12n

0566

(K12n

0566

)

A knot diagram

1

Linearized knot diagam

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

Solving Sequence

3,9 4,7

2 1 8 5 12 10 6 11

c

3

c

2

c

1

c

8

c

4

c

12

c

9

c

6

c

11

c

5

, c

7

, c

10

Ideals for irreducible components

2

of X

par

I

u

1

= h−4.65742 × 10

21

u

31

− 2.20023 × 10

22

u

30

+ ··· + 9.36708 × 10

23

b + 5.12230 × 10

23

,

2.94856 × 10

25

u

31

− 3.10386 × 10

25

u

30

+ ··· + 2.99747 × 10

25

a − 2.87196 × 10

25

, u

32

− u

31

+ ··· − 2u + 1i

I

u

2

= hb − u, a

5

− a

4

+ 2a

3

− a

2

+ a − 1, u

2

+ 1i

I

u

3

= hb − u, a, u

6

− u

5

+ 2u

4

− 2u

3

+ 2u

2

− 2u + 1i

I

u

4

= hb − u, a, u

3

+ u

2

+ 2u + 1i

* 4 irreducible components of dim

C

= 0, with total 51 representations.

1

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).

2

All coeﬃcients of polynomials are rational numbers. But the coeﬃcients are sometimes approximated

in decimal forms when there is not enough margin.

1

I.

