11a

57

(K11a

57

)

A knot diagram

1

Linearized knot diagam

4 1 8 2 11 9 10 3 7 5 6

Solving Sequence

3,8

4

1,9

2

5,10

7 6 11

c

3

c

8

c

2

c

4

c

7

c

6

c

11

c

1

, c

5

, c

9

, c

10

Ideals for irreducible components

2

of X

par

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).

1

I

u

1

= h−68209745u

16

+ 103218620u

15

+ ··· + 6895752724d + 558230980,

− 117728333u

16

+ 37441650u

15

+ ··· + 13791505448c − 2779791176,

− 70376587u

16

+ 38764471u

15

+ ··· + 6895752724b + 3895994728,

− 327083412u

16

+ 276473252u

15

+ ··· + 6895752724a − 7902639380, u

17

− 2u

16

+ ··· − 4u

2

+ 8i

I

u

2

= hu

6

c + 2u

5

c + 3u

4

c + 2u

3

c − u

3

− cu − u

2

+ d − u,

− u

6

c − u

5

c − 2u

4

c − u

3

c − u

2

c + 2c

2

− cu − 2u

2

− 2u − 2, −u

4

− u

3

− u

2

+ b + 1,

− u

6

− 3u

5

− 4u

4

− 3u

3

− u

2

+ 2a + u, u

7

+ 3u

6

+ 6u

5

+ 7u

4

+ 5u

3

+ u

2

− 2u − 2i

I

u

3

= h−u

4

+ d, −u

2

+ c − 1, −u

4

a − 2u

2

a + u

3

− au + b − a + u + 1,

u

3

a − 2u

2

a − u

3

+ a

2

+ 2au + u

2

− 2a − u + 1, u

5

− u

4

+ 2u

3

− u

2

+ u − 1i

I

u

4

= h2u

4

a − 2u

4

+ 4u

2

a + 2u

3

+ au − 6u

2

+ d + 4a + 2u − 4, −u

4

a + u

4

− 2u

2

a − u

3

+ 3u

2

+ c − 2a − u + 2,

− u

4

a − 2u

2

a + u

3

− au + b − a + u + 1, u

3

a − 2u

2

a − u

3

+ a

2

+ 2au + u

2

− 2a − u + 1,

u

5

− u

4

+ 2u

3

− u

2

+ u − 1i

I

u

5

= h−u

4

+ d, −u

2

+ c − 1, u

4

− u

3

+ u

2

+ b + 1, 2u

4

− u

3

+ 4u

2

+ a + 2, u

5

− u

4

+ 2u

3

− u

2

+ u − 1i

I

v

1

= hc, d − 1, b, a − 1, v + 1i

I

v

2

= ha, d, c − 1, b + 1, v − 1i

I

v

3

= ha, d + 1, c − a, b + 1, v − 1i

I

v

4

= ha, da + c − 1, dv + 1, cv −a −v, b + 1i

* 8 irreducible components of dim

C

= 0, with total 59 representations.

* 1 irreducible components of dim

C

= 1

2

All coeﬃcients of polynomials are rational numbers. But the coeﬃcients are sometimes approximated

in decimal forms when there is not enough margin.

