12n

0602

(K12n

0602

)

A knot diagram

1

Linearized knot diagam

3 7 9 8 10 2 12 4 6 5 7 8

Solving Sequence

3,9 4,7

2 1 6 10 8 5 12 11

c

3

c

2

c

1

c

6

c

9

c

8

c

4

c

12

c

11

c

5

, c

7

, c

10

Ideals for irreducible components

2

of X

par

I

u

1

= h−u

9

− 3u

8

− 7u

7

− 10u

6

− 9u

5

+ 2u

4

+ 5u

3

+ 11u

2

+ 8b − 6u − 2,

u

8

+ 5u

6

− u

5

+ 6u

4

− 2u

3

+ u

2

+ 4a + 2u − 2, u

10

+ 6u

8

− 3u

7

+ 11u

6

− 13u

5

+ 9u

4

− 12u

3

+ 7u

2

+ 2i

I

u

2

= h−937u

13

− 2472u

12

+ ··· + 1987b − 6836, 12531u

13

+ 27338u

12

+ ··· + 19870a + 85927,

u

14

+ 3u

13

+ ··· + 22u + 5i

I

u

3

= h−u

4

a − u

2

a − u

3

− au + b + a − u − 1,

− 2u

5

a − 2u

4

a + u

5

− 6u

3

a + u

4

− 6u

2

a + 2u

3

+ 2a

2

− 6au + 3u

2

− 6a + u + 3,

u

6

+ 3u

4

+ u

3

+ 2u

2

+ 2u − 1i

I

u

4

= h2u

9

a + 10u

9

+ ··· + 7a + 1, −2u

9

+ 3u

8

+ ··· + a

2

− 4, u

10

− u

9

+ 4u

8

− 4u

7

+ 6u

6

− 6u

5

+ 3u

4

− 3u

3

+ 1i

I

u

5

= hb − 1, 6a − u − 3, u

2

+ 3i

I

u

6

= hb − u, 2a + u + 1, u

2

+ 1i

I

v

1

= ha, b − 1, v + 1i

* 7 irreducible components of dim

C

= 0, with total 61 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

= h−u

9

− 3u

8

+ · · · + 8b − 2, u

8

+ 5u

6

− u

5

+ 6u

4

− 2u

3

+ u

2

+ 4a +

2u − 2, u

10

+ 6u

8

+ · · · + 7u

2

+ 2i

(i) Arc colorings

a

3

=



1

0



a

9

=



0

u



a

4

=



1

−u

2



a

7

=



−

1

4

u

8

−

5

4

u

6

+ ··· −

1

2

u +

1

2

1

8

u

9

+

3

8

u

8

+ ··· +

3

4

u +

1

4



a

2

=



−

1

4

u

8

−

5

4

u

6

+ ··· −

1

2

u +

1

2

−

3

8

u

9

+

3

8

u

8

+ ··· −

5

4

u +

1

4



a

1

=



−

3

8

u

9

+

1

8

u

8

+ ··· −

7

4

u +

3

4

−

3

8

u

9

+

3

8

u

8

+ ··· −

5

4

u +

1

4



a

6

=



1

2

u

9

+

1

2

u

8

+ ··· + u + 1



a

10

=



u

1

2

u

9

−

1

2

u

8

+ ··· + 2u − 1



a

8

=



−u

u

3

+ u



a

5

=



u

2

+ 1

−u

4

− 2u

2



a

12

=



1

4

u

8

+

5

4

u

6

+ ··· −

3

2

u +

