12n

0092

(K12n

0092

)

A knot diagram

Linearized knot diagam

3 5 7 2 8 4 11 5 12 1 8 10

Solving Sequence

7,11

4,12

3 6 5 9 2 1 10

, c

Ideals for irreducible components

of X

par

= h−2.63090 × 10

169

− 1.19407 × 10

170

+ ··· + 5.11342 × 10

169

b − 2.60080 × 10

170

− 1.33678 × 10

170

− 5.86621 × 10

170

+ ··· + 1.27836 × 10

169

a − 8.83930 × 10

170

+ 5u

+ ··· + 4u + 4i

= h13a

u + 10a

+ 22au + 61b + 31a + 11u + 46, a

+ a

u − 7au + 13a − u + 4, u

− u − 1i

= hb, 5u

+ a + 2u + 9, u

+ u

+ 2u + 1i

= ha, 3b + v −5, v

− 7v + 1i

* 4 irreducible components of dim

= 0, with total 76 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

= h−2.63 × 10

169

− 1.19 × 10

170

+ · · · + 5.11 × 10

169

b − 2.60 ×

170

, −1.34 × 10

170

− 5.87 × 10

170

+ · · · + 1.28 × 10

169

a − 8.84 ×

170

, u

+ 5u

+ · · · + 4u + 4i

(i) Arc colorings











−u





10.4570u

+ 45.8887u

+ ··· − 20.3543u + 69.1458

0.514509u

+ 2.33517u

+ ··· − 12.7222u + 5.08623





−u

+ u





10.9715u

+ 48.2239u

+ ··· − 33.0765u + 74.2321

0.514509u

+ 2.33517u

+ ··· − 12.7222u + 5.08623





−2.56076u

− 11.3025u

+ ··· + 22.7562u − 15.2103

−0.519422u

− 2.45761u

+ ··· + 16.9006u − 7.52354





−3.92828u

− 17.5296u

+ ··· + 43.8945u − 28.7392

−0.226329u

− 1.14246u

+ ··· + 13.8722u − 5.08179





−0.467988u

− 1.95761u

+ ··· − 13.3003u + 0.571683

1.21392u

+ 5.72728u

+ ··· − 42.4563u + 17.1644





11.9804u

+ 52.6553u

+ ··· − 42.2932u + 79.5227

−0.226329u

− 1.14246u

+ ··· + 13.8722u − 5.08179





−1.45833u

− 6.68429u

+ ··· + 28.8135u − 15.0633

−0.990343u

− 4.72668u

+ ··· + 42.1137u − 15.6350





−0.205715u

− 0.764176u

+ ··· − 16.7041u + 3.00115

1.42293u

+ 6.67656u

+ ··· − 45.2828u + 19.1221



(ii) Obstruction class = −1

(iii) Cusp Shapes = −250.136u

− 1099.53u

+ ··· + 889.233u − 1633.12

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

+ 35u

+ ··· + 4379u + 1

, c

− 7u

+ ··· − 61u − 1

, c

− 4u

+ ··· − 4u − 8

, c

− 3u

+ ··· + 224u − 64

, c

− 5u

+ ··· + 4u − 4

, c

+ 7u

+ ··· + 88u − 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

− 3y

+ ··· + 19078099y −1

, c

− 35y

+ ··· + 4379y −1

, c

+ 24y

+ ··· + 7056y −64

, c

− 47y

+ ··· + 283648y −4096

, c

− 21y

+ ··· + 1448y −16

, c

− 55y

+ ··· + 6134y −1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.852107 + 0.536554I

