11n

91

(K11n

91

)

A knot diagram

1

Linearized knot diagam

6 1 9 10 2 3 11 4 3 7 10

Solving Sequence

7,10

11 8

1,3

2 6 5 9 4

c

10

c

7

c

11

c

2

c

6

c

5

c

9

c

3

c

1

, c

4

, c

8

Ideals for irreducible components

2

of X

par

I

u

1

= h−10091257321u

20

+ 17716980292u

19

+ ··· + 366196956382b + 49796914345,

591910942537u

20

− 2794488596145u

19

+ ··· + 4394363476584a − 481484753828,

u

21

− 3u

20

+ ··· − 2u − 3i

I

u

2

= hb

2

+ 2, a

2

− a + 1, u + 1i

I

u

3

= hb, a

2

− a + 1, u − 1i

* 3 irreducible components of dim

C

= 0, with total 27 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−1.01×10

10

u

20

+1.77×10

10

u

19

+· · ·+3.66×10

11

b+4.98×10

10

, 5.92×

10

11

u

20

−2.79×10

12

u

19

+· · ·+4.39×10

12

a−4.81×10

11

, u

21

−3u

20

+· · ·−2u−3i

(i) Arc colorings

a

7

=



0

u



a

10

=



1

0



a

11

=



1

−u

2



a

8

=



u

−u

3

+ u



a

1

=



−u

2

+ 1

−u

2



a

3

=



−0.134698u

20

+ 0.635926u

19

+ ··· − 0.0316545u + 0.109569

0.0275569u

20

− 0.0483810u

19

+ ··· − 1.11621u − 0.135984



a

2

=



−0.0599090u

20

+ 0.413165u

19

+ ··· − 1.26842u + 0.402548

0.129090u

20

− 0.405931u

19

+ ··· − 1.14509u − 0.299649



a

6

=



−0.0944207u

20

+ 0.398371u

19

+ ··· + 0.793023u − 0.448119

0.0612997u

20

− 0.138407u

19

+ ··· + 0.143901u − 0.565085



a

5

=



0.340816u

20

− 1.13692u

19

+ ··· − 0.307450u − 1.55518

0.154312u

20

− 0.484554u

19

+ ··· − 0.533633u − 0.125533



a

9

=



−0.188362u

20

+ 0.626385u

19

+ ··· + 2.11578u + 0.520624

0.0158081u

20

+ 0.0256218u

19

+ ··· + 0.586386u − 0.748984



a

4

=



−0.186504u

20

+ 0.652367u

19

+ ··· − 0.226183u + 1.42965

−0.154312u

20

+ 0.484554u

19

+ ··· + 0.533633u + 0.125533



a

4

=



−0.186504u

20

+ 0.652367u

19

+ ··· − 0.226183u + 1.42965

−0.154312u

20

+ 0.484554u

19

+ ··· + 0.533633u + 0.125533



(ii) Obstruction class = −1

(iii) Cusp Shapes

=

57646172449

732393912764

u

20

+

387941164973

732393912764

u

19

+ ··· +

4279700760483

732393912764

u +

1134852296901

183098478191

2

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

, c

5

u

21

− 2u

20

+ ··· + 7u − 3

c

2

u

21

+ 14u

20

+ ··· + 49u − 9

c

3

, c

8

, c

9

u

21

+ u

20

+ ··· + 8u − 4

c

4

u

21

− u

20

+ ··· − 64u − 548

c

6

u

21

+ 2u

20

+ ··· + 19u − 3

c

7

, c

10

u

21

− 3u

20

+ ··· − 2u − 3

c

11

u

21

− 3u

20

+ ··· + 22u − 9

3

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

, c

5

y

21

+ 14y

20

+ ··· + 49y −9

c

2

y

21

− 10y

20

+ ··· + 7117y −81

c

3

, c

8

, c

9

y

21

+ 31y

20

+ ··· − 160y −16

c

4

y

21

+ 91y

20

+ ··· − 4121248y −300304

c

6

y

21

− 34y

20

+ ··· + 193y −9

c

7

, c

10

y

21

− 3y

20

+ ··· + 22y −9

c

11

y

21

+ 37y

20

+ ··· + 2158y −81

4

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

1

√

−1(vol +

√

−1CS) Cusp shape