1

2

−

1

8

u

9

+

1

8

u

8

+ ··· −

3

4

u +

3

4



a

11

=



−u

3

− 2u

−

1

2

u

9

+

1

2

u

8

+ ··· − 2u + 1



(ii) Obstruction class = −1

(iii) Cusp Shapes =

3

2

u

9

−

1

2

u

8

+

17

2

u

7

− 8u

6

+

25

2

u

5

− 25u

4

+

17

2

u

3

−

27

2

u

2

+ 13u + 1

2

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

u

10

+ u

9

+ 2u

8

− 3u

7

+ 12u

6

+ 24u

5

+ 46u

4

+ 37u

3

+ 7u

2

− 3u + 4

c

2

, c

6

, c

7

c

11

, c

12

u

10

− 3u

9

+ 4u

8

− u

7

− 4u

6

+ 6u

5

− 3u

3

+ u

2

+ u + 2

c

3

, c

4

, c

5

c

8

, c

9

, c

10

u

10

+ 6u

8

+ 3u

7

+ 11u

6

+ 13u

5

+ 9u

4

+ 12u

3

+ 7u

2

+ 2

3

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

y

10

+ 3y

9

+ ··· + 47y + 16

c

2

, c

6

, c

7

c

11

, c

12

y

10

− y

9

+ 2y

8

+ 3y

7

+ 12y

6

− 24y

5

+ 46y

4

− 37y

3

+ 7y

2

+ 3y + 4

c

3

, c

4

, c

5

c

8

, c

9

, c

10

y

10

+ 12y

9

+ ··· + 28y + 4

4

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

1

√

−1(vol +

√

−1CS) Cusp shape

u = 0.849669 + 0.278925I

a = 0.126908 − 1.402190I

b = −0.935978 + 0.707374I

2.59736 + 5.48528I 0.63906 − 6.67204I

u = 0.849669 − 0.278925I

a = 0.126908 + 1.402190I

b = −0.935978 − 0.707374I

2.59736 − 5.48528I 0.63906 + 6.67204I

u = −0.179655 + 1.191160I

a = 0.250838 − 0.636140I

b = −0.46356 + 1.36046I

−2.21767 − 1.59735I −7.51312 + 4.64580I

u = −0.179655 − 1.191160I

a = 0.250838 + 0.636140I

b = −0.46356 − 1.36046I

−2.21767 + 1.59735I −7.51312 − 4.64580I

u = −0.44148 + 1.44610I

a = −0.552527 + 1.275850I

b = −1.28583 − 0.66001I

−8.2686 − 15.1646I −7.51854 + 8.25672I

u = −0.44148 − 1.44610I

a = −0.552527 − 1.275850I

b = −1.28583 + 0.66001I

−8.2686 + 15.1646I −7.51854 − 8.25672I

u = −0.171957 + 0.454648I

a = 0.655512 − 0.286314I

b = 0.281118 + 0.559566I

0.087563 − 1.088810I 1.48967 + 6.22992I

u = −0.171957 − 0.454648I

a = 0.655512 + 0.286314I

b = 0.281118 − 0.559566I

0.087563 + 1.088810I 1.48967 − 6.22992I

u = −0.05658 + 1.78531I

a = 0.519269 + 0.055233I