2

I. I

u

1

= h−6.82 × 10

7

u

16

+ 1.03 × 10

8

u

15

+ · · · + 6.90 × 10

9

d + 5.58 ×

10

8

, −1.18 × 10

8

u

16

+ 3.74 × 10

7

u

15

+ · · · + 1.38 × 10

10

c − 2.78 × 10

9

, −7.04 ×

10

7

u

16

+ 3.88 × 10

7

u

15

+ · · · + 6.90 × 10

9

b + 3.90 × 10

9

, −3.27 × 10

8

u

16

+

2.76 × 10

8

u

15

+ · · · + 6.90 × 10

9

a − 7.90 × 10

9

, u

17

− 2u

16

+ · · · − 4u

2

+ 8i

(i) Arc colorings

a

3

=



1

0



a

8

=



0

u



a

4

=



1

u

2



a

1

=



0.0474326u

16

− 0.0400933u

15

+ ··· + 0.133884u + 1.14602

0.0102058u

16

− 0.00562150u

15

+ ··· + 0.589483u − 0.564985



a

9

=



−u

u



a

2

=



−0.0115535u

16

− 0.0103886u

15

+ ··· − 0.835060u + 1.27282

−0.0135318u

16

+ 0.0739510u

15

+ ··· + 1.06137u + 0.141156



a

5

=



0.0576384u

16

− 0.0457148u

15

+ ··· + 0.723367u + 0.581031

−0.0339841u

16

+ 0.0141997u

15

+ ··· − 1.05059u + 0.00848878



a

10

=



0.00853629u

16

− 0.00271483u

15

+ ··· − 0.843158u + 0.201558

0.00989156u

16

− 0.0149684u

15

+ ··· + 0.971920u − 0.0809529



a

7

=



−0.0184279u

16

+ 0.0176833u

15

+ ··· − 0.128762u − 0.120605

0.00989156u

16

− 0.0149684u

15

+ ··· + 0.971920u − 0.0809529



a

6

=



−0.0196690u

16

+ 0.00798947u

15

+ ··· − 0.197053u − 0.235467

0.0111327u

16

− 0.00527464u

15

+ ··· + 1.04021u + 0.0339091



a

11

=



0.0321906u

16

− 0.0342299u

15

+ ··· − 0.170381u + 0.791078

0.00701992u

16

+ 0.00619838u

15

+ ··· + 0.764986u − 0.330652



a

11

=



0.0321906u

16

− 0.0342299u

15

+ ··· − 0.170381u + 0.791078

0.00701992u

16

+ 0.00619838u

15

+ ··· + 0.764986u − 0.330652



(ii) Obstruction class = −1

(iii) Cusp Shapes =

975451789

3447876362

u

16

−

210120269

3447876362

u

15

+ ··· +

8037027246

1723938181

u −

2146878348

1723938181

3

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

, c

4

u

17

− 2u

16

+ ··· − 8u + 4

c

2

u

17

+ 6u

16

+ ··· + 88u + 16

c

3

, c

8

u

17

− 2u

16

+ ··· − 4u

2

+ 8

c

5

, c

6

, c

7

c

9

, c

10

, c

11

u

17

+ 2u

16

+ ··· + 3u + 1

4

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

, c

4

y

17

− 6y

16

+ ··· + 88y −16

c

2

y

17

+ 10y

16

+ ··· + 288y −256

c

3

, c

8

y

17

+ 6y

16

+ ··· + 64y −64

c

5

, c

6

, c

7

c

9

, c

10

, c

11

y

17

− 20y

16

+ ··· + 27y −1

5

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

1

√

−1(vol +

√

−1CS) Cusp shape

u = 0.679716 + 0.561358I

a = 0.469715 + 0.071775I

b = −1.066150 + 0.686891I

c = −0.482279 − 0.453082I

d = 0.255516 + 0.765465I

−3.14388 + 1.09865I −5.52136 − 1.09882I

u = 0.679716 − 0.561358I

a = 0.469715 − 0.071775I

b = −1.066150 − 0.686891I

c = −0.482279 + 0.453082I

d = 0.255516 − 0.765465I

−3.14388 − 1.09865I −5.52136 + 1.09882I

u = 0.555749 + 1.023030I

a = −0.24717 + 1.86349I

b = −0.86669 − 1.12847I

c = −0.493632 − 0.522885I

d = −0.051009 + 0.779355I

−1.71782 − 5.90288I −0.75718 + 7.23695I

u = 0.555749 − 1.023030I

a = −0.24717 − 1.86349I

b = −0.86669 + 1.12847I

c = −0.493632 + 0.522885I

d = −0.051009 − 0.779355I

−1.71782 + 5.90288I −0.75718 − 7.23695I

u = −1.247530 + 0.318357I

a = 0.505620 + 0.282992I

b = 0.454441 + 0.853023I

c = −1.114330 − 0.162230I

d = −0.517027 + 0.098116I

8.60033 − 1.91429I 8.38805 + 0.33236I

u = −1.247530 − 0.318357I

a = 0.505620 − 0.282992I

b = 0.454441 − 0.853023I

c = −1.114330 + 0.162230I

d = −0.517027 − 0.098116I

8.60033 + 1.91429I 8.38805 − 0.33236I

6

Solutions to I

u

1

√

−1(vol +

√

−1CS) Cusp shape

u = −0.022849 + 0.695780I

a = 1.92972 − 1.22120I

b = −0.342039 + 0.295037I

c = 0.324109 − 0.810541I

d = 0.054070 + 0.438524I

