11n

(K11n

)

A knot diagram

Linearized knot diagam

4 1 6 2 10 4 5 11 6 8 9

Solving Sequence

5,10 2,6

4 7 8 1 3 9 11

, c

Ideals for irreducible components

of X

par

= h6.49349 × 10

+ 1.90286 × 10

+ ··· + 6.31630 × 10

b − 6.60130 × 10

− 1.10262 × 10

− 1.96649 × 10

+ ··· + 1.26326 × 10

a − 2.28561 × 10

+ 2u

+ ··· + 20u + 8i

= hb + 1, u

+ u

+ a − u + 1, u

+ u

+ 2u

+ u

+ u + 1i

= ha, −v

+ b + 3v + 1, v

− 2v

− 3v −1i

* 3 irreducible components of dim

= 0, with total 36 representations.

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).

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

in decimal forms when there is not enough margin.

I. I

= h6.49 × 10

+ 1.90 × 10

+ · · · + 6.32 × 10

b − 6.60 ×

, −1.10 × 10

− 1.97 × 10

+ · · · + 1.26 × 10

a − 2.29 ×

, u

+ 2u

+ · · · + 20u + 8i

(i) Arc colorings











0.872833u

+ 1.55668u

+ ··· − 6.74875u + 18.0929

−0.102805u

− 0.301262u

+ ··· + 5.99581u + 1.04512









0.748842u

+ 1.32169u

+ ··· − 4.76990u + 17.3225

0.236809u

+ 0.571914u

+ ··· − 10.8084u − 2.70142





0.212982u

+ 0.380557u

+ ··· − 3.15104u + 3.02347

−0.0259598u

− 0.0939752u

+ ··· + 1.35732u + 1.55242





0.187022u

+ 0.286582u

+ ··· − 1.79372u + 4.57588

−0.0259598u

− 0.0939752u

+ ··· + 1.35732u + 1.55242





0.212982u

+ 0.380557u

+ ··· − 3.15104u + 3.02347

0.0387264u

+ 0.130165u

+ ··· − 2.15306u − 1.18917





0.902672u

+ 1.78001u

+ ··· − 13.1074u + 13.2132

0.300350u

+ 0.747310u

+ ··· − 15.0523u − 3.90671





+ u





0.216279u

+ 0.376927u

+ ··· − 2.89799u + 3.72316

0.0537576u

+ 0.145064u

+ ··· − 1.72187u − 0.407669





0.216279u

+ 0.376927u

+ ··· − 2.89799u + 3.72316

0.0537576u

+ 0.145064u

+ ··· − 1.72187u − 0.407669



(ii) Obstruction class = −1

(iii) Cusp Shapes =

10054887119174523839900746713

6316300717618506105858780668

3421814896803148511487522420

1579075179404626526464695167

··· +

38462222224803397140841081069

3158150358809253052929390334

u +

73867545823191868965381639557

1579075179404626526464695167

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

− 7u

+ ··· − 5u + 1

+ 5u

+ ··· − 3u + 1

, c

− 2u

+ ··· − 24u

− 32

, c

+ 2u

+ ··· + 20u + 8

+ 3u

+ ··· − u − 1

, c

+ 5u

+ ··· − 8u − 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

− 5y

+ ··· + 3y + 1

+ 43y

+ ··· + 3y + 1

, c

+ 36y

+ ··· + 1536y + 1024

, c

+ 24y

+ ··· − 848y + 64

− 37y

+ ··· − 35y + 1

, c

− 31y

+ ··· − 128y + 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.502386 + 0.824854I