b = 0.904241 − 0.202548I

−16.0502 + 0.8822I −5.09706 − 8.51458I

u = −0.05658 − 1.78531I

a = 0.519269 − 0.055233I

b = 0.904241 + 0.202548I

−16.0502 − 0.8822I −5.09706 + 8.51458I

5

II. I

u

2

= h−937u

13

− 2472u

12

+ · · · + 1987b − 6836, 12531u

13

+ 27338u

12

+

· · · + 19870a + 85927, u

14

+ 3u

13

+ · · · + 22u + 5i

(i) Arc colorings

a

3

=



1

0



a

9

=



0

u



a

4

=



1

−u

2



a

7

=



−0.630649u

13

− 1.37584u

12

+ ··· − 15.3917u − 4.32446

0.471565u

13

+ 1.24409u

12

+ ··· + 9.17765u + 3.44036



a

2

=



0.253296u

13

+ 0.379668u

12

+ ··· + 0.855511u + 0.00558631

−0.425264u

13

− 0.827378u

12

+ ··· − 8.90941u − 2.81228



a

1

=



−0.171968u

13

− 0.447710u

12

+ ··· − 8.05390u − 2.80669

−0.425264u

13

− 0.827378u

12

+ ··· − 8.90941u − 2.81228



a

6

=



−0.693105u

13

− 1.63795u

12

+ ··· − 20.3068u − 6.28908

0.351787u

13

+ 1.16608u

12

+ ··· + 6.24459u + 3.20684



a

10

=



−0.241369u

13

− 0.372320u

12

+ ··· − 0.359235u + 0.934474

0.330649u

13

+ 0.975843u

12

+ ··· + 16.4917u + 5.22446



a

8

=



−u

u

3

+ u



a

5

=



u

2

+ 1

−u

4

− 2u

2



a

12

=



−0.342577u

13

− 0.983191u

12

+ ··· − 14.9880u − 5.16452

−0.112733u

13

− 0.0145949u

12

+ ··· − 3.34877u − 0.572723



a

11

=



−0.0892803u

13

− 0.603523u

12

+ ··· − 14.1325u − 6.15893

−0.537997u

13

− 0.841973u

12

+ ··· − 12.2582u − 3.38500



(ii) Obstruction class = −1

(iii) Cusp Shapes =

2058

1987

u

13

+

6600

1987

u

12

+ ··· +

37538

1987

u +

12194

1987

6

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

(u

7

+ 3u

6

+ 7u

5

+ 8u

4

+ 9u

3

+ 6u

2

+ 5u + 1)

2

c

2

, c

6

, c

7

c

11

, c

12

(u

7

+ u

6

− u

5

− 2u

4

+ u

3

+ 2u

2

+ u − 1)

2

c

3

, c

4

, c

5

c

8

, c

9

, c

10

u

14

− 3u

13

+ ··· − 22u + 5

7

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

(y

7

+ 5y

6

+ 19y

5

+ 36y

4

+ 49y

3

+ 38y

2

+ 13y −1)

2

c

2

, c

6

, c

7

c

11

, c

12

(y

7

− 3y

6

+ 7y

5

− 8y

4

+ 9y

3

− 6y

2

+ 5y −1)

