10

2

(K10a

59

)

A knot diagram

1

Linearized knot diagam

7 8 2 9 10 1 3 4 5 6

Solving Sequence

3,7

8 2 4 9 1 6 10 5

c

7

c

2

c

3

c

8

c

1

c

6

c

10

c

5

c

4

, c

9

Ideals for irreducible components

2

of X

par

I

u

1

= hu

11

+ u

10

+ 4u

9

+ 3u

8

+ 6u

7

+ 4u

6

+ 2u

5

+ u

4

− 3u

3

− u

2

− 2u − 1i

* 1 irreducible components of dim

C

= 0, with total 11 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

11

+ u

10

+ 4u

9

+ 3u

8

+ 6u

7

+ 4u

6

+ 2u

5

+ u

4

− 3u

3

− u

2

− 2u − 1i

(i) Arc colorings

a

3

=



0

u



a

7

=



1

0



a

8

=



1

−u

2



a

2

=



−u

u

3

+ u



a

4

=



−u

3

u

5

+ u

3

+ u



a

9

=



−u

6

− u

4

+ 1

u

8

+ 2u

6

+ 2u

4



a

1

=



u

3

u

3

+ u



a

6

=



−u

6

− u

4

+ 1

−u

6

− 2u

4

− u

2



a

10

=



−u

9

− 2u

7

− u

5

+ 2u

3

+ u

−u

9

− 3u

7

− 3u

5

+ u



a

5

=



u

9

+ 2u

7

+ u

5

− 2u

3

− u

u

10

+ u

9

+ 3u

8

+ 2u

7

+ 4u

6

+ u

5

+ u

4

− 2u

3

− u

2

− u − 1



(ii) Obstruction class = −1

(iii) Cusp Shapes = 4u

9

+ 4u

8

+ 12u

7

+ 8u

6

+ 12u

5

+ 8u

4

− 4u

3

− 4u

2

− 8u − 14

2

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

, c

4

, c

5

c

6

, c

8

, c

9

c

10

u

11

− u

10

+ ··· − 2u − 1

c

2

, c

7

u

11

+ u

10

+ 4u

9

+ 3u

8

+ 6u

7

+ 4u

6

+ 2u

5

+ u

4

− 3u

3

− u

2

− 2u − 1

c

3

u

11

+ 7u

10

+ ··· + 2u − 1

3

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

, c

4

, c

5

c

6

, c

8

, c

9

c

10

y

11

− 17y

10

+ ··· + 2y −1

c

2

, c

7

y

11

+ 7y

10

+ ··· + 2y −1

c

3

y

11

− 5y

10

+ ··· + 30y −1

4

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

1

√

−1(vol +

√

−1CS) Cusp shape

u = −0.955154

−19.0832 −11.9080

u = −0.345235 + 1.061380I

−3.59441 − 3.12518I −14.0547 + 5.4576I

u = −0.345235 − 1.061380I

−3.59441 + 3.12518I −14.0547 − 5.4576I

u = 0.197351 + 0.826949I

−0.596970 + 1.107570I −7.89422 − 5.61222I

u = 0.197351 − 0.826949I

−0.596970 − 1.107570I −7.89422 + 5.61222I

u = 0.805680

−7.27447 −11.5740

u = 0.433313 + 1.213520I

−10.90050 + 4.42189I −14.9599 − 3.5435I

u = 0.433313 − 1.213520I

−10.90050 − 4.42189I −14.9599 + 3.5435I

u = −0.483698 + 1.296390I

16.3901 − 5.1148I −15.0081 + 2.8305I

u = −0.483698 − 1.296390I

16.3901 + 5.1148I −15.0081 − 2.8305I

u = −0.453988

−0.912673 −10.6840

5

II. u-Polynomials

Crossings u-Polynomials at each crossing

c

1

, c

4

, c

5

c

6

, c

8

, c

9

c

10

u

11

− u

10

+ ··· − 2u − 1

c

2

, c

7

u

11

+ u

10

+ 4u

9

+ 3u

8

+ 6u

7

+ 4u

6

+ 2u

5

+ u

4

− 3u

3

− u

2

− 2u − 1

c

3

u

11

+ 7u

10

+ ··· + 2u − 1

6

III. Riley Polynomials

Crossings Riley Polynomials at each crossing

c

1

, c

4

, c

5

c

6

, c

8

, c

9

c

10

y

11

− 17y

10

+ ··· + 2y −1

c

2

, c

7

y

11

+ 7y

10

+ ··· + 2y −1

c

3

y

11

− 5y

10

+ ··· + 30y −1

7