0.88275 + 1.29794I 5.86581 − 6.22804I

u = −0.022849 − 0.695780I

a = 1.92972 + 1.22120I

b = −0.342039 − 0.295037I

c = 0.324109 + 0.810541I

d = 0.054070 − 0.438524I

0.88275 − 1.29794I 5.86581 + 6.22804I

u = 1.235140 + 0.560024I

a = 0.436143 + 0.137389I

b = −0.74733 + 1.42693I

c = 1.046940 − 0.255771I

d = 0.525994 + 0.171484I

6.85439 + 7.49245I 6.04980 − 5.00652I

u = 1.235140 − 0.560024I

a = 0.436143 − 0.137389I

b = −0.74733 − 1.42693I

c = 1.046940 + 0.255771I

d = 0.525994 − 0.171484I

6.85439 − 7.49245I 6.04980 + 5.00652I

u = −0.66454 + 1.33308I

a = 0.446199 + 0.683104I

b = 0.944156 − 0.676727I

c = 0.252205 + 0.988893I

d = −0.30957 − 2.53920I

11.9481 + 8.6770I 9.06927 − 4.38269I

u = −0.66454 − 1.33308I

a = 0.446199 − 0.683104I

b = 0.944156 + 0.676727I

c = 0.252205 − 0.988893I

d = −0.30957 + 2.53920I

11.9481 − 8.6770I 9.06927 + 4.38269I

7

Solutions to I

u

1

√

−1(vol +

√

−1CS) Cusp shape

u = 0.79652 + 1.26851I

a = −0.46664 + 1.36075I

b = −1.06945 − 1.61168I

c = −0.297727 + 0.961003I

d = 0.35861 − 2.47585I

9.1924 − 14.7354I 6.16899 + 8.15927I

u = 0.79652 − 1.26851I

a = −0.46664 − 1.36075I

b = −1.06945 + 1.61168I

c = −0.297727 − 0.961003I

d = 0.35861 + 2.47585I

9.1924 + 14.7354I 6.16899 − 8.15927I

u = −0.11728 + 1.54547I

a = 0.161885 − 1.071490I

b = 0.08928 + 1.57333I

c = 0.041573 + 1.021680I

d = −0.05064 − 2.64219I

15.7365 + 3.2760I 10.07807 − 2.58290I

u = −0.11728 − 1.54547I

a = 0.161885 + 1.071490I

b = 0.08928 − 1.57333I

c = 0.041573 − 1.021680I

d = −0.05064 + 2.64219I

15.7365 − 3.2760I 10.07807 + 2.58290I

u = −0.429856

a = 0.529049

b = −0.792429

c = 0.446280

d = −0.531893

−1.29941 −8.68290

8

II. I

u

2

= hu

6

c + 2u

5

c + · · · + d − u, −u

6

c − u

5

c + · · · + 2c

2

− 2, −u

4

− u

3

−

u

2

+ b + 1, −u

6

− 3u

5

+ · · · + 2a + u, u

7

+ 3u

6

+ · · · − 2u − 2i

(i) Arc colorings

a

3

=



1

0



a

8

=



0

u



a

4

=



1

u

2



a

1

=



1

2

u

6

+

3

2

u

5

+ ··· +

1

2

u

2

−

1

2

u

4

+ u

3

+ u

2

− 1



a

9

=



−u

u



a

2

=



−

1

2

u

6

−

1

2

u

5

+ ··· +

1

2

u + 1

−u

5

− u

4

− 2u

3

− u

2

+ 1



a

5

=



1

2

u

6

+

3

2

u

5

+ ··· −

1

2

u − 1

−u

5

− 2u

4

− 2u

3

− u

2

+ u + 1



a

10

=



c

−u

6

c − 2u

5

c − 3u

4

c − 2u

3

c + u

3

+ cu + u

2

+ u



a

7

=



u

6

c + 2u

5

c + 3u

4

c + 2u

3

c − u

3

− cu − u

2

− c − u

−u

6

c − 2u

5

c − 3u

4

c − 2u

3

c + u

3

+ cu + u

2

+ u



a

6

=



u

6

c + 2u

5

c + 3u

4

c + 2u

3

c + u

2

c − u

3

− cu − u

2

− c − u

−u

6

c − 2u

5

c − 3u

4

c − 2u

3

c − u

2

c + u

3

+ cu + u

2

+ u



a

11

=



1

2

u

6

+

1

2

u

5

+ ··· +

1

2

u

2

−

1

2

u

−u

4

c + u

5

− u

3

c + 2u

4

− u

2

c + 3u

3

+ 2u

2

+ u − 1



a

11

=



1

2

u

6

+

1

2

u

5

+ ··· +

1

2

u

2

−

1

2

u

−u

4

c + u

5

− u

3

c + 2u

4

− u

2

c + 3u

3

+ 2u

2

+ u − 1



(ii) Obstruction class = −1

(iii) Cusp Shapes = 2u

6

+ 8u

5

+ 10u

4

+ 10u

3

− 4u

9

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

, c

4

(u

7

− u

6

− u

5

+ 2u

4

+ u

3

− 2u

2

+ u + 1)

2

c

2

(u

7

+ 3u

6

+ 7u

5

+ 8u

4

+ 9u

3

+ 6u

2

+ 5u + 1)

2

c

3

, c

8

(u

7

+ 3u

6

+ 6u

5

+ 7u

4

+ 5u

3

+ u

2

− 2u − 2)

2

c

5

, c

6

, c

7

c

9

, c

10

, c

11

u

14

+ u

13

+ ··· − 4u − 4

10

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

, c

4

(y

7

− 3y

6

+ 7y

5

− 8y

4

+ 9y

3

− 6y

2

+ 5y −1)

2

c

2

(y

7

+ 5y

6

+ 19y

5

+ 36y

4

+ 49y

3

+ 38y

2

+ 13y −1)

2

c

3

, c

8

(y

7

+ 3y

6

+ 4y

5

+ y

4

− y

3

+ 7y

2

+ 8y − 4)