a = 0.312816 − 0.088889I

b = −1.40349 + 0.30161I

1.38895 − 2.95818I 0

u = −0.852107 − 0.536554I

a = 0.312816 + 0.088889I

b = −1.40349 − 0.30161I

1.38895 + 2.95818I 0

u = −0.948009 + 0.367228I

a = 0.850963 − 0.753331I

b = 0.153663 + 0.857675I

2.10912 − 0.34030I 0

u = −0.948009 − 0.367228I

a = 0.850963 + 0.753331I

b = 0.153663 − 0.857675I

2.10912 + 0.34030I 0

u = −1.024770 + 0.135153I

a = −0.04125 + 1.56220I

b = −0.13124 − 1.75548I

9.17254 − 3.64107I 0

u = −1.024770 − 0.135153I

a = −0.04125 − 1.56220I

b = −0.13124 + 1.75548I

9.17254 + 3.64107I 0

u = −0.691259 + 0.784338I

a = −0.662548 + 0.346420I

b = −0.470514 − 0.941528I

0.56978 − 4.38703I 0

u = −0.691259 − 0.784338I

a = −0.662548 − 0.346420I

b = −0.470514 + 0.941528I

0.56978 + 4.38703I 0

u = 0.916883 + 0.120007I

a = −0.389774 + 0.653279I

b = −0.947907 − 0.877633I

3.47356 + 1.55230I 0

u = 0.916883 − 0.120007I

a = −0.389774 − 0.653279I

b = −0.947907 + 0.877633I

3.47356 − 1.55230I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.568857 + 0.725937I

a = 0.442387 + 0.229414I

b = −0.895487 − 0.532333I

−2.18618 − 0.21906I 0

u = 0.568857 − 0.725937I

a = 0.442387 − 0.229414I

b = −0.895487 + 0.532333I

−2.18618 + 0.21906I 0

u = −0.842958 + 0.701034I

a = −0.402908 + 1.148860I

b = 0.613031 − 0.666960I

−1.58736 + 0.20570I 0

u = −0.842958 − 0.701034I

a = −0.402908 − 1.148860I

b = 0.613031 + 0.666960I

−1.58736 − 0.20570I 0

u = 0.322386 + 0.842732I

a = −0.573249 + 1.009110I

b = 0.004484 + 1.102400I

4.65051 + 1.43055I 0

u = 0.322386 − 0.842732I

a = −0.573249 − 1.009110I

b = 0.004484 − 1.102400I

4.65051 − 1.43055I 0

u = 0.890471 + 0.716800I

a = −0.459802 − 0.793448I

b = −0.820727 + 1.097090I

4.31441 + 8.34885I 0

u = 0.890471 − 0.716800I

a = −0.459802 + 0.793448I

b = −0.820727 − 1.097090I

4.31441 − 8.34885I 0

u = 0.807936 + 0.810042I

a = 0.59554 + 1.80173I

b = 0.635097 − 0.948580I

−5.30684 + 1.54275I 0

u = 0.807936 − 0.810042I

a = 0.59554 − 1.80173I

b = 0.635097 + 0.948580I

−5.30684 − 1.54275I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.093900 + 0.380450I

a = 0.431231 + 0.794777I

b = 0.769105 − 1.004900I

7.57890 + 3.09040I 0

u = 1.093900 − 0.380450I

a = 0.431231 − 0.794777I

b = 0.769105 + 1.004900I

7.57890 − 3.09040I 0

u = −1.123750 + 0.281723I

a = 0.31854 + 1.48804I

b = −0.360396 − 0.792963I

1.65110 − 0.40415I 0

u = −1.123750 − 0.281723I

a = 0.31854 − 1.48804I

b = −0.360396 + 0.792963I

1.65110 + 0.40415I 0

u = −0.916981 + 0.724426I

a = 0.35528 − 1.65844I

b = 0.449506 + 1.288610I

−1.34521 − 5.69764I 0

u = −0.916981 − 0.724426I

a = 0.35528 + 1.65844I

b = 0.449506 − 1.288610I

−1.34521 + 5.69764I 0

u = −0.716927 + 0.933576I

a = 0.95858 − 1.67087I

b = 0.830238 + 0.572871I

−1.31032 + 2.58838I 0

u = −0.716927 − 0.933576I

a = 0.95858 + 1.67087I

b = 0.830238 − 0.572871I

−1.31032 − 2.58838I 0

u = 0.640640 + 0.505760I

a = 2.04088 − 0.00556I

b = −0.281677 − 1.140920I

4.03132 − 3.47720I 8.54192 + 0.I

u = 0.640640 − 0.505760I

a = 2.04088 + 0.00556I

b = −0.281677 + 1.140920I

4.03132 + 3.47720I 8.54192 + 0.I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.963394 + 0.774365I

