12n

0336

(K12n

0336

)

A knot diagram

1

Linearized knot diagam

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

Solving Sequence

9,11

12 10

1,4

8 3 7 5 6 2

c

11

c

9

c

12

c

8

c

3

c

7

c

4

c

5

c

2

c

1

, c

6

, c

10

Ideals for irreducible components

2

of X

par

I

u

1

= h−1706550177091u

18

− 23512487300441u

17

+ ··· + 39336273597696b − 69157159108721,

− 32608816754461u

18

− 456051534293894u

17

+ ··· + 19668136798848a − 1093408920959144,

u

19

+ 14u

18

+ ··· + 52u + 1i

I

u

2

= h−a

8

+ a

7

+ 3a

6

− 2a

5

− 3a

4

+ 2a

3

+ b + a + 2, a

9

− a

8

− 2a

7

+ 3a

6

+ a

5

− 3a

4

+ 2a

3

− a + 1, u − 1i

I

u

3

= h−3a

3

u + 2a

3

− a

2

u + b + a, a

4

− a

2

u − 2a

2

+ 3u + 5, u

2

+ u − 1i

* 3 irreducible components of dim

C

= 0, with total 36 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−1.71 × 10

12

u

18

− 2.35 × 10

13

u

17

+ · · · + 3.93 × 10

13

b − 6.92 ×

10

13

, −3.26 × 10

13

u

18

− 4.56 × 10

14

u

17

+ · · · + 1.97 × 10

13

a − 1.09 ×

10

15

, u

19

+ 14u

18

+ · · · + 52u + 1i

(i) Arc colorings

a

9

=



0

u



a

11

=



1

0



a

12

=



1

−u

2



a

10

=



u

−u

3

+ u



a

1

=



−u

2

+ 1

u

4

− 2u

2



a

4

=



1.65795u

18

+ 23.1873u

17

+ ··· + 1589.07u + 55.5929

0.0433836u

18

+ 0.597730u

17

+ ··· + 39.8060u + 1.75810



a

8

=



1.84251u

18

+ 25.7334u

17

+ ··· + 1669.72u + 43.2886

0.0542335u

18

+ 0.767279u

17

+ ··· + 55.0156u + 1.70577



a

3

=



0.243745u

18

+ 3.43967u

17

+ ··· + 332.641u + 35.7067

−0.0193717u

18

− 0.267431u

17

+ ··· − 10.7266u + 0.631068



a

7

=



1.84251u

18

+ 25.7334u

17

+ ··· + 1669.72u + 43.2886

0.0598519u

18

+ 0.839590u

17

+ ··· + 56.3822u + 1.76749



a

5

=



0.0513825u

18

+ 0.731152u

17

+ ··· + 83.7307u + 7.87385

−0.00184480u

18

− 0.0331746u

17

+ ··· − 3.98487u + 0.0723727



a

6

=



0.0532273u

18

+ 0.764327u

17

+ ··· + 87.7156u + 7.80147

−0.00184480u

18

− 0.0331746u

17

+ ··· − 3.98487u + 0.0723727



a

2

=



−0.136733u

18

− 1.87566u

17

+ ··· − 19.9103u + 26.8869

−0.0281326u

18

− 0.392506u

17

+ ··· − 21.4809u + 0.261960



(ii) Obstruction class = −1

(iii) Cusp Shapes

= −

390713901803

1639011399904

u

18

−

21917006139285

6556045599616

u

17

+ ··· −

430703611764529

1639011399904

u −

74684759366323

6556045599616

2