2

c

5

, c

6

, c

7

c

9

, c

10

, c

11

y

14

− 11y

13

+ ··· − 40y + 16

11

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

2

√

−1(vol +

√

−1CS) Cusp shape

u = −0.984140 + 0.426152I

a = 0.472917 − 0.120643I

b = −0.714380 − 0.998080I

c = −1.198550 − 0.312556I

d = −0.438334 + 0.145757I

1.19445 − 3.93070I 1.74059 + 4.87230I

u = −0.984140 + 0.426152I

a = 0.472917 − 0.120643I

b = −0.714380 − 0.998080I

c = 0.543084 − 0.485903I

d = −0.376079 + 1.030380I

1.19445 − 3.93070I 1.74059 + 4.87230I

u = −0.984140 − 0.426152I

a = 0.472917 + 0.120643I

b = −0.714380 + 0.998080I

c = −1.198550 + 0.312556I

d = −0.438334 − 0.145757I

1.19445 + 3.93070I 1.74059 − 4.87230I

u = −0.984140 − 0.426152I

a = 0.472917 + 0.120643I

b = −0.714380 + 0.998080I

c = 0.543084 + 0.485903I

d = −0.376079 − 1.030380I

1.19445 + 3.93070I 1.74059 − 4.87230I

u = −0.167785 + 1.218780I

a = 0.529166 + 1.016880I

b = 0.242061 − 0.924444I

c = −0.650809 − 0.592102I

d = −0.300734 + 0.551723I

7.14223 − 0.95540I 8.68929 + 2.37083I

u = −0.167785 + 1.218780I

a = 0.529166 + 1.016880I

b = 0.242061 − 0.924444I

c = 0.093897 + 1.158860I

d = −0.13529 − 2.82138I

7.14223 − 0.95540I 8.68929 + 2.37083I

12

Solutions to I

u

2

√

−1(vol +

√

−1CS) Cusp shape

u = −0.167785 − 1.218780I

a = 0.529166 − 1.016880I

b = 0.242061 + 0.924444I

c = −0.650809 + 0.592102I

d = −0.300734 − 0.551723I

7.14223 + 0.95540I 8.68929 − 2.37083I

u = −0.167785 − 1.218780I

a = 0.529166 − 1.016880I

b = 0.242061 + 0.924444I

c = 0.093897 − 1.158860I

d = −0.13529 + 2.82138I

7.14223 + 0.95540I 8.68929 − 2.37083I

u = −0.654547 + 1.202470I

a = −0.33478 − 1.51279I

b = −0.90125 + 1.43610I

c = 0.292391 + 1.022450I

d = −0.38305 − 2.56809I

3.65356 + 9.93065I 3.53972 − 7.33664I

u = −0.654547 + 1.202470I

a = −0.33478 − 1.51279I

b = −0.90125 + 1.43610I

c = 0.509792 − 0.511513I

d = 0.118485 + 0.850766I

3.65356 + 9.93065I 3.53972 − 7.33664I

u = −0.654547 − 1.202470I

a = −0.33478 + 1.51279I

b = −0.90125 − 1.43610I

c = 0.292391 − 1.022450I

d = −0.38305 + 2.56809I

3.65356 − 9.93065I 3.53972 + 7.33664I

u = −0.654547 − 1.202470I

a = −0.33478 + 1.51279I

b = −0.90125 − 1.43610I

c = 0.509792 + 0.511513I

d = 0.118485 − 0.850766I

3.65356 − 9.93065I 3.53972 + 7.33664I

13

Solutions to I

u

2

√

−1(vol +

√

−1CS) Cusp shape

u = 0.612945

a = 0.665400

b = −0.252863

c = −1.05845

d = 1.74513

2.33847 2.06080

u = 0.612945

a = 0.665400

b = −0.252863

c = 1.87884

d = 0.284876

2.33847 2.06080

14

III. I

u

3

= h−u

4

+ d, −u

2

+ c − 1, −u

4

a + u

3

+ · · · − a + 1, u

3

a − u

3

+ · · · −

2a + 1, u

5

− u

4

+ 2u

3

− u

2

+ u − 1i

(i) Arc colorings

a

3

=



1

0



a

8

=



0

u



a

4

=



1

u

2



a

1

=



a

u

4

a + 2u

2

a − u

3

+ au + a − u − 1



a

9

=



−u

u



a

2

=



−u

4

a − u

2

a + u

3

− au + u + 1

u

4

a + u

4

+ u

2

a − 2u

3

+ au + 2u

2

− 2u



a

5

=



u

4

a + 2u

2

a − u

3

+ au + 2a − u − 1

−u

4

+ 2u

3

− au − 2u

2

+ 2u



a

10

=



u

2

+ 1

u

4



a

7

=



−u

4

− u

2

− 1

u

4



a

6

=



−1

−u

2



a

11

=



−u

4

a − u

2

a + u

3

− au + u + 1

u

4

a + u

4

+ u

2

a − 2u

3

+ au + 2u

2

− 2u



a

11

=



−u

4

a − u

2

a + u

3

− au + u + 1

u

4

a + u

4

+ u

2

a − 2u

3

+ au + 2u

2

− 2u



(ii) Obstruction class = −1

(iii) Cusp Shapes = −4u

3

+ 4u

2

− 4u + 6

15

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

, c

4

, c

5

c

10

, c

11

u

10

− u

9

− 2u

8

+ 4u

7

− 4u

5

+ 3u

4

+ u

3

− 2u

2

+ 1

c

2

u

10

+ 5u

9

+ ··· + 4u + 1

c

3

, c

8

(u

5

− u

4

+ 2u

3

− u

2

+ u − 1)

2

c

6

, c

7

, c

9

(u

5

+ u

4

− 2u

3

− u

2

+ u − 1)

2

16

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

, c

4

, c

5

c

10

, c

11

y

10

− 5y

9

+ ··· − 4y + 1

c

2

y

10

− y

9

− 6y

7

+ 22y

6

+ 6y

5

+ 45y

4

+ 15y

3

+ 22y

2

+ 4y + 1

c

3

, c

8

(y

5

+ 3y

4

+ 4y

3

+ y

2

− y −1)

