10

77

(K10a

18

)

A knot diagram

1

Linearized knot diagam

4 8 5 2 10 1 9 3 7 6

Solving Sequence

1,7

6 10

3,5

4 9 8 2

c

6

c

10

c

5

c

3

c

9

c

7

c

2

c

1

, c

4

, c

8

Ideals for irreducible components

2

of X

par

I

u

1

= hu

22

− u

21

+ ··· + b − 1, u

22

− 9u

20

+ ··· + a − 1, u

23

− 2u

22

+ ··· − u + 1i

I

u

2

= hu

6

− 2u

4

+ u

2

+ b, u

4

− u

2

+ a + 1, u

9

− 3u

7

− u

6

+ 3u

5

+ 2u

4

+ u

3

− u

2

− 2u − 1i

I

u

3

= hb, a − 1, u + 1i

* 3 irreducible components of dim

C

= 0, with total 33 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

22

− u

21

+ · · · + b − 1, u

22

− 9u

20

+ · · · + a − 1, u

23

− 2u

22

+ · · · − u + 1i

(i) Arc colorings

a

1

=



0

u



a

7

=



1

0



a

6

=



1

u

2



a

10

=



−u

3

+ u



a

3

=



−u

22

+ 9u

20

+ ··· + 5u + 1

−u

22

+ u

21

+ ··· − u + 1



a

5

=



−u

2

+ 1

−u

4

+ 2u

2



a

4

=



u

22

− u

21

+ ··· + 6u − 1

−u

19

+ 7u

17

+ ··· − 6u

2

− u



a

9

=



u

3

− 2u

−u

3

+ u



a

8

=



u

6

− 3u

4

+ 2u

2

+ 1

−u

6

+ 2u

4

− u

2



a

2

=



−u

21

+ 9u

19

+ ··· + 15u

2

+ 6u

−u

22

+ u

21

+ ··· − u + 1



(ii) Obstruction class = −1

(iii) Cusp Shapes

= −2u

21

+ 4u

20

+ 18u

19

− 32u

18

− 70u

17

+ 100u

16

+ 148u

15

− 132u

14

− 164u

13

− 4u

12

+

38u

11

+ 200u

10

+ 130u

9

− 148u

8

− 136u

7

− 68u

6

+ 2u

5

+ 80u

4

+ 50u

3

+ 20u

2

− 6u

2

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

, c

4

u

23

− 2u

22

+ ··· + 3u − 1

c

2

, c

8

u

23

− 2u

22

+ ··· + 2u − 2

c

3

u

23

+ 12u

22

+ ··· + 7u + 1

c

5

, c

6

, c

10

u

23

+ 2u

22

+ ··· − u − 1

c

7

, c

9

u

23

− 6u

22

+ ··· + 8u − 4

3

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

, c

4

y

23

− 12y

22

+ ··· + 7y −1

c

2

, c

8

y

23

− 6y

22

+ ··· + 8y −4

c

3

y

23

+ 32y

21

+ ··· + 31y −1

c

5

, c

6

, c

10

y

23

− 20y

22

+ ··· − 9y −1

c

7

, c

9

y

23

+ 18y

22

+ ··· − 8y −16

4

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

1

√

−1(vol +

√

−1CS) Cusp shape

u = −0.094963 + 0.875706I

a = 2.34528 + 0.84882I

b = −1.86529 − 0.93050I

−6.35503 − 7.52364I −0.34364 + 6.02284I

u = −0.094963 − 0.875706I

a = 2.34528 − 0.84882I

b = −1.86529 + 0.93050I

−6.35503 + 7.52364I −0.34364 − 6.02284I

u = 0.019170 + 0.819470I

a = 2.62421 − 0.25037I

b = −2.01346 − 0.21505I

−6.84422 + 1.43226I −1.58922 − 0.72835I

u = 0.019170 − 0.819470I

a = 2.62421 + 0.25037I

b = −2.01346 + 0.21505I

−6.84422 − 1.43226I −1.58922 + 0.72835I

u = −1.204480 + 0.336653I

a = 0.431013 − 0.938359I

b = −1.64316 − 0.13209I

0.429871 − 1.292380I 5.93678 + 0.45977I

u = −1.204480 − 0.336653I

a = 0.431013 + 0.938359I

b = −1.64316 + 0.13209I

0.429871 + 1.292380I 5.93678 − 0.45977I

u = −1.261470 + 0.073530I

a = 0.222367 + 0.062621I

b = −0.51599 − 1.45099I

2.49785 − 1.83570I 6.37573 + 3.60335I

u = −1.261470 − 0.073530I

a = 0.222367 − 0.062621I

b = −0.51599 + 1.45099I

