11n

48

(K11n

48

)

A knot diagram

1

Linearized knot diagam

6 1 7 9 2 10 11 1 6 4 8

Solving Sequence

1,6

2

3,9

10 7 5 4 8 11

c

1

c

2

c

9

c

6

c

5

c

4

c

8

c

11

c

3

, c

7

, c

10

Ideals for irreducible components

2

of X

par

I

u

1

= h−1.14153 × 10

15

u

19

− 4.26909 × 10

15

u

18

+ ··· + 8.56391 × 10

15

b + 1.10053 × 10

16

,

6.37825 × 10

15

u

19

+ 2.69128 × 10

16

u

18

+ ··· + 8.56391 × 10

15

a + 3.19918 × 10

16

, u

20

+ 4u

19

+ ··· + 2u + 1i

I

u

2

= hb

2

− 2, a + u + 1, u

2

+ u + 1i

I

u

3

= hb, a − u − 1, u

2

+ u + 1i

* 3 irreducible components of dim

C

= 0, with total 26 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−1.14×10

15

u

19

−4.27×10

15

u

18

+· · ·+8.56×10

15

b+1.10×10

16

, 6.38×

10

15

u

19

+2.69×10

16

u

18

+· · ·+8.56×10

15

a+3.20×10

16

, u

20

+4u

19

+· · ·+2u+1i

(i) Arc colorings

a

1

=



1

0



a

6

=



0

u



a

2

=



1

−u

2



a

3

=



u

2

+ 1

−u

2



a

9

=



−0.744782u

19

− 3.14258u

18

+ ··· − 36.0811u − 3.73565

0.133295u

19

+ 0.498498u

18

+ ··· + 1.29523u − 1.28508



a

10

=



−0.744782u

19

− 3.14258u

18

+ ··· − 36.0811u − 3.73565

0.169440u

19

+ 0.644676u

18

+ ··· + 2.36692u − 1.12163



a

7

=



0.408694u

19

+ 1.81167u

18

+ ··· + 31.0989u + 4.13465

−0.233980u

19

− 0.931452u

18

+ ··· − 3.19070u + 0.665806



a

5

=



−u

u

3

+ u



a

4

=



−0.174714u

19

− 0.880217u

18

+ ··· − 27.9082u − 4.80045

0.258642u

19

+ 1.02897u

18

+ ··· + 6.32631u − 0.537037



a

8

=



−0.878077u

19

− 3.64108u

18

+ ··· − 37.3764u − 2.45056

0.133295u

19

+ 0.498498u

18

+ ··· + 1.29523u − 1.28508



a

11

=



1.12163u

19

+ 4.65596u

18

+ ··· + 50.9286u + 4.61018

−0.278931u

19

− 1.06850u

18

+ ··· − 2.73563u + 1.50344



a

11

=



1.12163u

19

+ 4.65596u

18

+ ··· + 50.9286u + 4.61018

−0.278931u

19

− 1.06850u

18

+ ··· − 2.73563u + 1.50344



(ii) Obstruction class = −1

(iii) Cusp Shapes

= −

1557563512851975

8563912733265916

u

19

−

8797950809282545

8563912733265916

u

18

+ ··· −

62067062106158523

8563912733265916

u −

1550791485072395

2140978183316479

2

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

, c

5

u

20

− 4u

19

+ ··· − 2u + 1

c

2

u

20

+ 28u

19

+ ··· + 74u + 1

c

3

u

20

+ 8u

18

+ ··· − 16u + 41

c

4

u

20

− 2u

19

+ ··· + 2204u + 839

c

6

, c

9

u

20

+ 3u

19

+ ··· − 19u + 7

c

7

, c

8

, c

11

u

20

− u

19

+ ··· − 12u + 4

c

10

u

20

+ 2u

19

+ ··· − 2u + 1

3

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

, c

5

y

20

+ 28y

19

+ ··· + 74y + 1

c

2

y

20

− 68y

19

+ ··· − 1654y + 1

c

3

y

20

+ 16y

19

+ ··· + 10814y + 1681

c

4

y

20

− 52y

19

+ ··· + 5336234y + 703921

c

6

, c

9

y

20

− 29y

19

+ ··· + 297y + 49

c

7

, c

8

, c

11

y

20

− 15y

19

+ ··· − 48y + 16

c

10

y

20

+ 4y

19

+ ··· + 2y + 1

4

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

1

√

−1(vol +

√

−1CS) Cusp shape

u = −0.729618 + 0.601963I

a = −0.002660 − 0.502436I

b = 1.343650 − 0.072587I