u = −0.678453 + 0.688147I

a = 0.845365 + 0.796760I

b = −0.271568 + 1.062540I

−2.57223 − 2.30104I 5.12347 + 3.68698I

u = −0.678453 − 0.688147I

a = 0.845365 − 0.796760I

b = −0.271568 − 1.062540I

−2.57223 + 2.30104I 5.12347 − 3.68698I

u = 0.316999 + 0.813917I

a = −0.403688 + 0.492380I

b = 0.713808 + 0.270061I

−2.21076 + 2.09468I 3.00496 − 3.91489I

u = 0.316999 − 0.813917I

a = −0.403688 − 0.492380I

b = 0.713808 − 0.270061I

−2.21076 − 2.09468I 3.00496 + 3.91489I

u = 1.145710 + 0.140166I

a = 0.239466 − 0.410115I

b = −0.264392 + 0.442489I

1.11524 + 1.37460I 4.04933 + 2.02582I

u = 1.145710 − 0.140166I

a = 0.239466 + 0.410115I

b = −0.264392 − 0.442489I

1.11524 − 1.37460I 4.04933 − 2.02582I

u = −1.134400 + 0.465760I

a = −0.130701 − 0.200335I

b = −0.21844 − 1.42669I

−5.12357 + 0.62763I 1.407681 + 0.031302I

u = −1.134400 − 0.465760I

a = −0.130701 + 0.200335I

b = −0.21844 + 1.42669I

−5.12357 − 0.62763I 1.407681 − 0.031302I

u = −0.831921 + 0.976886I

a = −0.814769 − 0.824529I

b = 0.567067 − 1.129180I

−6.41753 − 6.55364I 2.05255 + 5.68240I

u = −0.831921 − 0.976886I

a = −0.814769 + 0.824529I

b = 0.567067 + 1.129180I

−6.41753 + 6.55364I 2.05255 − 5.68240I

5

Solutions to I

u

1

√

−1(vol +

√

−1CS) Cusp shape

u = −0.684877 + 0.126673I

a = 0.28002 + 1.72236I

b = −0.033686 + 0.472962I

0.91652 − 2.35539I 2.06528 + 5.30676I

u = −0.684877 − 0.126673I

a = 0.28002 − 1.72236I

b = −0.033686 − 0.472962I

0.91652 + 2.35539I 2.06528 − 5.30676I

u = −0.153992 + 0.545893I

a = −1.93201 − 1.20990I

b = 0.130919 − 1.391490I

−5.17740 + 1.74265I 0.53526 − 2.03708I

u = −0.153992 − 0.545893I

a = −1.93201 + 1.20990I

b = 0.130919 + 1.391490I

−5.17740 − 1.74265I 0.53526 + 2.03708I

u = 0.515961

a = 0.725450

b = −0.417301

0.754310 13.3550

u = 1.06707 + 1.07605I

a = 0.80534 − 1.32502I

b = −0.08814 − 1.77927I

−12.95410 + 3.94853I 4.46142 − 1.91994I

u = 1.06707 − 1.07605I

a = 0.80534 + 1.32502I

b = −0.08814 + 1.77927I

−12.95410 − 3.94853I 4.46142 + 1.91994I

u = 0.92823 + 1.31603I

a = −0.465176 + 1.276900I

b = −0.01070 + 1.85472I

−17.8929 − 1.4476I 1.24285 + 0.69389I

u = 0.92823 − 1.31603I

a = −0.465176 − 1.276900I

b = −0.01070 − 1.85472I

−17.8929 + 1.4476I 1.24285 − 0.69389I

u = 1.26765 + 1.02698I

a = −0.95325 + 1.07681I

b = 0.18378 + 1.78761I

−16.6802 + 9.9035I 2.37944 − 4.78800I

6

Solutions to I

u

1

√

−1(vol +

√

−1CS) Cusp shape

u = 1.26765 − 1.02698I

a = −0.95325 − 1.07681I

b = 0.18378 − 1.78761I

−16.6802 − 9.9035I 2.37944 + 4.78800I

7

II. I

u

2

= hb

2

+ 2, a

2

− a + 1, u + 1i

(i) Arc colorings

a

7

=



0

−1



a

10

=



1

0



a

11

=



1

−1



a

8

=



−1

0



a

1

=



0

−1



a

3

=



a

b



a

2

=



a

b − a



a

6

=



−a + 1

−ba − 1



a

5

=



−a

−b



a

9

=



ba + 1

−2



a

4

=



b − a

−b



a

4

=



b − a

−b



(ii) Obstruction class = 1

(iii) Cusp Shapes = 4a + 4

8

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

, c

6

(u

2

− u + 1)