2

c

6

, c

7

, c

9

(y

5

− 5y

4

+ 8y

3

− 3y

2

− y −1)

2

17

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

3

√

−1(vol +

√

−1CS) Cusp shape

u = −0.339110 + 0.822375I

a = 0.445032 − 0.031192I

b = −1.50324 − 0.38743I

c = 0.438694 − 0.557752I

d = 0.003977 + 0.626138I

0.32910 + 1.53058I 2.51511 − 4.43065I

u = −0.339110 + 0.822375I

a = 0.46155 − 2.45660I

b = −0.703115 + 0.728284I

c = 0.438694 − 0.557752I

d = 0.003977 + 0.626138I

0.32910 + 1.53058I 2.51511 − 4.43065I

u = −0.339110 − 0.822375I

a = 0.445032 + 0.031192I

b = −1.50324 + 0.38743I

c = 0.438694 + 0.557752I

d = 0.003977 − 0.626138I

0.32910 − 1.53058I 2.51511 + 4.43065I

u = −0.339110 − 0.822375I

a = 0.46155 + 2.45660I

b = −0.703115 − 0.728284I

c = 0.438694 + 0.557752I

d = 0.003977 − 0.626138I

0.32910 − 1.53058I 2.51511 + 4.43065I

u = 0.766826

a = 0.595741 + 0.124010I

b = −0.258559 + 0.407825I

c = 1.58802

d = 0.345770

2.40108 3.48110

u = 0.766826

a = 0.595741 − 0.124010I

b = −0.258559 − 0.407825I

c = 1.58802

d = 0.345770

2.40108 3.48110

18

Solutions to I

u

3

√

−1(vol +

√

−1CS) Cusp shape

u = 0.455697 + 1.200150I

a = 0.542114 − 0.781069I

b = 0.586363 + 0.691742I

c = −0.232705 + 1.093810I

d = 0.32314 − 2.69669I

5.87256 − 4.40083I 6.74431 + 3.49859I

u = 0.455697 + 1.200150I

a = −0.04444 + 1.54938I

b = −0.62145 − 1.31364I

c = −0.232705 + 1.093810I

d = 0.32314 − 2.69669I

5.87256 − 4.40083I 6.74431 + 3.49859I

u = 0.455697 − 1.200150I

a = 0.542114 + 0.781069I

b = 0.586363 − 0.691742I

c = −0.232705 − 1.093810I

d = 0.32314 + 2.69669I

5.87256 + 4.40083I 6.74431 − 3.49859I

u = 0.455697 − 1.200150I

a = −0.04444 − 1.54938I

b = −0.62145 + 1.31364I

c = −0.232705 − 1.093810I

d = 0.32314 + 2.69669I

5.87256 + 4.40083I 6.74431 − 3.49859I

19

IV. I

u

4

= h2u

4

a − 2u

4

+ · · · + 4a − 4, −u

4

a + u

4

+ · · · − 2a + 2, −u

4

a + u

3

+

· · · − a + 1, u

3

a − u

3

+ · · · − 2a + 1, u

5

− u

4

+ 2u

3

− u

2

+ u − 1i

(i) Arc colorings

a

3

=



1

0



a

8

=



0

u



a

4

=



1

u

2



a

1

=



a

u

4

a + 2u

2

a − u

3

+ au + a − u − 1



a

9

=



−u

u



a

2

=



−u

4

a − u

2

a + u

3

− au + u + 1

u

4

a + u

4

+ u

2

a − 2u

3

+ au + 2u

2

− 2u



a

5

=



u

4

a + 2u

2

a − u

3

+ au + 2a − u − 1

−u

4

+ 2u

3

− au − 2u

2

+ 2u



a

10

=



u

4

a − u

4

+ 2u

2

a + u

3

− 3u

2

+ 2a + u − 2

−2u

4

a + 2u

4

− 4u

2

a − 2u

3

− au + 6u

2

− 4a − 2u + 4



a

7

=



u

4

a − u

4

+ 2u

2

a + u

3

+ au − 3u

2

+ 2a + u − 2

−2u

4

a + 2u

4

− 4u

2

a − 2u

3

− au + 6u

2

− 4a − 2u + 4



a

6

=



2u

4

a − u

3

a − 2u

4

+ 4u

2

a + u

3

+ au − 4u

2

+ 3a − 2

−3u

4

a + u

3

a + 3u

4

− 6u

2

a − 2u

3

− au + 7u

2

− 5a − u + 4



a

11

=



3u

4

a − 2u

4

+ 5u

2

a + u

3

+ au − 4u

2

+ 4a − 3

−3u

4

a + 3u

4

− 5u

2

a − 2u

3

− au + 6u

2

− 4a − u + 4



a

11

=



3u

4

a − 2u

4

+ 5u

2

a + u

3

+ au − 4u

2

+ 4a − 3

−3u

4

a + 3u

4

− 5u

2

a − 2u

3

− au + 6u

2

− 4a − u + 4



(ii) Obstruction class = −1

(iii) Cusp Shapes = −4u

3

+ 4u

2

− 4u + 6

20

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

, c

4

, c

6

c

7

, c

9

u

10

− u

9

− 2u

8

+ 4u

7

− 4u

5

+ 3u

4

+ u

3

− 2u

2

+ 1

c

2

u

10

+ 5u

9

+ ··· + 4u + 1

c

3

, c

8

(u

5

− u

4

+ 2u

3

− u

2

+ u − 1)