2

c

3

, c

4

, c

5

c

8

, c

9

, c

10

y

14

+ 11y

13

+ ··· − 4y + 25

8

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

2

√

−1(vol +

√

−1CS) Cusp shape

u = 0.370785 + 0.946704I

a = −0.209881 − 0.303567I

b = 0.597306 + 0.773845I

0.562491 − 0.955395I 0.68929 + 2.37083I

u = 0.370785 − 0.946704I

a = −0.209881 + 0.303567I

b = 0.597306 − 0.773845I

0.562491 + 0.955395I 0.68929 − 2.37083I

u = −1.022710 + 0.247588I

a = −0.520411 − 1.220230I

b = 1.139460 + 0.630170I

−2.92618 − 9.93065I −4.46028 + 7.33664I

u = −1.022710 − 0.247588I

a = −0.520411 + 1.220230I

b = 1.139460 − 0.630170I

−2.92618 + 9.93065I −4.46028 − 7.33664I

u = 0.306472 + 1.132160I

a = −0.482637 − 0.675154I

b = −0.502855

−4.24127 −5.93921 + 0.I

u = 0.306472 − 1.132160I

a = −0.482637 + 0.675154I

b = −0.502855

−4.24127 −5.93921 + 0.I

u = −0.736932 + 1.071510I

a = 0.318588 − 0.053278I

b = −0.985336 + 0.506466I

−5.38528 + 3.93070I −6.25941 − 4.87230I

u = −0.736932 − 1.071510I

a = 0.318588 + 0.053278I

b = −0.985336 − 0.506466I

−5.38528 − 3.93070I −6.25941 + 4.87230I

u = −0.538570 + 0.272073I

a = 0.71818 − 1.43908I

b = 0.597306 + 0.773845I

0.562491 − 0.955395I 0.68929 + 2.37083I

u = −0.538570 − 0.272073I

a = 0.71818 + 1.43908I

b = 0.597306 − 0.773845I

0.562491 + 0.955395I 0.68929 − 2.37083I

9

Solutions to I

u

2

√

−1(vol +

√

−1CS) Cusp shape

u = 0.36817 + 1.45006I

a = 0.797752 + 1.077130I

b = 1.139460 − 0.630170I

−2.92618 + 9.93065I −4.46028 − 7.33664I

u = 0.36817 − 1.45006I

a = 0.797752 − 1.077130I

b = 1.139460 + 0.630170I

−2.92618 − 9.93065I −4.46028 + 7.33664I

u = −0.24721 + 1.49766I

a = −0.921588 + 0.632363I

b = −0.985336 − 0.506466I

−5.38528 − 3.93070I −6.25941 + 4.87230I

u = −0.24721 − 1.49766I

a = −0.921588 − 0.632363I

b = −0.985336 + 0.506466I

−5.38528 + 3.93070I −6.25941 − 4.87230I

10

III. I

u

3

= h−u

4

a − u

2

a − u

3

− au + b + a − u − 1, −2u

5

a + u

5

+ · · · − 6a +

3, u

6

+ 3u

4

+ u

3

+ 2u

2

+ 2u − 1i

(i) Arc colorings

a

3

=



1

0



a

9

=



0

u



a

4

=



1

−u

2



a

7

=



a

u

4

a + u

2

a + u

3

+ au − a + u + 1



a

2

=



a

u

5

a + 2u

3

a + u

2

a − u

3

− u − 1



a

1

=



u

5

a + 2u

3

a + u

2

a − u

3

+ a − u − 1

u

5

a + 2u

3

a + u

2

a − u

3

− u − 1



a

6

=



1

u

5

+ u

4

+ 2u

3

+ 2u

2

+ u − 1



a

10

=



u

5

− u

4

+ u

3

− u

2

− 2u + 1



a

8

=



−u

u

3

+ u



a

5

=



u

2

+ 1

−u

4

− 2u

2



a

12

=



u

3

a − u

3

+ au + a − 2u − 1

−1



a

11

=



−u

3

− 2u

u

4

+ u

3

+ u

2

+ 2u − 1



(ii) Obstruction class = −1

(iii) Cusp Shapes = 4u

5

+ 4u

4

+ 8u

3

+ 12u

2

+ 4u + 2

11

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

u

12

+ 7u

11

+ ··· + 438u + 169

c

2

, c

6

, c

7

c

11

, c

12

u

12

− 3u

11

+ ··· + 42u − 13

c

3

, c

4

, c

5

c

8

, c

9

, c

10

(u

6

+ 3u

4

− u

3

+ 2u

2

− 2u − 1)

2

12

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

y

12

− 3y

11

+ ··· − 59686y + 28561

c

2

, c

6

, c

7

c

11

, c

12

y

12

− 7y

11

+ ··· − 438y + 169

c

3

, c

4

, c

5

c

8

, c

9

, c

10

(y

6

+ 6y

5

+ 13y

4

+ 9y

3

− 6y

2

− 8y + 1)

