b = 0.910664 − 0.028975I

−2.61713 − 0.73681I −3.54054 + 3.15346I

u = −0.408296 − 0.978654I

a = 1.27837 − 0.98027I

b = 0.910664 + 0.028975I

−2.61713 + 0.73681I −3.54054 − 3.15346I

u = −0.675685 + 0.597241I

a = 0.876923 − 0.578864I

b = −0.097247 − 0.847074I

1.50545 − 1.28490I 3.77323 + 4.50863I

u = −0.675685 − 0.597241I

a = 0.876923 + 0.578864I

b = −0.097247 + 0.847074I

1.50545 + 1.28490I 3.77323 − 4.50863I

u = 0.459215 + 1.005020I

a = −0.284902 + 0.841083I

b = 0.106017 + 1.132020I

−3.04982 + 4.72917I −4.15324 − 9.32450I

u = 0.459215 − 1.005020I

a = −0.284902 − 0.841083I

b = 0.106017 − 1.132020I

−3.04982 − 4.72917I −4.15324 + 9.32450I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.711622 + 0.542227I

a = −0.978562 − 0.301016I

b = 0.115817 − 1.372610I

2.68108 − 2.12211I 6.33969 + 1.94365I

u = 0.711622 − 0.542227I

a = −0.978562 + 0.301016I

b = 0.115817 + 1.372610I

2.68108 + 2.12211I 6.33969 − 1.94365I

u = −0.501529 + 1.005740I

a = −0.67417 + 1.37103I

b = 1.67778 + 2.16523I

−1.95552 − 5.12176I 0. + 6.61060I

u = −0.501529 − 1.005740I

a = −0.67417 − 1.37103I

b = 1.67778 − 2.16523I

−1.95552 + 5.12176I 0. − 6.61060I

u = 0.199034 + 0.817620I

a = 0.803863 − 0.976801I

b = −0.276848 − 0.608793I

−1.70481 − 1.56112I −0.16745 + 5.41560I

u = 0.199034 − 0.817620I

a = 0.803863 + 0.976801I

b = −0.276848 + 0.608793I

−1.70481 + 1.56112I −0.16745 − 5.41560I

u = −0.538375 + 1.030800I

a = −0.116672 − 0.787747I

b = 0.28486 − 2.44669I

−10.96040 − 4.57401I 0

u = −0.538375 − 1.030800I

a = −0.116672 + 0.787747I

b = 0.28486 + 2.44669I

−10.96040 + 4.57401I 0

u = −0.584272 + 1.019390I

a = 0.400981 − 0.948656I

b = −0.83486 − 1.37560I

0.20940 − 3.59994I 0

u = −0.584272 − 1.019390I

a = 0.400981 + 0.948656I

b = −0.83486 + 1.37560I

0.20940 + 3.59994I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.527359 + 1.065210I

a = 1.64010 − 0.51000I

b = 0.93686 + 1.21045I

−11.70070 + 5.59902I 0

u = 0.527359 − 1.065210I

a = 1.64010 + 0.51000I

b = 0.93686 − 1.21045I

−11.70070 − 5.59902I 0

u = 0.996785 + 0.661596I

a = −0.195695 + 0.706856I

b = −0.836567 + 0.341424I

−8.63281 + 4.27743I 0

u = 0.996785 − 0.661596I

a = −0.195695 − 0.706856I

b = −0.836567 − 0.341424I

−8.63281 − 4.27743I 0

u = 0.605290 + 1.038470I

a = −0.327621 − 0.864561I

b = 1.42976 − 1.72470I

1.19878 + 7.18626I 0

u = 0.605290 − 1.038470I

a = −0.327621 + 0.864561I

b = 1.42976 + 1.72470I

1.19878 − 7.18626I 0

u = 0.058017 + 1.216930I

a = −0.305650 + 0.796434I

b = −0.521846 + 0.385158I

−5.73579 − 1.82350I 0

u = 0.058017 − 1.216930I

a = −0.305650 − 0.796434I

b = −0.521846 − 0.385158I

−5.73579 + 1.82350I 0

u = −0.570883 + 0.483592I

a = 1.42182 + 0.20086I

b = −1.056060 + 0.012511I

−9.37580 + 0.10389I −0.28028 − 1.50449I

u = −0.570883 − 0.483592I

a = 1.42182 − 0.20086I

b = −1.056060 − 0.012511I

−9.37580 − 0.10389I −0.28028 + 1.50449I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.421818 + 0.600652I