a = 0.823470 + 0.487809I

b = 0.414733 − 0.266521I

−0.04395 + 1.99045I −0.01306 − 4.61620I

u = −0.502386 − 0.824854I

a = 0.823470 − 0.487809I

b = 0.414733 + 0.266521I

−0.04395 − 1.99045I −0.01306 + 4.61620I

u = −0.011679 + 0.922740I

a = 0.91458 − 1.21166I

b = −0.220238 + 0.502777I

1.30841 + 1.56433I 2.39227 − 4.63205I

u = −0.011679 − 0.922740I

a = 0.91458 + 1.21166I

b = −0.220238 − 0.502777I

1.30841 − 1.56433I 2.39227 + 4.63205I

u = 0.841010 + 0.306823I

a = 0.495652 − 0.321293I

b = 0.136281 − 0.404052I

2.62794 + 0.46347I 2.20728 + 0.53901I

u = 0.841010 − 0.306823I

a = 0.495652 + 0.321293I

b = 0.136281 + 0.404052I

2.62794 − 0.46347I 2.20728 − 0.53901I

u = 0.456033 + 1.080380I

a = 0.760375 − 0.367537I

b = 0.744635 + 0.318856I

4.82268 − 5.10002I 4.96882 + 7.61668I

u = 0.456033 − 1.080380I

a = 0.760375 + 0.367537I

b = 0.744635 − 0.318856I

4.82268 + 5.10002I 4.96882 − 7.61668I

u = 0.639311 + 0.009558I

a = 0.530838 + 0.374755I

b = 0.894453 − 0.824309I

3.90340 + 3.06304I −6.04954 − 3.66902I

u = 0.639311 − 0.009558I

a = 0.530838 − 0.374755I

b = 0.894453 + 0.824309I

3.90340 − 3.06304I −6.04954 + 3.66902I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.100025 + 0.630262I

a = 0.34419 + 2.12537I

b = −1.051400 − 0.149533I

−1.169040 − 0.736496I −2.56323 − 2.93619I

u = 0.100025 − 0.630262I

a = 0.34419 − 2.12537I

b = −1.051400 + 0.149533I

−1.169040 + 0.736496I −2.56323 + 2.93619I

u = −0.09653 + 1.44384I

a = −0.313167 − 0.868043I

b = −1.322620 + 0.396919I

5.47968 + 1.56446I 1.30115 − 0.62804I

u = −0.09653 − 1.44384I

a = −0.313167 + 0.868043I

b = −1.322620 − 0.396919I

5.47968 − 1.56446I 1.30115 + 0.62804I

u = 0.11027 + 1.45639I

a = −0.590568 + 1.231490I

b = 0.95494 − 1.07229I

9.13873 + 0.66915I 1.241168 + 0.226691I

u = 0.11027 − 1.45639I

a = −0.590568 − 1.231490I

b = 0.95494 + 1.07229I

9.13873 − 0.66915I 1.241168 − 0.226691I

u = 0.33116 + 1.43263I

a = −0.03375 − 1.59565I

b = 1.08042 + 0.99381I

8.71794 − 6.87707I 0.35894 + 4.81213I

u = 0.33116 − 1.43263I

a = −0.03375 + 1.59565I

b = 1.08042 − 0.99381I

8.71794 + 6.87707I 0.35894 − 4.81213I

u = −1.51203 + 0.11931I

a = 0.447872 − 0.348583I

b = 1.03272 + 1.05137I

11.20710 − 3.83748I 1.59779 + 2.22620I

u = −1.51203 − 0.11931I

a = 0.447872 + 0.348583I

b = 1.03272 − 1.05137I

11.20710 + 3.83748I 1.59779 − 2.22620I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.29853 + 1.54812I

a = 0.139401 + 1.066540I

b = −0.423937 − 0.981765I

8.83250 − 3.91759I 2.90293 + 3.10234I

u = 0.29853 − 1.54812I

a = 0.139401 − 1.066540I

b = −0.423937 + 0.981765I

8.83250 + 3.91759I 2.90293 − 3.10234I

u = −0.349253

a = −12.0202

b = −0.917213

0.303143 −47.2620

u = −0.304533

a = 1.10498

b = −0.668462

−1.01341 −10.2410

u = −0.72992 + 1.54911I

a = 0.43631 + 1.34583I

b = 1.21166 − 0.95824I

15.7181 + 11.7289I 1.85525 − 5.52053I

u = −0.72992 − 1.54911I

a = 0.43631 − 1.34583I

b = 1.21166 + 0.95824I

15.7181 − 11.7289I 1.85525 + 5.52053I

u = −0.59689 + 1.68228I

a = −0.497600 − 0.677471I

b = 0.84120 + 1.23310I

16.9931 + 3.8383I 0

u = −0.59689 − 1.68228I

a = −0.497600 + 0.677471I

b = 0.84120 − 1.23310I

16.9931 − 3.8383I 0

II. I

= hb + 1, u

+ u

+ a − u + 1, u

+ u

+ 2u

+ u

+ u + 1i

(i) Arc colorings











−u

− u

+ u − 1

−1









−u

− u

+ u

−1









+ 1





−1





−u

− u

+ u

−1





+ u





−u

− u

− 1

−u

− u

− 1





−u

− u

− 1

−u

− u

− 1



(ii) Obstruction class = 1

(iii) Cusp Shapes = 2u

+ 5u

+ 7u

+ 5u

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

(u − 1)

, c

(u + 1)