I

u

1

= h−4.66×10

21

u

31

−2.20×10

22

u

30

+· · ·+9.37×10

23

b+5.12×10

23

, 2.95×

10

25

u

31

−3.10×10

25

u

30

+· · ·+3.00×10

25

a−2.87×10

25

, u

32

−u

31

+· · ·−2u+1i

(i) Arc colorings

a

3

=



1

0



a

9

=



0

u



a

4

=



1

u

2



a

7

=



−0.983683u

31

+ 1.03549u

30

+ ··· + 42.1633u + 0.958130

0.00497211u

31

+ 0.0234890u

30

+ ··· + 1.12532u − 0.546841



a

2

=



0.495029u

31

− 0.483684u

30

+ ··· + 26.1222u − 0.952046

−0.0284611u

31

+ 0.0288036u

30

+ ··· + 0.536896u − 0.995028



a

1

=



0.466568u

31

− 0.454881u

30

+ ··· + 26.6591u − 1.94707

−0.0284611u

31

+ 0.0288036u

30

+ ··· + 0.536896u − 0.995028



a

8

=



u

3

+ u



a

5

=



u

2

+ 1

u

4

+ 2u

2



a

12

=



0.466568u

31

− 0.454881u

30

+ ··· + 26.6591u − 1.94707

−0.0000739509u

31

+ 0.00179294u

30

+ ··· + 0.0937032u − 1.00672



a

10

=



0.935244u

31

− 1.05640u

30

+ ··· − 35.9185u + 0.318643

−0.00328364u

31

− 0.0312396u

30

+ ··· + 1.93055u + 0.535840



a

6

=



−0.357364u

31

+ 0.452611u

30

+ ··· − 8.86369u + 3.30364

0.136131u

31

− 0.134930u

30

+ ··· − 6.56253u + 0.588091



a

11

=



0.465451u

31

− 0.514663u

30

+ ··· − 8.17487u + 4.78562

0.151172u

31

− 0.159734u

30

+ ··· − 2.72954u − 0.0680096



(ii) Obstruction class = −1

(iii) Cusp Shapes =

1674544166583428940712685

3746832618160827210734692

u

31

−

3228763469657253763874131

7493665236321654421469384

u

30

+ ··· +

115090649984726751416336801

7493665236321654421469384

u −

4624345191860318935353055

936708154540206802683673

2

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

u

32

+ 3u

31

+ ··· − 20u + 1

c

2

, c

7

u

32

+ u

31

+ ··· − 10u

2

+ 1

c

3

, c

4

, c

8

u

32

+ u

31

+ ··· + 2u + 1

c

5

, c

6

, c

10

u

32

+ 2u

31

+ ··· + 5u + 2

c

9

, c

12

u

32

+ 8u

31

+ ··· + 837u + 136

c

11

u

32

− 2u

31

+ ··· − 96u + 16

3

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

y

32

+ 63y

31

+ ··· − 48y + 1

c

2

, c

7

y

32

+ 3y

31

+ ··· − 20y + 1

c

3

, c

4

, c

8

y

32

+ 47y

31

+ ··· − 84y + 1

c

5

, c

6

, c

10

y

32

+ 28y

31

+ ··· + 19y + 4

c

9

, c

12

y

32

+ 44y

30

+ ··· − 169353y + 18496

c

11

y

32

− 4y

31

+ ··· − 256y + 256

4

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

1

√

−1(vol +

√

−1CS) Cusp shape

u = −0.149637 + 1.036980I

a = −0.417547 + 0.954803I

b = 0.302187 − 0.006644I

1.43807 − 1.50420I 9.22727 + 3.53831I

u = −0.149637 − 1.036980I

a = −0.417547 − 0.954803I

b = 0.302187 + 0.006644I

1.43807 + 1.50420I 9.22727 − 3.53831I

u = 0.570569 + 0.926273I

a = 0.652139 + 0.672144I

b = −0.729100 + 0.429975I

0.356823 − 1.078380I 5.98174 + 1.89501I

u = 0.570569 − 0.926273I

a = 0.652139 − 0.672144I

b = −0.729100 − 0.429975I

0.356823 + 1.078380I 5.98174 − 1.89501I

u = −0.759558 + 0.797956I

a = −0.669157 + 0.706117I

b = 0.806103 + 0.667276I

2.84076 + 4.52561I 7.98035 − 6.47723I

u = −0.759558 − 0.797956I

a = −0.669157 − 0.706117I

b = 0.806103 − 0.667276I

2.84076 − 4.52561I 7.98035 + 6.47723I

u = 0.080786 + 1.113860I

a = 0.450290 + 1.273100I

b = −0.240058 − 0.218923I

−4.20210 + 4.53860I 4.95050 − 3.52289I

u = 0.080786 − 1.113860I

a = 0.450290 − 1.273100I

b = −0.240058 + 0.218923I

−4.20210 − 4.53860I 4.95050 + 3.52289I

u = 0.856979 + 0.733531I

a = 0.658177 + 0.744370I

b = −0.839448 + 0.780469I

−2.06044 − 8.15993I 2.47068 + 7.37481I

u = 0.856979 − 0.733531I

a = 0.658177 − 0.744370I

b = −0.839448 − 0.780469I

−2.06044 + 8.15993I 2.47068 − 7.37481I

5

Solutions to I

u

1

√

−1(vol +