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

u

19

− 9u

18

+ ··· + 9432u − 1296

c

2

, c

6

u

19

− 7u

18

+ ··· − 36u + 36

c

3

, c

8

u

19

− 2u

18

+ ··· − 12u + 9

c

4

u

19

− 6u

18

+ ··· + 19710u − 2349

c

5

, c

10

u

19

+ u

18

+ ··· + 1536u + 512

c

7

u

19

− 16u

18

+ ··· + 540u − 81

c

9

, c

11

, c

12

u

19

+ 14u

18

+ ··· + 52u + 1

3

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

y

19

− y

18

+ ··· + 159068448y −1679616

c

2

, c

6

y

19

− 9y

18

+ ··· + 9432y −1296

c

3

, c

8

y

19

− 16y

18

+ ··· + 540y −81

c

4

y

19

+ 56y

18

+ ··· + 419265396y −5517801

c

5

, c

10

y

19

+ 69y

18

+ ··· + 15204352y −262144

c

7

y

19

− 20y

18

+ ··· + 220968y −6561

c

9

, c

11

, c

12

y

19

− 72y

18

+ ··· + 696y −1

4

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

1

√

−1(vol +

√

−1CS) Cusp shape

u = 1.090810 + 0.087492I

a = 0.864947 + 0.453435I

b = 1.25966 − 4.27188I

0.12746 + 2.07953I 0.79710 + 6.78619I

u = 1.090810 − 0.087492I

a = 0.864947 − 0.453435I

b = 1.25966 + 4.27188I

0.12746 − 2.07953I 0.79710 − 6.78619I

u = 1.12421

a = −0.369206

b = −0.262337

2.16627 2.38650

u = −0.866404 + 0.903603I

a = 0.403452 + 1.041090I

b = −1.260210 − 0.033364I

4.84224 + 5.75329I 6.23581 − 2.60069I

u = −0.866404 − 0.903603I

a = 0.403452 − 1.041090I

b = −1.260210 + 0.033364I

4.84224 − 5.75329I 6.23581 + 2.60069I

u = 0.264112 + 0.511238I

a = 0.998671 + 0.095546I

b = 0.655201 − 0.830329I

0.335625 + 1.223470I 4.13138 − 4.81848I

u = 0.264112 − 0.511238I

a = 0.998671 − 0.095546I

b = 0.655201 + 0.830329I

0.335625 − 1.223470I 4.13138 + 4.81848I

u = −1.54015 + 0.03306I

a = −0.616311 + 0.224492I

b = 0.39526 − 1.71073I

8.24788 − 1.49342I 14.3201 − 0.4966I

u = −1.54015 − 0.03306I

a = −0.616311 − 0.224492I

b = 0.39526 + 1.71073I

8.24788 + 1.49342I 14.3201 + 0.4966I

u = −0.272498

a = −3.42293

b = −0.561462

1.52167 5.90680

5

Solutions to I

u

1

√

−1(vol +

√

−1CS) Cusp shape

u = −0.0292040 + 0.0188465I

a = 11.6667 + 24.4338I

b = 0.653657 + 0.621796I

−1.74489 + 2.05954I −4.07768 − 4.15264I

u = −0.0292040 − 0.0188465I

a = 11.6667 − 24.4338I

b = 0.653657 − 0.621796I

−1.74489 − 2.05954I −4.07768 + 4.15264I

u = −2.00138 + 0.76457I

a = −0.689796 + 0.112485I

b = −0.56693 − 3.57760I

−15.5608 − 12.7812I 6.72063 + 5.11794I

u = −2.00138 − 0.76457I

a = −0.689796 − 0.112485I