2

c

5

, c

10

, c

11

(u

5

+ u

4

− 2u

3

− u

2

+ u − 1)

2

21

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

, c

4

, c

6

c

7

, c

9

y

10

− 5y

9

+ ··· − 4y + 1

c

2

y

10

− y

9

− 6y

7

+ 22y

6

+ 6y

5

+ 45y

4

+ 15y

3

+ 22y

2

+ 4y + 1

c

3

, c

8

(y

5

+ 3y

4

+ 4y

3

+ y

2

− y −1)

2

c

5

, c

10

, c

11

(y

5

− 5y

4

+ 8y

3

− 3y

2

− y −1)

2

22

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

4

√

−1(vol +

√

−1CS) Cusp shape

u = −0.339110 + 0.822375I

a = 0.445032 − 0.031192I

b = −1.50324 − 0.38743I

c = 0.366828 + 1.351750I

d = −0.60839 − 3.08007I

0.32910 + 1.53058I 2.51511 − 4.43065I

u = −0.339110 + 0.822375I

a = 0.46155 − 2.45660I

b = −0.703115 + 0.728284I

c = −0.805522 − 0.794001I

d = −0.252685 + 0.375376I

0.32910 + 1.53058I 2.51511 − 4.43065I

u = −0.339110 − 0.822375I

a = 0.445032 + 0.031192I

b = −1.50324 + 0.38743I

c = 0.366828 − 1.351750I

d = −0.60839 + 3.08007I

0.32910 − 1.53058I 2.51511 + 4.43065I

u = −0.339110 − 0.822375I

a = 0.46155 + 2.45660I

b = −0.703115 − 0.728284I

c = −0.805522 + 0.794001I

d = −0.252685 − 0.375376I

0.32910 − 1.53058I 2.51511 + 4.43065I

u = 0.766826

a = 0.595741 + 0.124010I

b = −0.258559 + 0.407825I

c = −0.794011 + 0.436741I

d = 1.13119 − 0.96858I

2.40108 3.48110

u = 0.766826

a = 0.595741 − 0.124010I

b = −0.258559 − 0.407825I

c = −0.794011 − 0.436741I

d = 1.13119 + 0.96858I

2.40108 3.48110

23

Solutions to I

u

4

√

−1(vol +

√

−1CS) Cusp shape

u = 0.455697 + 1.200150I

a = 0.542114 − 0.781069I

b = 0.586363 + 0.691742I

c = −0.518554 − 0.530425I

d = −0.147334 + 0.766162I

5.87256 − 4.40083I 6.74431 + 3.49859I

u = 0.455697 + 1.200150I

a = −0.04444 + 1.54938I

b = −0.62145 − 1.31364I

c = 0.751259 − 0.563387I

d = 0.377218 + 0.474060I

5.87256 − 4.40083I 6.74431 + 3.49859I

u = 0.455697 − 1.200150I

a = 0.542114 + 0.781069I

b = 0.586363 − 0.691742I

c = −0.518554 + 0.530425I

d = −0.147334 − 0.766162I

5.87256 + 4.40083I 6.74431 − 3.49859I

u = 0.455697 − 1.200150I

a = −0.04444 − 1.54938I

b = −0.62145 + 1.31364I

c = 0.751259 + 0.563387I

d = 0.377218 − 0.474060I

5.87256 + 4.40083I 6.74431 − 3.49859I

24

V. I

u

5

= h−u

4

+ d, −u

2

+ c − 1, u

4

− u

3

+ u

2

+ b + 1, 2u

4

− u

3

+ 4u

2

+ a +

2, u

5

− u

4

+ 2u

3

− u

2

+ u − 1i

(i) Arc colorings

a

3

=



1

0



a

8

=



0

u



a

4

=



1

u

2



a

1

=



−2u

4

+ u

3

− 4u

2

− 2

−u

4

+ u

3

− u

2

− 1



a

9

=



−u

u



a

2

=



−2u

4

− 4u

2

− u − 2

−2u

4

+ 2u

3

− 2u

2

+ u − 2



a

5

=



−3u

4

+ 2u

3

− 5u

2

− 3

u

4

− 2u

3

− 2u



a

10

=



u

2

+ 1

u

4



a

7

=



−u

4

− u

2

− 1

u

4



a

6

=



−1

−u

2



a

11

=



−2u

4

− 4u

2

− u − 2

−2u

4

+ 2u

3

− 2u

2

+ u − 2



a

11

=



−2u

4

− 4u

2

− u − 2

−2u

4

+ 2u

3

− 2u

2

+ u − 2



(ii) Obstruction class = −1

(iii) Cusp Shapes = −4u

3

+ 4u

2

− 4u + 6

25

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

, c

4

, c

5

c

6

, c

7

, c

9

c

10

, c

11

u

5

+ u

4

− 2u

3

− u

2

+ u − 1

c

2

u

5

+ 5u

4

+ 8u

3

+ 3u

2

− u + 1

c

3

, c

8

u

5

− u

4

+ 2u

3

− u

2

+ u − 1

26

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

, c

4

, c

5

c

6

, c

7

, c

9

c

10

, c

11

y

5

− 5y

4

+ 8y

3

− 3y

2

− y −1

c

2

y

5

− 9y

4

+ 32y

3

− 35y

2

− 5y −1

c

3

, c

8

y

5

+ 3y

4

+ 4y

3

+ y

2

− y −1

27

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

5

√

−1(vol +

√

−1CS) Cusp shape

u = −0.339110 + 0.822375I

a = 0.886294 + 0.706265I