√

−1CS) Cusp shape

u = 0.388206 + 0.750499I

a = 0.618021 + 0.553690I

b = −0.445761 + 0.493038I

0.37663 − 1.40948I 4.16499 + 4.71779I

u = 0.388206 − 0.750499I

a = 0.618021 − 0.553690I

b = −0.445761 − 0.493038I

0.37663 + 1.40948I 4.16499 − 4.71779I

u = −0.564144 + 0.368266I

a = −1.072100 + 0.757048I

b = 0.426872 + 0.891946I

−4.95649 + 1.03511I −2.62837 − 3.37474I

u = −0.564144 − 0.368266I

a = −1.072100 − 0.757048I

b = 0.426872 − 0.891946I

−4.95649 − 1.03511I −2.62837 + 3.37474I

u = −0.14043 + 1.61047I

a = 1.344160 + 0.225189I

b = −0.909776 − 0.978319I

1.96786 + 3.39058I 0

u = −0.14043 − 1.61047I

a = 1.344160 − 0.225189I

b = −0.909776 + 0.978319I

1.96786 − 3.39058I 0

u = 0.31474 + 1.69085I

a = −1.283680 − 0.037904I

b = 0.93918 − 1.20942I

6.02211 − 12.78960I 0

u = 0.31474 − 1.69085I

a = −1.283680 + 0.037904I

b = 0.93918 + 1.20942I

6.02211 + 12.78960I 0

u = 0.20411 + 1.72625I

a = −1.226140 + 0.091965I

b = 1.02007 − 1.09862I

9.50782 − 4.34458I 0

u = 0.20411 − 1.72625I

a = −1.226140 − 0.091965I

b = 1.02007 + 1.09862I

9.50782 + 4.34458I 0

6

Solutions to I

u

1

√

−1(vol +

√

−1CS) Cusp shape

u = −0.27493 + 1.71725I

a = 1.249820 + 0.010579I

b = −0.98277 − 1.17471I

11.3763 + 8.7540I 0

u = −0.27493 − 1.71725I

a = 1.249820 − 0.010579I

b = −0.98277 + 1.17471I

11.3763 − 8.7540I 0

u = 0.08047 + 1.76969I

a = −1.133210 + 0.199889I

b = 1.12271 − 0.97669I

9.94630 − 3.44071I 0

u = 0.08047 − 1.76969I

a = −1.133210 − 0.199889I

b = 1.12271 + 0.97669I

9.94630 + 3.44071I 0

u = −0.07166 + 1.77723I

a = −1.040780 + 0.308237I

b = 1.20703 − 0.80705I

7.36926 + 5.04799I 0

u = −0.07166 − 1.77723I

a = −1.040780 − 0.308237I

b = 1.20703 + 0.80705I

7.36926 − 5.04799I 0

u = 0.00485 + 1.78607I

a = 1.074930 + 0.259134I

b = −1.18249 − 0.88752I

12.35040 − 0.91754I 0

u = 0.00485 − 1.78607I

a = 1.074930 − 0.259134I

b = −1.18249 + 0.88752I

12.35040 + 0.91754I 0

u = −0.156144 + 0.076843I

a = −4.97166 − 4.58572I

b = 0.069135 − 1.045370I

−7.55319 − 4.33239I −6.63531 + 3.69864I

u = −0.156144 − 0.076843I

a = −4.97166 + 4.58572I

b = 0.069135 + 1.045370I

−7.55319 + 4.33239I −6.63531 − 3.69864I

7

Solutions to I

u

1

√

−1(vol +

√

−1CS) Cusp shape

u = 0.1157890 + 0.0692134I

a = 6.26675 − 1.88119I

b = −0.063886 + 0.968637I

−2.01181 − 1.57269I −2.90508 + 4.76814I

u = 0.1157890 − 0.0692134I

a = 6.26675 + 1.88119I

b = −0.063886 − 0.968637I

−2.01181 + 1.57269I −2.90508 − 4.76814I

8

II. I

u

2

= hb − u, a

5

− a

4

+ 2a

3

− a

2

+ a − 1, u

2

+ 1i

(i) Arc colorings

a

3

=



1

0



a

9

=



0

u



a

4

=



1

−1



a

7

=



a

u



a

2

=



au + 1

−1



a

1

=



au

−1



a

8

=



u

0



a

5

=



0

−1



a

12

=



au

−au − 1



a

10

=



−a

2

u

a

2

u + a + u



a

6

=



a

4

− a

3

+ a

2

+ 1

a

4

u − a

4

+ a

2

u − a

2

+ u − 1



a

11

=



a

3

u + au

−a

2

− au − 1



(ii) Obstruction class = 1

(iii) Cusp Shapes = 4a

3

− 4a

2

+ 4a

9

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

(u − 1)

10

c

2

, c

3

, c

4

c

7

, c

8

(u

2

+ 1)

5

c

5

, c

6

, c

10

u

10

+ 5u

8

+ 8u

6

+ 3u

4

− u

2

+ 1

c

9

(u

5

− u

4

+ 2u

3

− u

2

+ u − 1)

2

c

11

u

10

+ u

8

+ 8u

6

+ 3u

4

+ 3u

2

+ 1

c

12

(u

5

+ u

4

+ 2u

3

+ u

2

+ u + 1)

2

10

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

(y −1)

10

c

2

, c

3

, c

4

c

7

, c

8

(y + 1)

10

c

5

, c

6

, c

10

(y

5

+ 5y

4

+ 8y

3

+ 3y

2

− y + 1)

2

c

9

, c

12

(y

5

+ 3y

4

+ 4y

3

+ y

2

− y −1)

2

c

11

(y

5

+ y

4

+ 8y

3

+ 3y

2

+ 3y + 1)