a = −0.309238 − 0.466323I

b = 1.011710 + 0.670256I

−4.82760 + 4.40824I 0

u = 0.963394 − 0.774365I

a = −0.309238 + 0.466323I

b = 1.011710 − 0.670256I

−4.82760 − 4.40824I 0

u = −0.516521 + 1.180440I

a = 0.443034 − 0.252752I

b = −0.511934 + 1.004960I

2.73256 + 3.28945I 0

u = −0.516521 − 1.180440I

a = 0.443034 + 0.252752I

b = −0.511934 − 1.004960I

2.73256 − 3.28945I 0

u = −1.040640 + 0.792804I

a = −0.269379 + 0.165081I

b = 1.29598 − 0.58611I

−0.31021 − 8.92181I 0

u = −1.040640 − 0.792804I

a = −0.269379 − 0.165081I

b = 1.29598 + 0.58611I

−0.31021 + 8.92181I 0

u = 1.133830 + 0.655680I

a = −0.23216 − 1.57884I

b = −0.680939 + 1.100720I

−0.42473 + 5.58831I 0

u = 1.133830 − 0.655680I

a = −0.23216 + 1.57884I

b = −0.680939 − 1.100720I

−0.42473 − 5.58831I 0

u = 0.481460 + 1.304030I

a = −0.160877 − 0.218086I

b = 0.650609 + 0.709593I

−6.03312 − 3.48808I 0

u = 0.481460 − 1.304030I

a = −0.160877 + 0.218086I

b = 0.650609 − 0.709593I

−6.03312 + 3.48808I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.605447 + 0.034461I

a = 0.36569 − 3.69530I

b = −0.185254 + 1.354450I

3.85230 + 2.93050I −14.9510 − 12.7631I

u = 0.605447 − 0.034461I

a = 0.36569 + 3.69530I

b = −0.185254 − 1.354450I

3.85230 − 2.93050I −14.9510 + 12.7631I

u = −0.596504

a = 11.6408

b = 0.144153

−0.561787 −200.700

u = −1.20386 + 0.80436I

a = −0.39858 + 1.41760I

b = −0.72823 − 1.36563I

4.86618 − 10.28160I 0

u = −1.20386 − 0.80436I

a = −0.39858 − 1.41760I

b = −0.72823 + 1.36563I

4.86618 + 10.28160I 0

u = −0.551957

a = 1.56151

b = −0.122994

1.12640 9.50900

u = −0.35331 + 1.40989I

a = −0.0507171 + 0.0998246I

b = 0.265762 − 0.457711I

−4.60256 − 2.48429I 0

u = −0.35331 − 1.40989I

a = −0.0507171 − 0.0998246I

b = 0.265762 + 0.457711I

−4.60256 + 2.48429I 0

u = −0.515646 + 0.173541I

a = −2.52072 + 0.01596I

b = −0.510707 + 0.338412I

−1.000760 − 0.692383I −6.73751 − 0.40613I

u = −0.515646 − 0.173541I

a = −2.52072 − 0.01596I

b = −0.510707 − 0.338412I

−1.000760 + 0.692383I −6.73751 + 0.40613I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.30779 + 0.82249I