2.49785 + 1.83570I 6.37573 − 3.60335I

u = −0.698406

a = −0.537824

b = −0.384144

1.01631 10.3720

u = −0.380828 + 0.580276I

a = 0.191263 − 0.218661I

b = 0.411893 + 0.381927I

0.26922 − 3.59706I 4.75645 + 7.79597I

5

Solutions to I

u

1

√

−1(vol +

√

−1CS) Cusp shape

u = −0.380828 − 0.580276I

a = 0.191263 + 0.218661I

b = 0.411893 − 0.381927I

0.26922 + 3.59706I 4.75645 − 7.79597I

u = −1.283800 + 0.366192I

a = −0.89429 + 1.11514I

b = 2.28606 + 0.18751I

−2.78844 − 5.69706I 2.62032 + 4.06061I

u = −1.283800 − 0.366192I

a = −0.89429 − 1.11514I

b = 2.28606 − 0.18751I

−2.78844 + 5.69706I 2.62032 − 4.06061I

u = 1.318900 + 0.354954I

a = 0.95360 + 1.10438I

b = −1.57753 + 1.07523I

1.33811 + 7.00485I 7.04339 − 5.13787I

u = 1.318900 − 0.354954I

a = 0.95360 − 1.10438I

b = −1.57753 − 1.07523I

1.33811 − 7.00485I 7.04339 + 5.13787I

u = 1.369190 + 0.083411I

a = 0.752735 − 0.144610I

b = −0.117460 − 0.451573I

6.97398 + 1.20490I 11.80214 − 0.58796I

u = 1.369190 − 0.083411I

a = 0.752735 + 0.144610I

b = −0.117460 + 0.451573I

6.97398 − 1.20490I 11.80214 + 0.58796I

u = 1.377900 + 0.168105I

a = −0.363007 + 0.227729I

b = −0.140468 + 0.918165I

5.85182 + 6.12354I 9.22962 − 6.59776I

u = 1.377900 − 0.168105I

a = −0.363007 − 0.227729I

b = −0.140468 − 0.918165I

5.85182 − 6.12354I 9.22962 + 6.59776I

u = 1.339590 + 0.393018I

a = −1.38895 − 1.04382I

b = 1.90675 − 1.28425I

−1.85559 + 12.07470I 3.82521 − 8.06520I

6

Solutions to I

u

1

√

−1(vol +

√

−1CS) Cusp shape

u = 1.339590 − 0.393018I

a = −1.38895 + 1.04382I

b = 1.90675 + 1.28425I

−1.85559 − 12.07470I 3.82521 + 8.06520I

u = 0.149995 + 0.273260I

a = −0.10530 + 2.51199I

b = 0.460745 − 0.520456I

−1.67067 + 0.60932I −3.84266 − 0.84402I

u = 0.149995 − 0.273260I

a = −0.10530 − 2.51199I

b = 0.460745 + 0.520456I

−1.67067 − 0.60932I −3.84266 + 0.84402I

7

II.

I

u

2

= hu

6

−2u

4

+u

2

+b, u

4

−u

2

+a+1, u

9

−3u

7

−u

6

+3u

5

+2u

4

+u

3

−u

2

−2u−1i

(i) Arc colorings

a

1

=



0

u



a

7

=



1

0



a

6

=



1

u

2



a

10

=



−u

3

+ u



a

3

=



−u

4

+ u

2

− 1

−u

6

+ 2u

4

− u

2



a

5

=



−u

2

+ 1

−u

4

+ 2u

2



a

4

=



−1

−u

2



a

9

=



u

3

− 2u

−u

3

+ u



a

8

=



u

6

− 3u

4

+ 2u

2

+ 1

−u

6

+ 2u

4

− u

2



a

2

=



−u

3

+ u



(ii) Obstruction class = −1

(iii) Cusp Shapes = 4u

6

− 8u

4

− 4u

3

+ 4u

2

+ 4u + 10

8

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

, c

4

, c

5

c

6

, c

10

u

9

− 3u

7

+ u

6

+ 3u

5

− 2u

4

+ u

3

+ u

2

− 2u + 1

c

2

, c

8

(u

3

+ u

2

− 1)

3

c

3

u

9

+ 6u

8

+ 15u

7

+ 17u

6

+ 3u

5

− 12u

4

− 9u

3

+ u

2

+ 2u + 1

c

7

, c

9

(u

3

− u

2

+ 2u − 1)

3

9

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

, c

4

, c

5

c

6

, c

10

y

9

− 6y

8

+ 15y

7

− 17y

6

+ 3y

5

+ 12y

4

− 9y

3

− y

2

+ 2y −1

c

2

, c

8

(y

3

− y

2

+ 2y −1)

3

c

3

y

9

− 6y

8

+ 27y

7

− 73y

6

+ 139y

5

− 184y

4

+ 83y

3

− 13y

2

+ 2y −1

c

7

, c

9

(y

3

+ 3y

2

+ 2y −1)