2

11

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

2

√

−1(vol +

√

−1CS) Cusp shape

u = 1.000000I

a = −0.339110 + 0.822375I

b = 1.000000I

−0.32910 − 1.53058I 3.48489 + 4.43065I

u = 1.000000I

a = −0.339110 − 0.822375I

b = 1.000000I

−0.32910 + 1.53058I 3.48489 − 4.43065I

u = 1.000000I

a = 0.766826

b = 1.000000I

−2.40108 2.51890

u = 1.000000I

a = 0.455697 + 1.200150I

b = 1.000000I

−5.87256 + 4.40083I −0.74431 − 3.49859I

u = 1.000000I

a = 0.455697 − 1.200150I

b = 1.000000I

−5.87256 − 4.40083I −0.74431 + 3.49859I

u = − 1.000000I

a = −0.339110 + 0.822375I

b = − 1.000000I

−0.32910 − 1.53058I 3.48489 + 4.43065I

u = − 1.000000I

a = −0.339110 − 0.822375I

b = − 1.000000I

−0.32910 + 1.53058I 3.48489 − 4.43065I

u = − 1.000000I

a = 0.766826

b = − 1.000000I

−2.40108 2.51890

u = − 1.000000I

a = 0.455697 + 1.200150I

b = − 1.000000I

−5.87256 + 4.40083I −0.74431 − 3.49859I

u = − 1.000000I

a = 0.455697 − 1.200150I

b = − 1.000000I

−5.87256 − 4.40083I −0.74431 + 3.49859I

12

III. I

u

3

= hb − u, a, u

6

− u

5

+ 2u

4

− 2u

3

+ 2u

2

− 2u + 1i

(i) Arc colorings

a

3

=



1

0



a

9

=



0

u



a

4

=



1

u

2



a

7

=



0

u



a

2

=



1

u

2



a

1

=



u

2

+ 1

u

2



a

8

=



u

3

+ u



a

5

=



u

2

+ 1

u

4

+ 2u

2



a

12

=



u

2

+ 1

u

4

+ 2u

2



a

10

=



u

5

+ 2u

3

+ u

2u

5

+ 2u

3

+ 2u − 1



a

6

=



−2u

5

+ u

4

− 4u

3

+ 3u

2

− 3u + 3

−3u

5

+ 2u

4

− 4u

3

+ 3u

2

− u + 3



a

11

=



u

2

+ 1

2u

4

+ 3u

2



(ii) Obstruction class = −1

(iii) Cusp Shapes = −4u

3

− 4u + 6

13

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

u

6

+ 3u

5

+ 4u

4

+ 2u

3

+ 1

c

2

, c

3

, c

4

c

7

, c

8

u

6

+ u

5

+ 2u

4

+ 2u

3

+ 2u

2

+ 2u + 1

c

5

, c

6

, c

10

(u

3

− u

2

+ 2u − 1)

2

c

9

, c

11

, c

12

(u

3

+ u

2

− 1)

2

14

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

y

6

− y

5

+ 4y

4

− 2y

3

+ 8y

2

+ 1

c

2

, c

3

, c

4

c

7

, c

8

y

6

+ 3y

5

+ 4y

4

+ 2y

3

+ 1

c

5

, c

6

, c

10

(y

3

+ 3y

2

+ 2y −1)

2

c

9

, c

11

, c

12

(y

3

− y

2

+ 2y −1)