a = −1.77014 + 0.12826I

b = 0.01207 + 1.76563I

−0.649695 + 1.123590I 1.75264 − 1.62857I

u = −0.421818 − 0.600652I

a = −1.77014 − 0.12826I

b = 0.01207 − 1.76563I

−0.649695 − 1.123590I 1.75264 + 1.62857I

u = 0.625228 + 1.120040I

a = 0.285068 + 1.206890I

b = −1.23895 + 1.72070I

−2.08741 + 9.80069I 0

u = 0.625228 − 1.120040I

a = 0.285068 − 1.206890I

b = −1.23895 − 1.72070I

−2.08741 − 9.80069I 0

u = −0.075556 + 1.291700I

a = −0.595125 − 0.881595I

b = −0.251519 − 0.446971I

−16.3180 + 6.3103I 0

u = −0.075556 − 1.291700I

a = −0.595125 + 0.881595I

b = −0.251519 + 0.446971I

−16.3180 − 6.3103I 0

u = 0.595217 + 0.376896I

a = −0.49225 + 2.24517I

b = −0.95401 + 1.43916I

−9.74503 − 1.13283I 0.125687 + 0.944361I

u = 0.595217 − 0.376896I

a = −0.49225 − 2.24517I

b = −0.95401 − 1.43916I

−9.74503 + 1.13283I 0.125687 − 0.944361I

u = −0.652334 + 1.131340I

a = −0.054821 + 0.544694I

b = 0.97755 + 1.04049I

−1.05681 − 6.25223I 0

u = −0.652334 − 1.131340I

a = −0.054821 − 0.544694I

b = 0.97755 − 1.04049I

−1.05681 + 6.25223I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.648644 + 1.154300I