b = −0.56693 + 3.57760I

−15.5608 + 12.7812I 6.72063 − 5.11794I

u = −2.42283 + 0.72006I

a = 0.017324 − 0.538247I

b = 2.30004 + 3.34538I

−18.5440 − 5.6494I 4.00000 + 0.I

u = −2.42283 − 0.72006I

a = 0.017324 + 0.538247I

b = 2.30004 − 3.34538I

−18.5440 + 5.6494I 4.00000 + 0.I

u = −3.92517 + 0.42402I

a = 0.495462 − 0.122568I

b = −4.38040 + 4.23334I

−11.60890 − 1.83503I 0

u = −3.92517 − 0.42402I

a = 0.495462 + 0.122568I

b = −4.38040 − 4.23334I

−11.60890 + 1.83503I 0

u = 4.00873

a = 0.511273

b = −5.28877

11.4850 0

6

II. I

u

2

= h−a

8

+ a

7

+ 3a

6

− 2a

5

− 3a

4

+ 2a

3

+ b + a + 2, a

9

− a

8

− 2a

7

+

3a

6

+ a

5

− 3a

4

+ 2a

3

− a + 1, u − 1i

(i) Arc colorings

a

9

=



0

1



a

11

=



1

0



a

12

=



1

−1



a

10

=



1

0



a

1

=



0

−1



a

4

=



a

8

− a

7

− 3a

6

+ 2a

5

+ 3a

4

− 2a

3

− a − 2



a

8

=



−a

2

a

7

+ a

6

− 2a

5

− a

4

+ 2a

3

+ a

2

+ a + 2



a

3

=



−a

3

+ a

2a

8

− 5a

6

+ a

5

+ 5a

4

− a

3

+ a

2

+ a − 2



a

7

=



−a

2

a

7

+ a

6

− 2a

5

− a

4

+ 2a

3

+ a + 2



a

5

=



a

5

− a

3

+ a

0



a

6

=



a

5

− a

3

+ a

0



a

2

=



a

6

− 2a

4

+ a

2

2a

8

− 5a

6

+ a

5

+ 5a

4

− a

3

+ a

2

+ a − 2



(ii) Obstruction class = 1

(iii) Cusp Shapes = 6a

8

− 3a

7

− 10a

6

+ 8a

5

+ 2a

4

− 8a

3

+ 12a

2

+ 6

7

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

, c

4

u

9

− 3u

8

+ 8u

7

− 13u

6

+ 17u

5

− 17u

4

+ 12u

3

− 6u

2

+ u + 1

c

2

u

9

− u

8

+ 2u

7

− u

6

+ 3u

5

− u

4

+ 2u

3

+ u + 1

c

3

u

9

− u

8

− 2u

7

+ 3u

6

+ u

5

− 3u

4

+ 2u

3

− u + 1

c

5

, c

10

u

9

c

6

u

9

+ u

8

+ 2u

7

+ u

6

+ 3u

5

+ u

4

+ 2u

3

+ u − 1

c

7

u

9

+ 5u

8

+ 12u

7

+ 15u

6

+ 9u

5

− u

4

− 4u

3

− 2u

2

+ u + 1

c

8

u

9

+ u

8

− 2u

7

− 3u

6

+ u

5

+ 3u

4

+ 2u

3

− u − 1

c

9

(u + 1)

9

c

11

, c

12

(u − 1)

9

8

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

, c

4

y

9

+ 7y

8

+ 20y

7

+ 25y

6

+ 5y

5

− 15y

4

+ 22y

2

+ 13y −1

c

2

, c

6

y

9

+ 3y

8

+ 8y

7

+ 13y

6

+ 17y

5

+ 17y

4

+ 12y

3

+ 6y

2

+ y −1

c

3

, c

8

y

9

− 5y

8

+ 12y

7

− 15y

6

+ 9y

5

+ y

4

− 4y

3

+ 2y

2

+ y −1

c

5

, c

10

y

9

c

7

y

9

− y

8

+ 12y

7

− 7y

6

+ 37y

5

+ y

4

− 10y

2

+ 5y −1

c

9

, c

11

, c

12

(y −1)