2

15

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

3

√

−1(vol +

√

−1CS) Cusp shape

u = −0.498832 + 1.001300I

a = 0

b = −0.498832 + 1.001300I

−3.02413 + 2.82812I 2.49024 − 2.97945I

u = −0.498832 − 1.001300I

a = 0

b = −0.498832 − 1.001300I

−3.02413 − 2.82812I 2.49024 + 2.97945I

u = 0.284920 + 1.115140I

a = 0

b = 0.284920 + 1.115140I

1.11345 9.01951 + 0.I

u = 0.284920 − 1.115140I

a = 0

b = 0.284920 − 1.115140I

1.11345 9.01951 + 0.I

u = 0.713912 + 0.305839I

a = 0

b = 0.713912 + 0.305839I

−3.02413 + 2.82812I 2.49024 − 2.97945I

u = 0.713912 − 0.305839I

a = 0

b = 0.713912 − 0.305839I

−3.02413 − 2.82812I 2.49024 + 2.97945I

16

IV. I

u

4

= hb − u, a, u

3

+ u

2

+ 2u + 1i

(i) Arc colorings

a

3

=



1

0



a

9

=



0

u



a

4

=



1

u

2



a

7

=



0

u



a

2

=



1

u

2



a

1

=



u

2

+ 1

u

2



a

8

=



u

−u

2

− u − 1



a

5

=



u

2

+ 1

u

2

+ u + 1



a

12

=



u

2

+ 1

u

2

+ u + 1



a

10

=



−1

2u



a

6

=



−u

2u

2

+ u



a

11

=



u

2

+ 1

u

2

+ 2u + 2



(ii) Obstruction class = −1

(iii) Cusp Shapes = 4u

2

+ 4u + 10

17

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

u

3

+ 3u

2

+ 2u − 1

c

2

, c

3

, c

4

c

5

, c

6

, c

7

c

8

, c

10

u

3

− u

2

+ 2u − 1

c

9

, c

11

, c

12

u

3

+ u

2

− 1

18

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

y

3

− 5y

2

+ 10y −1

c

2

, c

3

, c

4

c

5

, c

6

, c

7

c

8

, c

10

y

3

+ 3y

2

+ 2y −1

c

9

, c

11

, c

12

y

3

− y

2

+ 2y −1

19

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

4

√

−1(vol +

√

−1CS) Cusp shape

u = −0.215080 + 1.307140I

a = 0

b = −0.215080 + 1.307140I

−3.02413 − 2.82812I 2.49024 + 2.97945I

u = −0.215080 − 1.307140I

a = 0

b = −0.215080 − 1.307140I

−3.02413 + 2.82812I 2.49024 − 2.97945I

u = −0.569840

a = 0

b = −0.569840

1.11345 9.01950

20

V. u-Polynomials

Crossings u-Polynomials at each crossing

c

1

(u − 1)

10

(u

3

+ 3u

2

+ 2u − 1)(u

6

+ 3u

5

+ 4u

4

+ 2u

3

+ 1)

· (u

32

+ 3u

31

+ ··· − 20u + 1)

c

2

, c

7

(u

2

+ 1)

5

(u

3

− u

2

+ 2u − 1)(u

6

+ u

5

+ 2u

4

+ 2u

3

+ 2u

2

+ 2u + 1)

· (u

32

+ u

31

+ ··· − 10u

2

+ 1)

c

3

, c

4

, c

8

(u

2

+ 1)

5

(u

3

− u

2

+ 2u − 1)(u

6

+ u

5

+ 2u

4

+ 2u

3

+ 2u

2

+ 2u + 1)

· (u

32

+ u

31

+ ··· + 2u + 1)

c

5

, c

6

, c

10

(u

3

− u

2

+ 2u − 1)

3

(u

10

+ 5u

8

+ 8u

6

+ 3u

4

− u

2

+ 1)

· (u

32

+ 2u

31

+ ··· + 5u + 2)

c

9

(u

3

+ u

2

− 1)

3

(u

5

− u

4

+ 2u

3

− u

2

+ u − 1)

2

· (u

32

+ 8u

31

+ ··· + 837u + 136)

c

11

(u

3

+ u

2

− 1)

3

(u

10

+ u

8

+ 8u

6

+ 3u

4

+ 3u

2

+ 1)

· (u

32

− 2u

31

+ ··· − 96u + 16)

c

12

(u

3

+ u

2

− 1)

3

(u

5

+ u

4

+ 2u

3

+ u

2

+ u + 1)

2

· (u

32

+ 8u

31

+ ··· + 837u + 136)

21

VI. Riley Polynomials

Crossings Riley Polynomials at each crossing

c

1

(y −1)

10

(y

3

− 5y

2

+ 10y −1)(y

6

− y

5

+ 4y

4

− 2y

3

+ 8y

2

+ 1)

· (y

32

+ 63y

31

+ ··· − 48y + 1)

c

2

, c

7

(y + 1)

10

(y

3

+ 3y

2

+ 2y −1)(y

6

+ 3y

5

+ 4y

4

+ 2y

3

+ 1)

· (y

32

+ 3y

31

+ ··· − 20y + 1)

c

3

, c

4

, c

8

(y + 1)

10

(y

3

+ 3y

2

+ 2y −1)(y

6

+ 3y

5

+ 4y

4

+ 2y

3

+ 1)

· (y

32

+ 47y

31

+ ··· − 84y + 1)

c

5

, c

6

, c

10

(y

3

+ 3y

2

+ 2y −1)

3

(y

5

+ 5y

4

+ 8y

3

+ 3y

2

− y + 1)

2

· (y

32

+ 28y

31

+ ··· + 19y + 4)

c

9

, c

12

(y

3

− y

2

+ 2y −1)

3

(y

5

+ 3y

4

+ 4y

3

+ y

2

− y −1)

2

· (y

32

+ 44y

30

+ ··· − 169353y + 18496)

c

11

(y

3

− y

2

+ 2y −1)

3

(y

5

+ y

4

+ 8y

3

+ 3y

2

+ 3y + 1)

2

· (y

32

− 4y

31

+ ··· − 256y + 256)

22