b = 0.206354 − 0.340852I

c = 0.438694 − 0.557752I

d = 0.003977 + 0.626138I

0.32910 + 1.53058I 2.51511 − 4.43065I

u = −0.339110 − 0.822375I

a = 0.886294 − 0.706265I

b = 0.206354 + 0.340852I

c = 0.438694 + 0.557752I

d = 0.003977 − 0.626138I

0.32910 − 1.53058I 2.51511 + 4.43065I

u = 0.766826

a = −4.59272

b = −1.48288

c = 1.58802

d = 0.345770

2.40108 3.48110

u = 0.455697 + 1.200150I

a = 0.410064 + 0.037156I

b = −1.96491 + 0.62190I

c = −0.232705 + 1.093810I

d = 0.32314 − 2.69669I

5.87256 − 4.40083I 6.74431 + 3.49859I

u = 0.455697 − 1.200150I

a = 0.410064 − 0.037156I

b = −1.96491 − 0.62190I

c = −0.232705 − 1.093810I

d = 0.32314 + 2.69669I

5.87256 + 4.40083I 6.74431 − 3.49859I

28

VI. I

v

1

= hc, d − 1, b, a − 1, v + 1i

(i) Arc colorings

a

3

=



1

0



a

8

=



−1

0



a

4

=



1

0



a

1

=



1

0



a

9

=



−1

0



a

2

=



1

0



a

5

=



1

0



a

10

=



0

1



a

7

=



−1



a

6

=



0

−1



a

11

=



1



a

11

=



1



(ii) Obstruction class = 1

(iii) Cusp Shapes = 12

29

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

, c

2

, c

3

c

4

, c

8

u

c

5

, c

9

u − 1

c

6

, c

7

, c

10

c

11

u + 1

30

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

, c

2

, c

3

c

4

, c

8

y

c

5

, c

6

, c

7

c

9

, c

10

, c

11

y −1

31

(vi) Complex Volumes and Cusp Shapes

Solutions to I

v

1

√

−1(vol +

√

−1CS) Cusp shape

v = −1.00000

a = 1.00000

b = 0

c = 0

d = 1.00000

3.28987 12.0000

32

VII. I

v

2

= ha, d, c − 1, b + 1, v − 1i

(i) Arc colorings

a

3

=



1

0



a

8

=



1

0



a

4

=



1

0



a

1

=



0

−1



a

9

=



1

0



a

2

=



1

−1



a

5

=



0

1



a

10

=



1

0



a

7

=



1

0



a

6

=



1

0



a

11

=



1

−1



a

11

=



1

−1



(ii) Obstruction class = 1

(iii) Cusp Shapes = 0

33

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

, c

10

, c

11

u − 1

c

2

, c

4

, c

5

u + 1

c

3

, c

6

, c

7

c

8

, c

9

u

34

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

, c

2

, c

4

c

5

, c

10

, c

11

y −1

c

3

, c

6

, c

7

c

8

, c

9

y

35

(vi) Complex Volumes and Cusp Shapes

Solutions to I

v

2

√

−1(vol +

√

−1CS) Cusp shape

v = 1.00000

a = 0

b = −1.00000

c = 1.00000

d = 0

0 0

36

VIII. I

v

3

= ha, d + 1, c − a, b + 1, v − 1i

(i) Arc colorings

a

3

=



1

0



a

8

=



1

0



a

4

=



1

0



a

1

=



0

−1



a

9

=



1

0



a

2

=



1

−1



a

5

=



0

1



a

10

=



0

−1



a

7

=



1



a

6

=



0

1



a

11

=



0

−1



a

11

=



0

−1



(ii) Obstruction class = 1

(iii) Cusp Shapes = 0

37

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

, c

9

u − 1

c

2

, c

4

, c

6

c

7

u + 1

c

3

, c

5

, c

8

c

10

, c

11

u

38

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

, c

2

, c

4

c

6

, c

7

, c

9

y −1

c

3

, c

5

, c

8

c

10

, c

11

y

39

(vi) Complex Volumes and Cusp Shapes

Solutions to I

v

3

√

−1(vol +

√

−1CS) Cusp shape

v = 1.00000

a = 0

b = −1.00000

c = 0

d = −1.00000

0 0

40

IX. I

v

4

= ha, da + c − 1, dv + 1, cv − a − v, b + 1i

(i) Arc colorings

a

3

=



1

0



a

8

=



v

0



a

4

=



1

0



a

1

=



0

−1



a

9

=



v

0



a

2

=



1

−1



a

5

=



0

1



a

10

=



1

d



a

7

=



v −1

−d



a

6

=



−1

−d



a

11

=



1

d − 1



a

11

=



1

d − 1



(ii) Obstruction class = −1

(iii) Cusp Shapes = d

2

+ v

2

+ 4

(iv) u-Polynomials at the component : It cannot be deﬁned for a positive

dimension component.