2

13

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

3

√

−1(vol +

√

−1CS) Cusp shape

u = −0.841864

a = 0.445035 + 1.177780I

b = −0.719261 − 0.742974I

3.23778 2.68180

u = −0.841864

a = 0.445035 − 1.177780I

b = −0.719261 + 0.742974I

3.23778 2.68180

u = −0.126468 + 1.352400I

a = −0.034921 + 1.148040I

b = −1.026470 − 0.870245I

−11.65360 − 3.39374I −10.36018 + 3.51762I

u = −0.126468 + 1.352400I

a = 0.383840 + 0.027542I

b = 1.59190 − 0.18598I

−11.65360 − 3.39374I −10.36018 + 3.51762I

u = −0.126468 − 1.352400I

a = −0.034921 − 1.148040I

b = −1.026470 + 0.870245I

−11.65360 + 3.39374I −10.36018 − 3.51762I

u = −0.126468 − 1.352400I

a = 0.383840 − 0.027542I

b = 1.59190 + 0.18598I

−11.65360 + 3.39374I −10.36018 − 3.51762I

u = 0.376468 + 1.319680I

a = −0.443330 − 1.186910I

b = −1.27617 + 0.73937I

−5.05799 + 8.77346I −5.56216 − 5.90094I

u = 0.376468 + 1.319680I

a = 0.392175 + 0.613857I

b = −0.260915 − 1.156860I

−5.05799 + 8.77346I −5.56216 − 5.90094I

u = 0.376468 − 1.319680I

a = −0.443330 + 1.186910I

b = −1.27617 − 0.73937I

−5.05799 − 8.77346I −5.56216 + 5.90094I

u = 0.376468 − 1.319680I

a = 0.392175 − 0.613857I

b = −0.260915 + 1.156860I

−5.05799 − 8.77346I −5.56216 + 5.90094I

14

Solutions to I

u

3

√

−1(vol +

√

−1CS) Cusp shape

u = 0.341865

a = 0.468459

b = 1.13466

−2.71328 5.16290

u = 0.341865

a = 4.04594

b = −0.752839

−2.71328 5.16290

15

IV.

I

u

4

= h2u

9

a+10u

9

+· · ·+7a+1, −2u

9

+3u

8

+· · ·+a

2

−4, u

10

−u

9

+· · ·−3u

3

+1i

(i) Arc colorings

a

3

=



1

0



a

9

=



0

u



a

4

=



1

−u

2



a

7

=



a

−0.117647au

9

− 0.588235u

9

+ ··· − 0.411765a − 0.0588235



a

2

=



−0.588235au

9

+ 0.0588235u

9

+ ··· − 0.0588235a + 2.70588

0.176471au

9

− 0.117647u

9

+ ··· + 0.117647a − 1.41176



a

1

=



−0.411765au

9

− 0.0588235u

9

+ ··· + 0.0588235a + 1.29412

0.176471au

9

− 0.117647u

9

+ ··· + 0.117647a − 1.41176



a

6

=



−u

9

− 4u

7

− 5u

5

+ 3u

u

9

+ 3u

7

+ 3u

5

− u



a

10

=



2u

9

− u

8

+ 8u

7

− 5u

6

+ 12u

5

− 9u

4

+ 6u

3

− 6u

2

− u − 1

−2u

9

+ u

8

− 8u

7

+ 4u

6

− 12u

5

+ 6u

4

− 5u

3

+ 4u

2

+ 3u + 2



a

8

=



−u

u

3

+ u



a

5

=



u

2

+ 1

−u

4

− 2u

2



a

12

=



−0.588235au

9

+ 0.0588235u

9

+ ··· − 0.0588235a + 0.705882

−1



a

11

=



u

6

+ 3u

4

+ 2u

2

− 1

−u

6

− 2u

4

− u

2



(ii) Obstruction class = −1

(iii) Cusp Shapes = −4u

9

− 12u

7

− 12u

5

+ 4u

3

+ 8u − 2

16

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

(u

10

+ 5u

9

+ ··· + 4u + 1)

2

c

2

, c

6

, c

7

c

11

, c

12

(u

10

+ u

9

− 2u

8

− 4u

7

+ 4u

5

+ 3u

4

− u

3

− 2u

2

+ 1)

2

c

3

, c

4

, c

5

c

8

, c

9

, c

10

(u

10

+ u

9

+ 4u

8

+ 4u

7

+ 6u

6

+ 6u

5

+ 3u

4

+ 3u

3

+ 1)

2

17

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

(y

10

− y

9

− 6y

7

+ 22y

6

+ 6y

5

+ 45y

4

+ 15y

3

+ 22y

2

+ 4y + 1)