a = 0.242666 − 1.233560I

b = −1.57143 − 2.00829I

−12.4207 − 15.0539I 0

u = −0.648644 − 1.154300I

a = 0.242666 + 1.233560I

b = −1.57143 + 2.00829I

−12.4207 + 15.0539I 0

u = −0.671768

a = 0.366130

b = 0.477596

1.20012 11.5930

u = 0.80509 + 1.19177I

a = 0.354067 − 0.302190I

b = 0.803093 + 0.109041I

−10.20330 + 2.47505I 0

u = 0.80509 − 1.19177I

a = 0.354067 + 0.302190I

b = 0.803093 − 0.109041I

−10.20330 − 2.47505I 0

u = 0.280643 + 0.019804I

a = 2.46507 + 1.48163I

b = 0.125719 − 0.515240I

−1.21526 − 1.45435I −0.50304 + 4.00620I

u = 0.280643 − 0.019804I

a = 2.46507 − 1.48163I

b = 0.125719 + 0.515240I

−1.21526 + 1.45435I −0.50304 − 4.00620I

II. I

= h−22u

− 181u

+ · · · + 163b − 517, −236u

+ 207u

+ · · · +

489a − 656, u

+ 4u

+ · · · + u + 3i

(i) Arc colorings















+ u





+ 1





0.482618u

− 0.423313u

+ ··· + 2.27198u + 1.34151

0.134969u

+ 1.11043u

+ ··· + 2.71166u + 3.17178





1.01022u

− 0.809816u

+ ··· + 2.78119u + 0.740286

+ 4u

+ ··· + u + 4





−0.750511u

− 0.159509u

+ ··· − 0.139059u − 2.13701

1.43558u

− 0.0981595u

+ ··· + 4.47853u − 1.26380





0.523517u

+ 0.337423u

+ ··· + 2.39673u − 1.69734

−0.533742u

− 0.527607u

+ ··· − 1.17791u − 0.0429448





1.43967u

− 0.822086u

+ ··· + 2.59100u − 0.167689

−0.325153u

+ 0.552147u

+ ··· + 0.558282u + 2.85890





0.482618u

− 0.423313u

+ ··· + 2.27198u − 2.65849

0.423313u

− 0.926380u

+ ··· − 1.85890u − 2.55215





0.482618u

− 0.423313u

+ ··· + 2.27198u + 2.34151

0.0613497u

+ 1.14110u

+ ··· + 1.68712u + 4.44172



(ii) Obstruction class = 1

(iii) Cusp Shapes = −

163

−

163

+ ··· −

941

163

u −

1059

163

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

− 8u

+ ··· − 47u + 9

+ 4u

+ ··· + u + 3

+ 10u

+ ··· + 3u + 1

+ u

+ ··· + 2u − 1

+ u

+ ··· + 2u − 1

+ 4u

+ ··· + u − 3

+ 10u

+ ··· + 3u − 1

− 15u

+ ··· + 17u − 3

+ 3u

+ ··· − u

+ 1

+ 4u

+ ··· + 5u + 1

− u

+ ··· + 6u + 1

+ 2u

+ ··· − u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

+ 8y

+ ··· − 131y −81

, c

+ 8y

+ ··· − 47y −9

, c

+ 20y

+ ··· − 7y −1

+ 13y

+ ··· + 12y −1

+ y

+ ··· − 6y −1

− 19y

+ ··· − 101y −9

− 21y

+ ··· + 2y −1

− 8y

+ ··· + 7y −1

− 19y

+ ··· − 48y −1

+ 6y

+ ··· − y −1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.809380 + 0.609336I

a = −0.642590 + 0.567390I

b = −0.033190 + 1.100160I

1.93114 + 0.05703I 5.27608 − 0.61329I

u = −0.809380 − 0.609336I

a = −0.642590 − 0.567390I

b = −0.033190 − 1.100160I

1.93114 − 0.05703I 5.27608 + 0.61329I

u = 0.380702 + 0.892229I

a = 0.864989 + 0.488196I

b = −1.45142 + 3.06408I

−11.73130 + 1.58594I 1.69710 − 4.85525I

u = 0.380702 − 0.892229I

a = 0.864989 − 0.488196I

b = −1.45142 − 3.06408I

−11.73130 − 1.58594I 1.69710 + 4.85525I

u = −0.950794

a = 0.534200

b = 0.417548

0.736407 −10.1920

u = 0.106744 + 1.047650I

a = 0.605523 − 0.806007I

b = 0.379570 − 0.884630I

−3.40808 − 2.06211I −4.23882 + 3.25949I

u = 0.106744 − 1.047650I

a = 0.605523 + 0.806007I

b = 0.379570 + 0.884630I

−3.40808 + 2.06211I −4.23882 − 3.25949I

u = 0.792456 + 0.478311I

a = −1.237570 − 0.352759I

b = 0.061164 − 1.114880I

1.79413 − 3.68410I 3.77498 + 3.60536I

u = 0.792456 − 0.478311I

a = −1.237570 + 0.352759I

b = 0.061164 + 1.114880I

1.79413 + 3.68410I 3.77498 − 3.60536I

u = −0.312010 + 0.855320I

a = 1.26370 + 0.74522I

b = −0.083954 − 0.552115I

−1.95432 + 0.51994I −3.03581 + 0.54030I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.312010 − 0.855320I