, c

+ u

+ 2u

+ u

+ u + 1

− 3u

+ 4u

− u

− u + 1

− u

− 2u

+ u

+ u + 1

− u

+ 2u

− u

+ u − 1

, c

+ u

− 2u

− u

+ u − 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

(y −1)

, c

+ 3y

+ 4y

+ y

− y −1

− y

+ 8y

− 3y

+ 3y −1

, c

− 5y

+ 8y

− 3y

− y −1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.339110 + 0.822375I

a = −0.103562 + 0.890762I

b = −1.00000

−1.31583 − 1.53058I −5.47076 + 5.40154I

u = 0.339110 − 0.822375I

a = −0.103562 − 0.890762I

b = −1.00000

−1.31583 + 1.53058I −5.47076 − 5.40154I

u = −0.766826

a = −2.70062

b = −1.00000

0.756147 −1.28100

u = −0.455697 + 1.200150I

a = −0.546130 − 0.402731I

b = −1.00000

4.22763 + 4.40083I −0.88874 − 1.16747I

u = −0.455697 − 1.200150I

a = −0.546130 + 0.402731I

b = −1.00000

4.22763 − 4.40083I −0.88874 + 1.16747I

III. I

= ha, −v

+ b + 3v + 1, v

− 2v

− 3v − 1i

(i) Arc colorings











− 3v − 1









−2v

+ 5v + 3





−2v

+ 5v + 4

− 2v − 3





−v

+ 3v + 1

− 2v − 3





− 3v − 1

−v

+ 2v + 3





−2v

+ 5v + 4

−2v

+ 5v + 3









− 2v − 1

−v

+ 2v + 3





− 2v − 1

−v

+ 2v + 3



(ii) Obstruction class = 1

(iii) Cusp Shapes = 2v

− 5v + 1

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

+ u

− 1

, c

+ u

+ 2u + 1

− u

+ 2u − 1

− u

+ 1

, c

− 3u

+ 2u + 1

(u + 1)

, c

(u − 1)

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

− y

+ 2y − 1

, c

+ 3y

+ 2y − 1

, c

− 5y

+ 10y − 1

, c

(y − 1)

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

v = −0.539798 + 0.182582I

a = 0

b = 0.877439 − 0.744862I

4.66906 + 2.82812I 4.21508 − 1.30714I

v = −0.539798 − 0.182582I

a = 0

b = 0.877439 + 0.744862I

4.66906 − 2.82812I 4.21508 + 1.30714I

v = 3.07960

a = 0

b = −0.754878

0.531480 4.56980

IV. u-Polynomials

Crossings u-Polynomials at each crossing

((u − 1)

)(u

+ u

− 1)(u

− 7u

+ ··· − 5u + 1)

((u + 1)

)(u

+ u

+ 2u + 1)(u

+ 5u

+ ··· − 3u + 1)

− u

+ 2u − 1)(u

− 2u

+ ··· − 24u

− 32)

((u + 1)

)(u

− u

+ 1)(u

− 7u

+ ··· − 5u + 1)

+ u

+ ··· + u + 1)(u

+ 2u

+ ··· + 20u + 8)

+ u

+ 2u + 1)(u

− 2u

+ ··· − 24u

− 32)

− 3u

+ 2u + 1)(u

− 3u

+ ··· − u + 1)(u

+ 3u

+ ··· − u − 1)

((u + 1)

)(u

− u

+ ··· + u + 1)(u

+ 5u

+ ··· − 8u − 1)

− u

+ ··· + u − 1)(u

+ 2u

+ ··· + 20u + 8)

, c

((u − 1)

)(u

+ u

+ ··· + u − 1)(u

+ 5u

+ ··· − 8u − 1)

V. Riley Polynomials

Crossings Riley Polynomials at each crossing

, c

((y − 1)

)(y

− y

+ 2y − 1)(y

− 5y

+ ··· + 3y + 1)

((y − 1)

)(y

+ 3y

+ 2y − 1)(y

+ 43y

+ ··· + 3y + 1)

, c

+ 3y

+ 2y − 1)(y

+ 36y

+ ··· + 1536y + 1024)

, c

+ 3y

+ ··· − y − 1)(y

+ 24y

+ ··· − 848y + 64)

− 5y

+ 10y − 1)(y

− y

+ 8y

− 3y

+ 3y − 1)

· (y

− 37y

+ ··· − 35y + 1)

, c

((y − 1)

)(y

− 5y

+ ··· − y − 1)(y

− 31y

+ ··· − 128y + 1)