2

c

2

, c

6

, c

7

c

11

, c

12

(y

10

− 5y

9

+ ··· − 4y + 1)

2

c

3

, c

4

, c

5

c

8

, c

9

, c

10

(y

10

+ 7y

9

+ 20y

8

+ 26y

7

+ 6y

6

− 22y

5

− 19y

4

+ 3y

3

+ 6y

2

+ 1)

2

18

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

4

√

−1(vol +

√

−1CS) Cusp shape

u = 0.839548 + 0.070481I

a = −0.900079 + 0.957609I

b = 1.018500 − 0.644891I

−0.70717 + 4.40083I −1.25569 − 3.49859I

u = 0.839548 + 0.070481I

a = 0.01855 − 1.45994I

b = 0.400287 + 0.864056I

−0.70717 + 4.40083I −1.25569 − 3.49859I

u = 0.839548 − 0.070481I

a = −0.900079 − 0.957609I

b = 1.018500 + 0.644891I

−0.70717 − 4.40083I −1.25569 + 3.49859I

u = 0.839548 − 0.070481I

a = 0.01855 + 1.45994I

b = 0.400287 − 0.864056I

−0.70717 − 4.40083I −1.25569 + 3.49859I

u = 0.090539 + 1.215350I

a = −1.57349 + 0.24896I

b = −1.236040 − 0.156723I

−6.25064 + 1.53058I −5.48489 − 4.43065I

u = 0.090539 + 1.215350I

a = 0.23726 + 1.84586I

b = 0.926127 − 0.393188I

−6.25064 + 1.53058I −5.48489 − 4.43065I

u = 0.090539 − 1.215350I

a = −1.57349 − 0.24896I

b = −1.236040 + 0.156723I

−6.25064 − 1.53058I −5.48489 + 4.43065I

u = 0.090539 − 1.215350I

a = 0.23726 − 1.84586I

b = 0.926127 + 0.393188I

−6.25064 − 1.53058I −5.48489 + 4.43065I

u = 0.383413 + 1.200420I

a = −0.734177 − 0.829669I

b = −0.608868 + 0.334904I

−4.17865 −4.51886 + 0.I

u = 0.383413 + 1.200420I

a = −0.073892 − 0.370754I

b = −0.608868 − 0.334904I

−4.17865 −4.51886 + 0.I

19

Solutions to I

u

4

√

−1(vol +

√

−1CS) Cusp shape

u = 0.383413 − 1.200420I

a = −0.734177 + 0.829669I

b = −0.608868 − 0.334904I

−4.17865 −4.51886 + 0.I

u = 0.383413 − 1.200420I

a = −0.073892 + 0.370754I

b = −0.608868 + 0.334904I

−4.17865 −4.51886 + 0.I

u = −0.383851 + 1.270630I

a = 0.614423 − 1.130320I

b = 1.018500 + 0.644891I

−0.70717 − 4.40083I −1.25569 + 3.49859I

u = −0.383851 + 1.270630I

a = −0.272551 + 0.291529I

b = 0.400287 − 0.864056I

−0.70717 − 4.40083I −1.25569 + 3.49859I

u = −0.383851 − 1.270630I

a = 0.614423 + 1.130320I

b = 1.018500 − 0.644891I

−0.70717 + 4.40083I −1.25569 − 3.49859I

u = −0.383851 − 1.270630I

a = −0.272551 − 0.291529I

b = 0.400287 + 0.864056I

−0.70717 + 4.40083I −1.25569 − 3.49859I

u = −0.429649 + 0.392970I

a = 1.58670 − 1.31909I

b = −1.236040 + 0.156723I

−6.25064 − 1.53058I −5.48489 + 4.43065I

u = −0.429649 + 0.392970I

a = −2.40274 − 2.38405I

b = 0.926127 + 0.393188I

−6.25064 − 1.53058I −5.48489 + 4.43065I

u = −0.429649 − 0.392970I

a = 1.58670 + 1.31909I

b = −1.236040 − 0.156723I

−6.25064 + 1.53058I −5.48489 − 4.43065I

u = −0.429649 − 0.392970I

a = −2.40274 + 2.38405I

b = 0.926127 − 0.393188I

−6.25064 + 1.53058I −5.48489 − 4.43065I

20

V. I

u

5

= hb − 1, 6a − u − 3, u

2

+ 3i

(i) Arc colorings

a

3

=