a = 1.26370 − 0.74522I

b = −0.083954 + 0.552115I

−1.95432 − 0.51994I −3.03581 − 0.54030I

u = −0.402259 + 1.014470I

a = −0.054502 − 1.190310I

b = −0.90125 − 1.24715I

−2.70781 − 3.32351I −4.18487 + 4.02916I

u = −0.402259 − 1.014470I

a = −0.054502 + 1.190310I

b = −0.90125 + 1.24715I

−2.70781 + 3.32351I −4.18487 − 4.02916I

u = −0.635239 + 1.022560I

a = −0.614017 + 0.776240I

b = 0.90356 + 1.37817I

0.65149 − 5.44524I 1.78951 + 4.96299I

u = −0.635239 − 1.022560I

a = −0.614017 − 0.776240I

b = 0.90356 − 1.37817I

0.65149 + 5.44524I 1.78951 − 4.96299I

u = 0.732861 + 0.997527I

a = −0.376611 − 0.095684I

b = −0.241631 + 0.261608I

−9.58271 + 2.96759I −0.28434 − 4.02482I

u = 0.732861 − 0.997527I

a = −0.376611 + 0.095684I

b = −0.241631 − 0.261608I

−9.58271 − 2.96759I −0.28434 + 4.02482I

u = 0.621521 + 1.087370I

a = −0.242691 − 1.035660I

b = 1.15837 − 1.98145I

−0.03477 + 9.00564I 0.80205 − 7.81650I

u = 0.621521 − 1.087370I

a = −0.242691 + 1.035660I

b = 1.15837 + 1.98145I

−0.03477 − 9.00564I 0.80205 + 7.81650I

III. u-Polynomials

Crossings u-Polynomials at each crossing

− 8u

+ ··· − 47u + 9)(u

+ 25u

+ ··· + 14u − 1)

+ 4u

+ ··· + u + 3)(u

− u

+ ··· − 4u − 1)

+ 10u

+ ··· + 3u + 1)(u

+ u

+ ··· + 20u − 1)

+ u

+ ··· + 2u − 1)(u

+ 57u

+ ··· − 5u − 1)

+ u

+ ··· + 2u − 1)(u

+ 2u

+ ··· − 20u − 8)

+ 4u

+ ··· + u − 3)(u

− u

+ ··· − 4u − 1)

+ 10u

+ ··· + 3u − 1)(u

+ u

+ ··· + 20u − 1)

− 15u

+ ··· + 17u − 3)

· (u

+ 12u

+ ··· + 6371062u − 656059)

+ 3u

+ ··· − u

+ 1)(u

− 16u

+ ··· + 4109u − 103)

+ 4u

+ ··· + 5u + 1)(u

+ 17u

+ ··· − 1408u − 121)

− u

+ ··· + 6u + 1)(u

− 2u

+ ··· + 2391u − 4381)

+ 2u

+ ··· − u + 1)(u

− 5u

+ ··· − 406462u − 931379)

IV. Riley Polynomials

Crossings Riley Polynomials at each crossing

+ 8y

+ ··· − 131y −81)(y

+ 17y

+ ··· + 290y −1)

, c

+ 8y

+ ··· − 47y −9)(y

+ 25y

+ ··· + 14y −1)

, c

+ 20y

+ ··· − 7y −1)(y

+ 81y

+ ··· − 90y −1)

+ 13y

+ ··· + 12y −1)(y

+ 114y

+ ··· − 39y −1)

+ y

+ ··· − 6y −1)(y

− 6y

+ ··· + 3024y −64)

− 19y

+ ··· − 101y −9)

· (y

− 102y

+ ··· + 13754392721800y −430413411481)

− 21y

+ ··· + 2y −1)(y

− 40y

+ ··· + 8276171y −10609)

− 8y

+ ··· + 7y −1)(y

+ 5y

+ ··· − 20328y −14641)

− 19y

+ ··· − 48y −1)

· (y

− 106y

+ ··· − 199156203y −19193161)

+ 6y

+ ··· − y −1)

· (y

+ 47y

+ ··· − 15214664971620y −867466841641)