a = 0.312309 + 1.360860I

b = 0.780596 − 1.112270I

−3.39471 + 10.94230I 0

u = 1.30779 − 0.82249I

a = 0.312309 − 1.360860I

b = 0.780596 + 1.112270I

−3.39471 − 10.94230I 0

u = −1.42808 + 0.65324I

a = 0.120606 − 1.218490I

b = 0.608224 + 0.971552I

−0.66498 − 4.63908I 0

u = −1.42808 − 0.65324I

a = 0.120606 + 1.218490I

b = 0.608224 − 0.971552I

−0.66498 + 4.63908I 0

u = −1.26142 + 0.95426I

a = 0.49685 − 1.33557I

b = 0.84089 + 1.26809I

1.9343 − 16.4466I 0

u = −1.26142 − 0.95426I

a = 0.49685 + 1.33557I

b = 0.84089 − 1.26809I

1.9343 + 16.4466I 0

u = −0.76428 + 1.39601I

a = −0.194634 + 0.365377I

b = 0.676063 − 1.067470I

0.19526 + 8.22606I 0

u = −0.76428 − 1.39601I

a = −0.194634 − 0.365377I

b = 0.676063 + 1.067470I

0.19526 − 8.22606I 0

u = 1.63520

a = 1.82265

b = 0.534695

7.71518 0

u = −0.284609

a = −0.440890

b = 1.67721

−7.15457 47.4220

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.027450 + 0.277565I

a = −14.7216 + 8.1087I

b = −0.617886 + 0.064219I

0.646116 − 0.109642I −45.2047 + 8.8218I

u = −0.027450 − 0.277565I

a = −14.7216 − 8.1087I

b = −0.617886 − 0.064219I

0.646116 + 0.109642I −45.2047 − 8.8218I

u = 1.83739 + 0.12757I

a = 0.128738 + 1.010030I

b = 0.151006 − 1.055190I

11.02040 + 2.29381I 0

u = 1.83739 − 0.12757I

a = 0.128738 − 1.010030I

b = 0.151006 + 1.055190I

11.02040 − 2.29381I 0

u = 0.113052

a = 3.84398

b = −0.612202

−1.00335 −10.2290

II.

= h13a

u + 22au + · · · + 31a + 46, a

+ a

u − 7au + 13a − u + 4, u

− u − 1i

(i) Arc colorings











−u − 1





−0.213115a

u − 0.360656au + ··· − 0.508197a − 0.754098





−u − 1





−0.213115a

u − 0.360656au + ··· + 0.491803a − 0.754098

−0.213115a

u − 0.360656au + ··· − 0.508197a − 0.754098





−0.0163934a

u + 0.0491803au + ··· + 0.114754a + 0.557377

−0.262295a

u − 0.213115au + ··· − 0.163934a − 0.0819672





−0.0163934a

u + 0.0491803au + ··· + 0.114754a + 0.557377

−0.262295a

u − 0.213115au + ··· − 0.163934a − 0.0819672





−u − 1





−0.278689a

u − 0.163934au + ··· − 0.0491803a − 1.52459

−0.262295a

u − 0.213115au + ··· − 0.163934a − 0.0819672





−1





−u



(ii) Obstruction class = 1

(iii) Cusp Shapes =

476

u +

216

158

au +

a +

872

u +

591

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

− u

+ 2u − 1)

+ u

− 1)

− u

+ 1)

, c

+ u

+ 2u + 1)

, c

− u − 1)

, c

+ u − 1)

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ 3y

+ 2y −1)

, c

− y

+ 2y −1)

, c

− 3y + 1)

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.618034

a = −0.263016

b = −0.569840

−0.126494 1.08690

u = −0.618034

a = 0.44053 + 4.16700I

b = −0.215080 − 1.307140I

4.01109 − 2.82812I 22.3213 − 9.8050I

u = −0.618034

a = 0.44053 − 4.16700I

b = −0.215080 + 1.307140I

4.01109 + 2.82812I 22.3213 + 9.8050I

u = 1.61803

a = −0.040408 + 1.244150I

b = −0.215080 − 1.307140I

11.90680 − 2.82812I 7.63548 + 4.05775I

u = 1.61803

a = −0.040408 − 1.244150I

b = −0.215080 + 1.307140I

11.90680 + 2.82812I 7.63548 − 4.05775I

u = 1.61803

a = −1.53722

b = −0.569840

7.76919 64.0000

III. I

= hb, 5u

+ a + 2u + 9, u

+ u

+ 2u + 1i

(i) Arc colorings











−u





−5u

− 2u − 9





+ 3u + 1





−5u

− 2u − 9









+ 1

− u − 1





u + 2

−2u

+ 3u + 2





−6u

− 2u − 10

−u

+ u + 1





−u

− 1

−u

+ u + 1





−2u



(ii) Obstruction class = 1

(iii) Cusp Shapes = 53u

+ 32u + 92

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

(u − 1)