5.16928 − 2.57908I 8.86572 + 4.96809I

u = −0.729618 − 0.601963I

a = −0.002660 + 0.502436I

b = 1.343650 + 0.072587I

5.16928 + 2.57908I 8.86572 − 4.96809I

u = 0.337333 + 0.681420I

a = −1.15996 + 1.26131I

b = 0.515876 + 0.585061I

−3.04083 − 0.89466I −2.94359 − 0.44261I

u = 0.337333 − 0.681420I

a = −1.15996 − 1.26131I

b = 0.515876 − 0.585061I

−3.04083 + 0.89466I −2.94359 + 0.44261I

u = −0.342865 + 1.301010I

a = −0.567886 − 0.523820I

b = −0.778134 − 0.346045I

−1.166150 − 0.686038I 1.05440 − 1.40687I

u = −0.342865 − 1.301010I

a = −0.567886 + 0.523820I

b = −0.778134 + 0.346045I

−1.166150 + 0.686038I 1.05440 + 1.40687I

u = −0.007874 + 1.394550I

a = 0.585444 − 0.602506I

b = 1.027390 − 0.480106I

−1.53618 − 5.13397I 0.62229 + 5.85487I

u = −0.007874 − 1.394550I

a = 0.585444 + 0.602506I

b = 1.027390 + 0.480106I

−1.53618 + 5.13397I 0.62229 − 5.85487I

u = −1.10251 + 0.94498I

a = 0.757275 + 0.607433I

b = −0.965691 + 0.331710I

−0.59440 − 3.60439I 2.12405 + 4.48047I

u = −1.10251 − 0.94498I

a = 0.757275 − 0.607433I

b = −0.965691 − 0.331710I

−0.59440 + 3.60439I 2.12405 − 4.48047I

5

Solutions to I

u

1

√

−1(vol +

√

−1CS) Cusp shape

u = −0.195248 + 0.372946I

a = −0.774007 + 0.603593I

b = −0.277579 + 0.390975I

0.131319 − 1.058260I 2.00315 + 6.24655I

u = −0.195248 − 0.372946I

a = −0.774007 − 0.603593I

b = −0.277579 − 0.390975I

0.131319 + 1.058260I 2.00315 − 6.24655I

u = 0.36556 + 1.75156I

a = −0.101116 + 1.030470I

b = 1.39118 + 0.66555I

−11.13930 + 2.93869I −0.922503 − 0.819894I

u = 0.36556 − 1.75156I

a = −0.101116 − 1.030470I

b = 1.39118 − 0.66555I

−11.13930 − 2.93869I −0.922503 + 0.819894I

u = 0.030822 + 0.170366I

a = −0.29189 − 5.45429I

b = −1.370380 + 0.067940I

3.14870 − 0.11294I 1.81708 − 1.16761I

u = 0.030822 − 0.170366I

a = −0.29189 + 5.45429I

b = −1.370380 − 0.067940I

3.14870 + 0.11294I 1.81708 + 1.16761I

u = −0.36649 + 1.92873I

a = 0.003517 + 0.916631I

b = −1.46300 + 0.57660I

−10.3499 − 9.9960I 0.04826 + 5.02986I

u = −0.36649 − 1.92873I

a = 0.003517 − 0.916631I

b = −1.46300 − 0.57660I

−10.3499 + 9.9960I 0.04826 − 5.02986I

u = 0.01089 + 1.99331I

a = 0.051284 − 0.957095I

b = 0.076693 − 1.208720I

−15.1661 − 3.6593I −2.66886 + 2.23636I

u = 0.01089 − 1.99331I

a = 0.051284 + 0.957095I

b = 0.076693 + 1.208720I

−15.1661 + 3.6593I −2.66886 − 2.23636I

6

II. I

u

2

= hb

2

− 2, a + u + 1, u

2

+ u + 1i

(i) Arc colorings

a

1

=



1

0



a

6

=



0

u



a

2

=



1

u + 1



a

3

=



−u

u + 1



a

9

=



−u − 1

b



a

10

=



−u − 1

b + u



a

7

=



u + 1

−b



a

5

=



−u

u + 1



a

4

=



b − u − 1

−bu + 3u + 1



a

8

=



−b − u − 1

b



a

11

=



−bu − b − 1

2



a

11

=



−bu − b − 1

2



(ii) Obstruction class = 1

(iii) Cusp Shapes = 4u + 4

7

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

, c

2

, c

10

(u

2

+ u + 1)

2

c

3

u

4

− 2u

3

+ 5u

2

+ 2u + 1

c

4

u

4

+ 2u

3

+ 5u

2

− 2u + 1

c

5

(u

2

− u + 1)

2

c

6

(u + 1)

4

c

7

, c

8

, c

11

(u

2

− 2)

2

c

9

(u − 1)

4

8

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

, c

2

, c

5

c

10

(y

2

+ y + 1)