9

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

2

√

−1(vol +

√

−1CS) Cusp shape

u = 1.00000

a = 0.772920 + 0.510351I

b = −3.25219 + 0.42284I

−0.13850 + 2.09337I 11.64247 + 5.88316I

u = 1.00000

a = 0.772920 − 0.510351I

b = −3.25219 − 0.42284I

−0.13850 − 2.09337I 11.64247 − 5.88316I

u = 1.00000

a = −0.825933

b = 0.106533

2.84338 15.4610

u = 1.00000

a = −1.173910 + 0.391555I

b = −0.121911 − 0.782086I

6.01628 − 1.33617I 7.94914 + 0.75351I

u = 1.00000

a = −1.173910 − 0.391555I

b = −0.121911 + 0.782086I

6.01628 + 1.33617I 7.94914 − 0.75351I

u = 1.00000

a = 0.141484 + 0.739668I

b = −0.217279 − 0.962736I

2.26187 − 2.45442I 4.75622 + 3.91612I

u = 1.00000

a = 0.141484 − 0.739668I

b = −0.217279 + 0.962736I

2.26187 + 2.45442I 4.75622 − 3.91612I

u = 1.00000

a = 1.172470 + 0.500383I

b = 0.038112 − 1.195250I

5.24306 + 7.08493I 7.92182 − 8.89461I

u = 1.00000

a = 1.172470 − 0.500383I

b = 0.038112 + 1.195250I

5.24306 − 7.08493I 7.92182 + 8.89461I

10

III. I

u

3

= h−3a

3

u + 2a

3

− a

2

u + b + a, a

4

− a

2

u − 2a

2

+ 3u + 5, u

2

+ u − 1i

(i) Arc colorings

a

9

=



0

u



a

11

=



1

0



a

12

=



1

u − 1



a

10

=



u

−u + 1



a

1

=



u

−u



a

4

=



a

3a

3

u − 2a

3

+ a

2

u − a



a

8

=



−a

2

u

a

3

u − a

3

+ 3a

2

u − a

2



a

3

=



a

3

u − a

3

+ a

−a

3

u + a

3

− a + u + 1



a

7

=



−a

2

u

a

3

u − a

3

+ a

2

u



a

5

=



0

3a

3

u − 2a

3



a

6

=



−3a

3

u + 2a

3

3a

3

u − 2a

3



a

2

=



a

3

u − a

3

+ a + u

−a

3

u + a

3

− a + 1



(ii) Obstruction class = 1

(iii) Cusp Shapes = 4a

2

u − 4a

2

+ 8

11

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

(u − 1)

8

c

2

, c

6

(u

2

+ 1)

4

c

3

, c

4

, c

8

(u

4

− u

2

+ 1)

2

c

5

, c

10

(u

4

+ 3u

2

+ 1)

2

c

7

(u

2

+ u + 1)

4

c

9

(u

2

− u − 1)

4

c

11

, c

12

(u

2

+ u − 1)

4

12

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

(y −1)

8

c

2

, c

6

(y + 1)

8

c

3

, c

4

, c

8

(y

2

− y + 1)

4

c

5

, c

10

(y

2

+ 3y + 1)

4

c

7

(y

2

+ y + 1)

4

c

9

, c

11

, c

12

(y

2

− 3y + 1)

4

13

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

3

√

−1(vol +

√

−1CS) Cusp shape

u = 0.618034

a = 1.40126 + 0.80902I

b = −0.592242 − 0.025792I

−0.65797 + 2.02988I 6.00000 − 3.46410I

u = 0.618034

a = 1.40126 − 0.80902I

b = −0.592242 + 0.025792I

−0.65797 − 2.02988I 6.00000 + 3.46410I

u = 0.618034

a = −1.40126 + 0.80902I

b = 2.21028 − 2.82831I

−0.65797 − 2.02988I 6.00000 + 3.46410I

u = 0.618034

a = −1.40126 − 0.80902I

b = 2.21028 + 2.82831I

−0.65797 + 2.02988I 6.00000 − 3.46410I

u = −1.61803

a = −0.535233 + 0.309017I

b = 0.226216 − 1.391820I

7.23771 + 2.02988I 6.00000 − 3.46410I

u = −1.61803

a = −0.535233 − 0.309017I

b = 0.226216 + 1.391820I

7.23771 − 2.02988I 6.00000 + 3.46410I

u = −1.61803

a = 0.535233 + 0.309017I

b = −0.84425 − 2.46228I

7.23771 − 2.02988I 6.00000 + 3.46410I

u = −1.61803

a = 0.535233 − 0.309017I

b = −0.84425 + 2.46228I

7.23771 + 2.02988I 6.00000 − 3.46410I

14

IV. u-Polynomials

Crossings u-Polynomials at each crossing

c

1

((u − 1)