3

10

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

2

√

−1(vol +

√

−1CS) Cusp shape

u = −0.073457 + 0.802780I

a = −2.03355 − 0.26868I

b = 1.66236 + 0.56228I

−3.02413 − 2.82812I 2.49024 + 2.97945I

u = −0.073457 − 0.802780I

a = −2.03355 + 0.26868I

b = 1.66236 − 0.56228I

−3.02413 + 2.82812I 2.49024 − 2.97945I

u = 1.21243

a = −1.69089

b = −0.324718

1.11345 9.01950

u = −1.180080 + 0.437737I

a = −0.17400 + 1.44838I

b = 1.66236 − 0.56228I

−3.02413 + 2.82812I 2.49024 − 2.97945I

u = −1.180080 − 0.437737I

a = −0.17400 − 1.44838I

b = 1.66236 + 0.56228I

−3.02413 − 2.82812I 2.49024 + 2.97945I

u = 1.253530 + 0.365043I

a = −0.79245 − 1.71706I

b = 1.66236 − 0.56228I

−3.02413 + 2.82812I 2.49024 − 2.97945I

u = 1.253530 − 0.365043I

a = −0.79245 + 1.71706I

b = 1.66236 + 0.56228I

−3.02413 − 2.82812I 2.49024 + 2.97945I

u = −0.606217 + 0.320153I

a = −0.654553 − 0.182436I

b = −0.324718

1.11345 9.01951 + 0.I

u = −0.606217 − 0.320153I

a = −0.654553 + 0.182436I

b = −0.324718

1.11345 9.01951 + 0.I

11

III. I

u

3

= hb, a − 1, u + 1i

(i) Arc colorings

a

1

=



0

−1



a

7

=



1

0



a

6

=



1



a

10

=



1

0



a

3

=



1

0



a

5

=



0

1



a

4

=



1



a

9

=



1

0



a

8

=



1

0



a

2

=



1

0



(ii) Obstruction class = 1

(iii) Cusp Shapes = 0

12

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

, c

3

, c

10

u − 1

c

2

, c

7

, c

8

c

9

u

c

4

, c

5

, c

6

u + 1

13

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

, c

3

, c

4

c

5

, c

6

, c

10

y − 1

c

2

, c

7

, c

8

c

9

y

14

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

3

√

−1(vol +

√

−1CS) Cusp shape

u = −1.00000

a = 1.00000

b = 0

0 0

15

IV. u-Polynomials

Crossings u-Polynomials at each crossing

c

1

(u − 1)(u

9

− 3u

7

+ u

6

+ 3u

5

− 2u

4

+ u

3

+ u

2

− 2u + 1)

· (u

23

− 2u

22

+ ··· + 3u − 1)

c

2

, c

8

u(u

3

+ u

2

− 1)

3

(u

23

− 2u

22

+ ··· + 2u − 2)

c

3

(u − 1)(u

9

+ 6u

8

+ 15u

7

+ 17u

6

+ 3u

5

− 12u

4

− 9u

3

+ u

2

+ 2u + 1)

· (u

23

+ 12u

22

+ ··· + 7u + 1)

c

4

(u + 1)(u

9

− 3u

7

+ u

6

+ 3u

5

− 2u

4

+ u

3

+ u

2

− 2u + 1)

· (u

23

− 2u

22

+ ··· + 3u − 1)

c

5

, c

6

(u + 1)(u

9

− 3u

7

+ u

6

+ 3u

5

− 2u

4

+ u

3

+ u

2

− 2u + 1)

· (u

23

+ 2u

22

+ ··· − u − 1)

c

7

, c

9

u(u

3

− u

2

+ 2u − 1)

3

(u

23

− 6u

22

+ ··· + 8u − 4)

c

10

(u − 1)(u

9

− 3u

7

+ u

6

+ 3u

5

− 2u

4

+ u

3

+ u

2

− 2u + 1)

· (u

23

+ 2u

22

+ ··· − u − 1)

16

V. Riley Polynomials

Crossings Riley Polynomials at each crossing

c

1

, c

4

(y − 1)(y

9

− 6y

8

+ 15y

7

− 17y

6

+ 3y

5

+ 12y

4

− 9y

3

− y

2

+ 2y − 1)

· (y

23

− 12y

22

+ ··· + 7y − 1)

c

2

, c

8

y(y

3

− y

2

+ 2y − 1)

3

(y

23

− 6y

22

+ ··· + 8y − 4)

c

3

(y − 1)

· (y

9

− 6y

8

+ 27y

7

− 73y

6

+ 139y

5

− 184y

4

+ 83y

3

− 13y

2

+ 2y − 1)

· (y

23

+ 32y

21

+ ··· + 31y − 1)

c

5

, c

6

, c

10

(y − 1)(y

9

− 6y

8

+ 15y

7

− 17y

6

+ 3y

5

+ 12y

4

− 9y

3

− y

2

+ 2y − 1)

· (y

23

− 20y

22

+ ··· − 9y − 1)

c

7

, c

9

y(y

3

+ 3y

2

+ 2y − 1)

3

(y

23

+ 18y

22

+ ··· − 8y − 16)

17