9

7

(K9a

26

)

A knot diagram

1

Linearized knot diagam

5 6 8 3 2 1 9 4 7

Solving Sequence

1,5

2 6 3 7 4 9 8

c

1

c

5

c

2

c

6

c

4

c

9

c

8

c

3

, c

7

Ideals for irreducible components

2

of X

par

I

u

1

= hu

14

− u

13

− 5u

12

+ 4u

11

+ 10u

10

− 5u

9

− 7u

8

− 2u

7

− 4u

6

+ 8u

5

+ 8u

4

− 2u

3

− 2u

2

− 3u − 1i

* 1 irreducible components of dim

C

= 0, with total 14 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

= hu

14

− u

13

− 5u

12

+ 4u

11

+ 10u

10

− 5u

9

− 7u

8

− 2u

7

− 4u

6

+ 8u

5

+

8u

4

− 2u

3

− 2u

2

− 3u − 1i

(i) Arc colorings

a

1

=



1

0



a

5

=



0

u



a

2

=



1

u

2



a

6

=



−u

3

+ u



a

3

=



−u

2

+ 1

−u

4

+ 2u

2



a

7

=



u

3

− 2u

−u

3

+ u



a

4

=



u

5

− 2u

3

+ u

u

7

− 3u

5

+ 2u

3

+ u



a

9

=



u

6

− 3u

4

+ 2u

2

+ 1

−u

6

+ 2u

4

− u

2



a

8

=



u

9

− 4u

7

+ 5u

5

− 3u

−u

9

+ 3u

7

− 3u

5

+ u



a

8

=



u

9

− 4u

7

+ 5u

5

− 3u

−u

9

+ 3u

7

− 3u

5

+ u



(ii) Obstruction class = −1

(iii) Cusp Shapes

= −4u

12

+ 20u

10

+ 4u

9

− 36u

8

− 16u

7

+ 12u

6

+ 20u

5

+ 36u

4

+ 4u

3

− 28u

2

− 20u − 18

2

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

, c

2

, c

5

u

14

− u

13

+ ··· − 3u − 1

c

3

, c

8

u

14

− u

13

+ ··· − u − 1

c

4

, c

6

, c

7

c

9

u

14

+ 3u

13

+ ··· + 5u + 1

3

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

, c

2

, c

5

y

14

− 11y

13

+ ··· − 5y + 1

c

3

, c

8

y

14

− 3y

13

+ ··· − 5y + 1

c

4

, c

6

, c

7

c

9

y

14

+ 17y

13

+ ··· − y + 1

4

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

1

√

−1(vol +

√

−1CS) Cusp shape

u = −0.021800 + 0.901952I

9.65121 + 3.26499I −3.90686 − 2.49004I

u = −0.021800 − 0.901952I

9.65121 − 3.26499I −3.90686 + 2.49004I

u = −1.126450 + 0.176078I

−1.41287 + 0.85224I −7.59802 − 0.38712I

u = −1.126450 − 0.176078I

−1.41287 − 0.85224I −7.59802 + 0.38712I

u = 1.28972

−5.55995 −16.7050

u = 1.279790 + 0.223785I

−2.97961 − 4.88256I −11.68599 + 6.44337I

u = 1.279790 − 0.223785I

−2.97961 + 4.88256I −11.68599 − 6.44337I

u = −1.264560 + 0.437504I

5.80102 + 1.51934I −7.12222 − 0.64840I

u = −1.264560 − 0.437504I

5.80102 − 1.51934I −7.12222 + 0.64840I

u = 1.299190 + 0.426336I

5.53769 − 8.01486I −7.63204 + 5.37427I

u = 1.299190 − 0.426336I

5.53769 + 8.01486I −7.63204 − 5.37427I

u = −0.129663 + 0.583715I

1.35226 + 1.98638I −4.65592 − 5.08636I

u = −0.129663 − 0.583715I

1.35226 − 1.98638I −4.65592 + 5.08636I

u = −0.362713

−0.730641 −14.0930

5

II. u-Polynomials

Crossings u-Polynomials at each crossing

c

1

, c

2

, c

5

u

14

− u

13

+ ··· − 3u − 1

c

3

, c

8

u

14

− u

13

+ ··· − u − 1

c

4

, c

6

, c

7

c

9

u

14

+ 3u

13

+ ··· + 5u + 1

6

III. Riley Polynomials

Crossings Riley Polynomials at each crossing

c

1

, c

2

, c

5

y

14

− 11y

13

+ ··· − 5y + 1

c

3

, c

8

y

14

− 3y

13

+ ··· − 5y + 1

c

4

, c

6

, c

7

c

9

y

14

+ 17y

13

+ ··· − y + 1

7