8

)(u

9

− 3u

8

+ ··· + u + 1)

· (u

19

− 9u

18

+ ··· + 9432u − 1296)

c

2

(u

2

+ 1)

4

(u

9

− u

8

+ 2u

7

− u

6

+ 3u

5

− u

4

+ 2u

3

+ u + 1)

· (u

19

− 7u

18

+ ··· − 36u + 36)

c

3

(u

4

− u

2

+ 1)

2

(u

9

− u

8

− 2u

7

+ 3u

6

+ u

5

− 3u

4

+ 2u

3

− u + 1)

· (u

19

− 2u

18

+ ··· − 12u + 9)

c

4

(u

4

− u

2

+ 1)

2

· (u

9

− 3u

8

+ 8u

7

− 13u

6

+ 17u

5

− 17u

4

+ 12u

3

− 6u

2

+ u + 1)

· (u

19

− 6u

18

+ ··· + 19710u − 2349)

c

5

, c

10

u

9

(u

4

+ 3u

2

+ 1)

2

(u

19

+ u

18

+ ··· + 1536u + 512)

c

6

(u

2

+ 1)

4

(u

9

+ u

8

+ 2u

7

+ u

6

+ 3u

5

+ u

4

+ 2u

3

+ u − 1)

· (u

19

− 7u

18

+ ··· − 36u + 36)

c

7

((u

2

+ u + 1)

4

)(u

9

+ 5u

8

+ ··· + u + 1)

· (u

19

− 16u

18

+ ··· + 540u − 81)

c

8

(u

4

− u

2

+ 1)

2

(u

9

+ u

8

− 2u

7

− 3u

6

+ u

5

+ 3u

4

+ 2u

3

− u − 1)

· (u

19

− 2u

18

+ ··· − 12u + 9)

c

9

((u + 1)

9

)(u

2

− u − 1)

4

(u

19

+ 14u

18

+ ··· + 52u + 1)

c

11

, c

12

((u − 1)

9

)(u

2

+ u − 1)

4

(u

19

+ 14u

18

+ ··· + 52u + 1)

15

V. Riley Polynomials

Crossings Riley Polynomials at each crossing

c

1

(y −1)

8

(y

9

+ 7y

8

+ 20y

7

+ 25y

6

+ 5y

5

− 15y

4

+ 22y

2

+ 13y −1)

· (y

19

− y

18

+ ··· + 159068448y −1679616)

c

2

, c

6

((y + 1)

8

)(y

9

+ 3y

8

+ ··· + y −1)

· (y

19

− 9y

18

+ ··· + 9432y −1296)

c

3

, c

8

((y

2

− y + 1)

4

)(y

9

− 5y

8

+ ··· + y −1)

· (y

19

− 16y

18

+ ··· + 540y −81)

c

4

((y

2

− y + 1)

4

)(y

9

+ 7y

8

+ ··· + 13y −1)

· (y

19

+ 56y

18

+ ··· + 419265396y −5517801)

c

5

, c

10

y

9

(y

2

+ 3y + 1)

4

(y

19

+ 69y

18

+ ··· + 1.52044 × 10

7

y −262144)

c

7

(y

2

+ y + 1)

4

(y

9

− y

8

+ 12y

7

− 7y

6

+ 37y

5

+ y

4

− 10y

2

+ 5y −1)

· (y

19

− 20y

18

+ ··· + 220968y −6561)

c

9

, c

11

, c

12

((y −1)

9

)(y

2

− 3y + 1)

4

(y

19

− 72y

18

+ ··· + 696y −1)

16