1

0



a

9

=



0

u



a

4

=



1

3



a

7

=



1

6

u +

1

2

1



a

2

=



−

1

6

u +

1

2

−1



a

1

=



−

1

6

u −

1

2

−1



a

6

=



1

0



a

10

=



u



a

8

=



−u

−2u



a

5

=



−2

−3



a

12

=



−

7

6

u −

1

2

−2u − 1



a

11

=



−u

−2u



(ii) Obstruction class = 1

(iii) Cusp Shapes = −12

21

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

, c

2

, c

7

(u − 1)

2

c

3

, c

4

, c

5

c

8

, c

9

, c

10

u

2

+ 3

c

6

, c

11

, c

12

(u + 1)

2

22

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

, c

2

, c

6

c

7

, c

11

, c

12

(y −1)

2

c

3

, c

4

, c

5

c

8

, c

9

, c

10

(y + 3)

2

23

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

5

√

−1(vol +

√

−1CS) Cusp shape

u = 1.73205I

a = 0.500000 + 0.288675I

b = 1.00000

−16.4493 −12.0000

u = − 1.73205I

a = 0.500000 − 0.288675I

b = 1.00000

−16.4493 −12.0000

24

VI. I

u

6

= hb − u, 2a + u + 1, u

2

+ 1i

(i) Arc colorings

a

3

=



1

0



a

9

=



0

u



a

4

=



1



a

7

=



−

1

2

u −

1

2

u



a

2

=



1

2

u +

1

2

1



a

1

=



1

2

u +

3

2

1



a

6

=



−1

2u



a

10

=



u

u + 2



a

8

=



−u

0



a

5

=



0

1



a

12

=



1

2

u +

1

2

1



a

11

=



u

2



(ii) Obstruction class = 1

(iii) Cusp Shapes = −4

25

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

c

1

(u + 1)

2

c

2

, c

3

, c

4

c

5

, c

6

, c

7

c

8

, c

9

, c

10

c

11

, c

12

u

2

+ 1

26

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

(y −1)

2

c

2

, c

3

, c

4

c

5

, c

6

, c

7

c

8

, c

9

, c

10

c

11

, c

12

(y + 1)

2

27

(vi) Complex Volumes and Cusp Shapes

Solutions to I

u

6

√

−1(vol +

√

−1CS) Cusp shape

u = 1.000000I

a = −0.500000 − 0.500000I

b = 1.000000I

−1.64493 −4.00000

u = − 1.000000I

a = −0.500000 + 0.500000I

b = − 1.000000I

−1.64493 −4.00000

28

VII. I

v

1

= ha, b − 1, v + 1i

(i) Arc colorings

a

3

=



1

0



a

9

=



−1

0



a

4

=



1

0



a

7

=



0

1



a

2

=



1

−1



a

1

=



0

−1



a

6

=



1

0



a

10

=



−1

0



a

8

=



−1

0



a

5

=



1

0



a

12

=



−1



a

11

=



−1

0



(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

7

u − 1

c

3

, c

4

, c

5

c

8

, c

9

, c

10

u

c

6

, c

11

, c

12

u + 1

30

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

c

1

, c

2

, c

6

c

7

, c

11

, c

12

y −1

c

3

, c

4

, c

5

c

8

, c

9

, c

10

y

31

(vi) Complex Volumes and Cusp Shapes

Solutions to I

v

1

√

−1(vol +

√

−1CS) Cusp shape

v = −1.00000

a = 0

b = 1.00000

−3.28987 −12.0000

32

VIII. u-Polynomials

Crossings u-Polynomials at each crossing

c

1

(u − 1)