, c

(u + 1)

− 3u

+ 2u + 1

+ u

+ 2u + 1

+ 3u

+ 2u − 1

, c

− u

+ 1

− u

+ 2u − 1

+ u

− 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

(y −1)

, c

− 5y

+ 10y −1

, c

+ 3y

+ 2y −1

, c

− y

+ 2y −1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.215080 + 1.307140I

a = −0.258045 + 0.197115I

b = 0

−4.66906 − 2.82812I −2.98758 + 12.02771I

u = −0.215080 − 1.307140I

a = −0.258045 − 0.197115I

b = 0

−4.66906 + 2.82812I −2.98758 − 12.02771I

u = −0.569840

a = −9.48391

b = 0

−0.531480 90.9750

IV. I

= ha, 3b + v − 5, v

− 7v + 1i

(i) Arc colorings















−

v +









−

v +

−

v +





v −





v −





−

v +

−v + 7





−1

v −





v −

v − 7





v +

−v + 7



(ii) Obstruction class = 1

(iii) Cusp Shapes = −49

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

− 3u + 1

, c

+ u − 1

, c

− u − 1

, c

+ 3u + 1

, c

(u + 1)

(u − 1)

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

− 7y + 1

, c

− 3y + 1

, c

(y − 1)

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

v = 0.145898

a = 0

b = 1.61803

−7.23771 −49.0000

v = 6.85410

a = 0

b = −0.618034

0.657974 −49.0000

V. u-Polynomials

Crossings u-Polynomials at each crossing

(u − 1)

− 3u + 1)(u

− u

+ 2u − 1)

· (u

+ 35u

+ ··· + 4379u + 1)

((u − 1)

)(u

+ u − 1)(u

+ u

− 1)

− 7u

+ ··· − 61u − 1)

+ u − 1)(u

− u

+ 2u − 1)

− 4u

+ ··· − 4u − 8)

((u + 1)

)(u

− u − 1)(u

− u

+ 1)

− 7u

+ ··· − 61u − 1)

− 3u + 1)(u

− 3u

+ 2u + 1)(u

− 3u

+ ··· + 224u − 64)

− u − 1)(u

+ u

+ 2u + 1)

− 4u

+ ··· − 4u − 8)

− u − 1)

+ u

+ 2u + 1)(u

− 5u

+ ··· + 4u − 4)

+ 3u + 1)(u

+ 3u

+ 2u − 1)(u

− 3u

+ ··· + 224u − 64)

, c

((u + 1)

)(u

− u − 1)

− u

+ 1)(u

+ 7u

+ ··· + 88u − 1)

+ u − 1)

− u

+ 2u − 1)(u

− 5u

+ ··· + 4u − 4)

((u − 1)

)(u

+ u − 1)

+ u

− 1)(u

+ 7u

+ ··· + 88u − 1)

VI. Riley Polynomials

Crossings Riley Polynomials at each crossing

(y − 1)

− 7y + 1)(y

+ 3y

+ 2y − 1)

· (y

− 3y

+ ··· + 19078099y − 1)

, c

(y − 1)

− 3y + 1)(y

− y

+ 2y − 1)

· (y

− 35y

+ ··· + 4379y − 1)

, c

− 3y + 1)(y

+ 3y

+ 2y − 1)

+ 24y

+ ··· + 7056y − 64)

, c

− 7y + 1)(y

− 5y

+ 10y − 1)

· (y

− 47y

+ ··· + 283648y − 4096)

, c

− 3y + 1)

+ 3y

+ 2y − 1)(y

− 21y

+ ··· + 1448y − 16)

, c

(y − 1)

− 3y + 1)

− y

+ 2y − 1)

· (y

− 55y

+ ··· + 6134y − 1)