(v) Riley Polynomials at the component : It cannot be deﬁned for a positive

dimension component.

41

(iv) Complex Volumes and Cusp Shapes

Solution to I

v

4

√

−1(vol +

√

−1CS) Cusp shape

v = ···

a = ···

b = ···

c = ···

d = ···

1.64493 2.23718 − 0.09992I

42

X. u-Polynomials

Crossings u-Polynomials at each crossing

c

1

u(u − 1)

2

(u

5

+ u

4

− 2u

3

− u

2

+ u − 1)

· (u

7

− u

6

− u

5

+ 2u

4

+ u

3

− 2u

2

+ u + 1)

2

· (u

10

− u

9

− 2u

8

+ 4u

7

− 4u

5

+ 3u

4

+ u

3

− 2u

2

+ 1)

2

· (u

17

− 2u

16

+ ··· − 8u + 4)

c

2

u(u + 1)

2

(u

5

+ 5u

4

+ 8u

3

+ 3u

2

− u + 1)

· (u

7

+ 3u

6

+ 7u

5

+ 8u

4

+ 9u

3

+ 6u

2

+ 5u + 1)

2

· ((u

10

+ 5u

9

+ ··· + 4u + 1)

2

)(u

17

+ 6u

16

+ ··· + 88u + 16)

c

3

, c

8

u

3

(u

5

− u

4

+ 2u

3

− u

2

+ u − 1)

5

· ((u

7

+ 3u

6

+ ··· − 2u − 2)

2

)(u

17

− 2u

16

+ ··· − 4u

2

+ 8)

c

4

u(u + 1)

2

(u

5

+ u

4

− 2u

3

− u

2

+ u − 1)

· (u

7

− u

6

− u

5

+ 2u

4

+ u

3

− 2u

2

+ u + 1)

2

· (u

10

− u

9

− 2u

8

+ 4u

7

− 4u

5

+ 3u

4

+ u

3

− 2u

2

+ 1)

2

· (u

17

− 2u

16

+ ··· − 8u + 4)

c

5

, c

10

, c

11

u(u − 1)(u + 1)(u

5

+ u

4

− 2u

3

− u

2

+ u − 1)

3

· (u

10

− u

9

− 2u

8

+ 4u

7

− 4u

5

+ 3u

4

+ u

3

− 2u

2

+ 1)

· (u

14

+ u

13

+ ··· − 4u − 4)(u

17

+ 2u

16

+ ··· + 3u + 1)

c

6

, c

7

u(u + 1)

2

(u

5

+ u

4

− 2u

3

− u

2

+ u − 1)

3

· (u

10

− u

9

− 2u

8

+ 4u

7

− 4u

5

+ 3u

4

+ u

3

− 2u

2

+ 1)

· (u

14

+ u

13

+ ··· − 4u − 4)(u

17

+ 2u

16

+ ··· + 3u + 1)

c

9

u(u − 1)

2

(u

5

+ u

4

− 2u

3

− u

2

+ u − 1)

3

· (u

10

− u

9

− 2u

8

+ 4u

7

− 4u

5

+ 3u

4

+ u

3

− 2u

2

+ 1)

· (u

14

+ u

13

+ ··· − 4u − 4)(u

17

+ 2u

16

+ ··· + 3u + 1)

43

XI. Riley Polynomials

Crossings Riley Polynomials at each crossing

c

1

, c

4

y(y − 1)

2

(y

5

− 5y

4

+ 8y

3

− 3y

2

− y −1)

· (y

7

− 3y

6

+ 7y

5

− 8y

4

+ 9y

3

− 6y

2

+ 5y − 1)

2

· ((y

10

− 5y

9

+ ··· − 4y + 1)

2

)(y

17

− 6y

16

+ ··· + 88y −16)

c

2

y(y − 1)

2

(y

5

− 9y

4

+ 32y

3

− 35y

2

− 5y −1)

· (y

7

+ 5y

6

+ 19y

5

+ 36y

4

+ 49y

3

+ 38y

2

+ 13y −1)

2

· (y

10

− y

9

− 6y

7

+ 22y

6

+ 6y

5

+ 45y

4

+ 15y

3

+ 22y

2

+ 4y + 1)

2

· (y

17

+ 10y

16

+ ··· + 288y −256)

c

3

, c

8

y

3

(y

5

+ 3y

4

+ 4y

3

+ y

2

− y −1)

5

· (y

7

+ 3y

6

+ 4y

5

+ y

4

− y

3

+ 7y

2

+ 8y −4)

2

· (y

17

+ 6y

16

+ ··· + 64y −64)

c

5

, c

6

, c

7

c

9

, c

10

, c

11

y(y − 1)

2

(y

5

− 5y

4

+ ··· − y −1)

3

(y

10

− 5y

9

+ ··· − 4y + 1)

· (y

14

− 11y

13

+ ··· − 40y + 16)(y

17

− 20y

16

+ ··· + 27y −1)

44