10

19

(K10a

108

)

A knot diagram

1

Linearized knot diagam

7 8 6 9 10 1 2 5 4 3

Solving Sequence

4,10

9 5 6 3 1 8 2 7

c

9

c

4

c

5

c

3

c

10

c

8

c

2

c

7

c

1

, c

6

Ideals for irreducible components

2

of X

par

I

u

1

= hu

25

− u

24

+ ··· − u + 1i

* 1 irreducible components of dim

C

= 0, with total 25 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

25

− u

24

+ · · · − u + 1i

(i) Arc colorings

a

4

=



0

u



a

10

=



1

0



a

9

=



1

u

2



a

5

=



u

3

+ u



a

6

=



u

3

+ 2u

u

3

+ u



a

3

=



−u

7

− 4u

5

− 4u

3

−u

7

− 3u

5

− 2u

3

+ u



a

1

=



u

14

+ 7u

12

+ 18u

10

+ 19u

8

+ 4u

6

− 4u

4

+ 1

u

14

+ 6u

12

+ 13u

10

+ 10u

8

− 2u

6

− 4u

4

+ u

2



a

8

=



u

2

+ 1

u

4

+ 2u

2



a

2

=



u

13

+ 6u

11

+ 13u

9

+ 10u

7

− 2u

5

− 4u

3

+ u

u

15

+ 7u

13

+ 18u

11

+ 19u

9

+ 4u

7

− 4u

5

+ u



a

7

=



−u

24

− 11u

22

+ ··· + 5u

4

+ 1

−u

24

+ u

23

+ ··· − 2u

3

+ 1



(ii) Obstruction class = −1

(iii) Cusp Shapes

= −4u

24

+ 4u

23

−48u

22

+ 40u

21

−240u

20

+ 164u

19

−636u

18

+ 340u

17

−920u

16

+ 332u

15

−

620u

14

+36u

13

−12u

12

−184u

11

+140u

10

−80u

9

−56u

8

+36u

7

−60u

6

+12u

4

−12u

3

+4u

2

+2

2

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

, c

2

, c

6

c

7

u

25

− u

24

+ ··· + u + 1

c

3

u

25

+ 5u

24

+ ··· − 47u − 11

c

4

, c

8

, c

9

u

25

− u

24

+ ··· − u + 1

c

5

u

25

+ u

24

+ ··· + 3u + 2

c

10

u

25

− 7u

24

+ ··· + 41u − 7

3

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

, c

2

, c

6

c

7

y

25

− 29y

24

+ ··· + y −1

c

3

y

25

+ 11y

24

+ ··· − 827y −121

c

4

, c

8

, c

9

y

25

+ 23y

24

+ ··· + y −1

c

5

y

25

+ 3y

24

+ ··· − 31y −4

c

10

y

25

− 5y

24

+ ··· + 197y −49

4

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

1

√

−1(vol +

√

−1CS) Cusp shape

u = 0.083328 + 1.136530I

−1.41378 + 1.61686I −0.87509 − 4.54712I

u = 0.083328 − 1.136530I

−1.41378 − 1.61686I −0.87509 + 4.54712I

u = −0.226231 + 1.195340I

−7.69988 − 3.32898I −4.74899 + 3.47484I

u = −0.226231 − 1.195340I

−7.69988 + 3.32898I −4.74899 − 3.47484I

u = 0.700117 + 0.334469I

−7.82366 + 6.30957I −3.83367 − 5.57691I

u = 0.700117 − 0.334469I

−7.82366 − 6.30957I −3.83367 + 5.57691I

u = 0.461544 + 0.584785I

−8.81533 − 2.31852I −6.07988 − 0.26267I

u = 0.461544 − 0.584785I

−8.81533 + 2.31852I −6.07988 + 0.26267I

u = −0.652943 + 0.287492I

−0.14392 − 4.18290I −0.98515 + 7.72660I

u = −0.652943 − 0.287492I

−0.14392 + 4.18290I −0.98515 − 7.72660I

u = −0.677492

−4.07756 0.217760

u = 0.580674 + 0.194968I

1.16471 + 0.92486I 4.08147 − 1.66278I

u = 0.580674 − 0.194968I

1.16471 − 0.92486I 4.08147 + 1.66278I

u = 0.224985 + 1.385120I

−3.90410 + 3.87050I −2.00448 − 2.43861I

u = 0.224985 − 1.385120I

−3.90410 − 3.87050I −2.00448 + 2.43861I

u = −0.15893 + 1.40888I

−6.93669 − 1.11527I −8.41631 − 0.71281I

u = −0.15893 − 1.40888I

−6.93669 + 1.11527I −8.41631 + 0.71281I

u = −0.333053 + 0.458284I

−1.19946 + 0.82124I −4.96410 − 1.46331I

u = −0.333053 − 0.458284I

−1.19946 − 0.82124I −4.96410 + 1.46331I

u = −0.25437 + 1.41342I

−5.58181 − 7.50021I −5.62573 + 7.29113I

u = −0.25437 − 1.41342I

−5.58181 + 7.50021I −5.62573 − 7.29113I

u = 0.26972 + 1.43636I

−13.4988 + 9.8448I −7.88321 − 5.59341I

u = 0.26972 − 1.43636I

−13.4988 − 9.8448I −7.88321 + 5.59341I

u = 0.14391 + 1.45939I

−15.3081 − 0.2303I −9.77375 − 0.13265I

u = 0.14391 − 1.45939I

−15.3081 + 0.2303I −9.77375 + 0.13265I

5

II. u-Polynomials

Crossings u-Polynomials at each crossing

c

1

, c

2

, c

6

c

7

u

25

− u

24

+ ··· + u + 1

c

3

u

25

+ 5u

24

+ ··· − 47u − 11

c

4

, c

8

, c

9

u

25

− u

24

+ ··· − u + 1

c

5

u

25

+ u

24

+ ··· + 3u + 2

c

10

u

25

− 7u

24

+ ··· + 41u − 7

6

III. Riley Polynomials

Crossings Riley Polynomials at each crossing

c

1

, c

2

, c

6

c

7

y

25

− 29y

24

+ ··· + y −1

c

3

y

25

+ 11y

24

+ ··· − 827y −121

c

4

, c

8

, c

9

y

25

+ 23y

24

+ ··· + y −1

c

5

y

25

+ 3y

24

+ ··· − 31y −4

c

10

y

25

− 5y

24

+ ··· + 197y −49

7