2

c

3

, c

4

y

4

+ 6y

3

+ 35y

2

+ 6y + 1

c

6

, c

9

(y −1)

4

c

7

, c

8

, c

11

(y −2)

4

9

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

2

√

−1(vol +

√

−1CS) Cusp shape

u = −0.500000 + 0.866025I

a = −0.500000 − 0.866025I

b = 1.41421

3.28987 − 2.02988I 2.00000 + 3.46410I

u = −0.500000 + 0.866025I

a = −0.500000 − 0.866025I

b = −1.41421

3.28987 − 2.02988I 2.00000 + 3.46410I

u = −0.500000 − 0.866025I

a = −0.500000 + 0.866025I

b = 1.41421

3.28987 + 2.02988I 2.00000 − 3.46410I

u = −0.500000 − 0.866025I

a = −0.500000 + 0.866025I

b = −1.41421

3.28987 + 2.02988I 2.00000 − 3.46410I

10

III. I

u

3

= hb, a − u − 1, u

2

+ u + 1i

(i) Arc colorings

a

1

=



1

0



a

6

=



0

u



a

2

=



1

u + 1



a

3

=



−u

u + 1



a

9

=



u + 1

0



a

10

=



u + 1

−u



a

7

=



u + 1

0



a

5

=



−u

u + 1



a

4

=



−u − 1

u + 1



a

8

=



u + 1

0



a

11

=



1

0



a

11

=



1

0



(ii) Obstruction class = 1

(iii) Cusp Shapes = 4u + 2

11

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

, c

2

u

2

+ u + 1

c

3

, c

4

, c

5

c

10

u

2

− u + 1

c

6

(u − 1)

2

c

7

, c

8

, c

11

u

2

c

9

(u + 1)

2

12

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

, c

2

, c

3

c

4

, c

5

, c

10

y

2

+ y + 1

c

6

, c

9

(y −1)

2

c

7

, c

8

, c

11

y

2

13

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

3

√

−1(vol +

√

−1CS) Cusp shape

u = −0.500000 + 0.866025I

a = 0.500000 + 0.866025I

b = 0

−1.64493 − 2.02988I 0. + 3.46410I

u = −0.500000 − 0.866025I

a = 0.500000 − 0.866025I

b = 0

−1.64493 + 2.02988I 0. − 3.46410I

14

IV. u-Polynomials

Crossings u-Polynomials at each crossing

c

1

((u

2

+ u + 1)

3

)(u

20

− 4u

19

+ ··· − 2u + 1)

c

2

((u

2

+ u + 1)

3

)(u

20

+ 28u

19

+ ··· + 74u + 1)

c

3

(u

2

− u + 1)(u

4

− 2u

3

+ ··· + 2u + 1)(u

20

+ 8u

18

+ ··· − 16u + 41)

c

4

(u

2

− u + 1)(u

4

+ 2u

3

+ ··· − 2u + 1)(u

20

− 2u

19

+ ··· + 2204u + 839)

c

5

((u

2

− u + 1)

3

)(u

20

− 4u

19

+ ··· − 2u + 1)

c

6

((u − 1)

2

)(u + 1)

4

(u

20

+ 3u

19

+ ··· − 19u + 7)

c

7

, c

8

, c

11

u

2

(u

2

− 2)

2

(u

20

− u

19

+ ··· − 12u + 4)

c

9

((u − 1)

4

)(u + 1)

2

(u

20

+ 3u

19

+ ··· − 19u + 7)

c

10

(u

2

− u + 1)(u

2

+ u + 1)

2

(u

20

+ 2u

19

+ ··· − 2u + 1)

15

V. Riley Polynomials

Crossings Riley Polynomials at each crossing

c

1

, c

5

((y

2

+ y + 1)

3

)(y

20

+ 28y

19

+ ··· + 74y + 1)

c

2

((y

2

+ y + 1)

3

)(y

20

− 68y

19

+ ··· − 1654y + 1)

c

3

(y

2

+ y + 1)(y

4

+ 6y

3

+ 35y

2

+ 6y + 1)

· (y

20

+ 16y

19

+ ··· + 10814y + 1681)

c

4

(y

2

+ y + 1)(y

4

+ 6y

3

+ 35y

2

+ 6y + 1)

· (y

20

− 52y

19

+ ··· + 5336234y + 703921)

c

6

, c

9

((y −1)

6

)(y

20

− 29y

19

+ ··· + 297y + 49)

c

7

, c

8

, c

11

y

2

(y −2)

4

(y

20

− 15y

19

+ ··· − 48y + 16)

c

10

((y

2

+ y + 1)

3

)(y

20

+ 4y

19

+ ··· + 2y + 1)

16