3

(u + 1)

2

(u

7

+ 3u

6

+ 7u

5

+ 8u

4

+ 9u

3

+ 6u

2

+ 5u + 1)

2

· (u

10

+ u

9

+ 2u

8

− 3u

7

+ 12u

6

+ 24u

5

+ 46u

4

+ 37u

3

+ 7u

2

− 3u + 4)

· ((u

10

+ 5u

9

+ ··· + 4u + 1)

2

)(u

12

+ 7u

11

+ ··· + 438u + 169)

c

2

, c

7

(u − 1)

3

(u

2

+ 1)(u

7

+ u

6

− u

5

− 2u

4

+ u

3

+ 2u

2

+ u − 1)

2

· (u

10

− 3u

9

+ 4u

8

− u

7

− 4u

6

+ 6u

5

− 3u

3

+ u

2

+ u + 2)

· (u

10

+ u

9

− 2u

8

− 4u

7

+ 4u

5

+ 3u

4

− u

3

− 2u

2

+ 1)

2

· (u

12

− 3u

11

+ ··· + 42u − 13)

c

3

, c

4

, c

5

c

8

, c

9

, c

10

u(u

2

+ 1)(u

2

+ 3)(u

6

+ 3u

4

− u

3

+ 2u

2

− 2u − 1)

2

· (u

10

+ 6u

8

+ 3u

7

+ 11u

6

+ 13u

5

+ 9u

4

+ 12u

3

+ 7u

2

+ 2)

· (u

10

+ u

9

+ 4u

8

+ 4u

7

+ 6u

6

+ 6u

5

+ 3u

4

+ 3u

3

+ 1)

2

· (u

14

− 3u

13

+ ··· − 22u + 5)

c

6

, c

11

, c

12

(u + 1)

3

(u

2

+ 1)(u

7

+ u

6

− u

5

− 2u

4

+ u

3

+ 2u

2

+ u − 1)

2

· (u

10

− 3u

9

+ 4u

8

− u

7

− 4u

6

+ 6u

5

− 3u

3

+ u

2

+ u + 2)

· (u

10

+ u

9

− 2u

8

− 4u

7

+ 4u

5

+ 3u

4

− u

3

− 2u

2

+ 1)

2

· (u

12

− 3u

11

+ ··· + 42u − 13)

33

IX. Riley Polynomials

Crossings Riley Polynomials at each crossing

c

1

(y −1)

5

(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

10

+ 3y

9

+ ··· + 47y + 16)(y

12

− 3y

11

+ ··· − 59686y + 28561)

c

2

, c

6

, c

7

c

11

, c

12

(y −1)

3

(y + 1)

2

(y

7

− 3y

6

+ 7y

5

− 8y

4

+ 9y

3

− 6y

2

+ 5y −1)

2

· (y

10

− 5y

9

+ ··· − 4y + 1)

2

· (y

10

− y

9

+ 2y

8

+ 3y

7

+ 12y

6

− 24y

5

+ 46y

4

− 37y

3

+ 7y

2

+ 3y + 4)

· (y

12

− 7y

11

+ ··· − 438y + 169)

c

3

, c

4

, c

5

c

8

, c

9

, c

10

y(y + 1)

2

(y + 3)

2

(y

6

+ 6y

5

+ 13y

4

+ 9y

3

− 6y

2

− 8y + 1)

2

· (y

10

+ 7y

9

+ 20y

8

+ 26y

7

+ 6y

6

− 22y

5

− 19y

4

+ 3y

3

+ 6y

2

+ 1)

2

· (y

10

+ 12y

9

+ ··· + 28y + 4)(y

14

+ 11y

13

+ ··· − 4y + 25)

34