2

c

2

, c

5

(u

2

+ u + 1)

2

c

3

, c

4

, c

8

c

9

(u

2

+ 2)

2

c

7

, c

11

(u − 1)

4

c

10

(u + 1)

4

9

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

, c

2

, c

5

c

6

(y

2

+ y + 1)

2

c

3

, c

4

, c

8

c

9

(y + 2)

4

c

7

, c

10

, c

11

(y −1)

4

10

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

2

√

−1(vol +

√

−1CS) Cusp shape

u = −1.00000

a = 0.500000 + 0.866025I

b = 1.414210I

−3.28987 − 2.02988I 6.00000 + 3.46410I

u = −1.00000

a = 0.500000 + 0.866025I

b = − 1.414210I

−3.28987 − 2.02988I 6.00000 + 3.46410I

u = −1.00000

a = 0.500000 − 0.866025I

b = 1.414210I

−3.28987 + 2.02988I 6.00000 − 3.46410I

u = −1.00000

a = 0.500000 − 0.866025I

b = − 1.414210I

−3.28987 + 2.02988I 6.00000 − 3.46410I

11

III. I

u

3

= hb, a

2

− a + 1, u − 1i

(i) Arc colorings

a

7

=



0

1



a

10

=



1

0



a

11

=



1

−1



a

8

=



1

0



a

1

=



0

−1



a

3

=



a

0



a

2

=



a

−a



a

6

=



a − 1

1



a

5

=



a

0



a

9

=



1

0



a

4

=



a

0



a

4

=



a

0



(ii) Obstruction class = 1

(iii) Cusp Shapes = 4a + 10

12

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

, c

2

, c

6

u

2

+ u + 1

c

3

, c

4

, c

8

c

9

u

2

c

5

u

2

− u + 1

c

7

(u + 1)

2

c

10

, c

11

(u − 1)

2

13

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

, c

2

, c

5

c

6

y

2

+ y + 1

c

3

, c

4

, c

8

c

9

y

2

c

7

, c

10

, c

11

(y −1)

2

14

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

3

√

−1(vol +

√

−1CS) Cusp shape

u = 1.00000

a = 0.500000 + 0.866025I

b = 0

1.64493 − 2.02988I 12.00000 + 3.46410I

u = 1.00000

a = 0.500000 − 0.866025I

b = 0

1.64493 + 2.02988I 12.00000 − 3.46410I

15

IV. u-Polynomials

Crossings u-Polynomials at each crossing

c

1

((u

2

− u + 1)

2

)(u

2

+ u + 1)(u

21

− 2u

20

+ ··· + 7u − 3)

c

2

((u

2

+ u + 1)

3

)(u

21

+ 14u

20

+ ··· + 49u − 9)

c

3

, c

8

, c

9

u

2

(u

2

+ 2)

2

(u

21

+ u

20

+ ··· + 8u − 4)

c

4

u

2

(u

2

+ 2)

2

(u

21

− u

20

+ ··· − 64u − 548)

c

5

(u

2

− u + 1)(u

2

+ u + 1)

2

(u

21

− 2u

20

+ ··· + 7u − 3)

c

6

((u

2

− u + 1)

2

)(u

2

+ u + 1)(u

21

+ 2u

20

+ ··· + 19u − 3)

c

7

((u − 1)

4

)(u + 1)

2

(u

21

− 3u

20

+ ··· − 2u − 3)

c

10

((u − 1)

2

)(u + 1)

4

(u

21

− 3u

20

+ ··· − 2u − 3)

c

11

((u − 1)

6

)(u

21

− 3u

20

+ ··· + 22u − 9)

16

V. Riley Polynomials

Crossings Riley Polynomials at each crossing

c

1

, c

5

((y

2

+ y + 1)

3

)(y

21

+ 14y

20

+ ··· + 49y −9)

c

2

((y

2

+ y + 1)

3

)(y

21

− 10y

20

+ ··· + 7117y −81)

c

3

, c

8

, c

9

y

2

(y + 2)

4

(y

21

+ 31y

20

+ ··· − 160y −16)

c

4

y

2

(y + 2)

4

(y

21

+ 91y

20

+ ··· − 4121248y −300304)

c

6

((y

2

+ y + 1)

3

)(y

21

− 34y

20

+ ··· + 193y −9)

c

7

, c

10

((y −1)

6

)(y

21

− 3y

20

+ ··· + 22y −9)

c

11

((y −1)

6

)(y

21

+ 37y

20

+ ··· + 2158y −81)

17