11n

108

(K11n

108

)

A knot diagram

Linearized knot diagam

7 1 8 9 11 2 10 4 6 8 9

Solving Sequence

4,8

5,11

6 1 3 2 10 7

, c

Ideals for irreducible components

of X

par

= h−4.49684 × 10

+ 2.31669 × 10

+ ··· + 7.77951 × 10

b − 8.70495 × 10

8.71448 × 10

− 2.39101 × 10

+ ··· + 8.55746 × 10

a + 4.29322 × 10

, u

− u

+ ··· + 16u − 11i

= hu

− 4u

− u

+ 7u

+ 3u

− 9u

− 2u

+ 6u

+ b,

− 10u

− 2u

+ 21u

+ 8u

− 29u

− 9u

+ 26u

+ a + 2u − 7,

− 5u

− u

+ 11u

+ 4u

− 16u

− 5u

+ 15u

+ 2u

− 6u

+ 1i

* 2 irreducible components of dim

= 0, with total 60 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−4.50 × 10

+ 2.32 × 10

+ · · · + 7.78 × 10

b − 8.70 ×

, 8.71 × 10

− 2.39 × 10

+ · · · + 8.56 × 10

a + 4.29 ×

, u

− u

+ · · · + 16u − 11i

(i) Arc colorings











−u





−u

+ u





−1.01835u

+ 0.279406u

+ ··· + 6.57363u − 5.01693

0.578037u

− 0.297794u

+ ··· + 2.06984u + 11.1896





−1.01567u

+ 0.683761u

+ ··· − 1.11353u − 14.1587

−0.0891298u

− 0.145158u

+ ··· + 6.89698u + 1.47011





−0.866912u

+ 0.322213u

+ ··· + 3.88254u − 8.07815

0.221406u

− 0.178838u

+ ··· + 3.51193u + 9.05291





−u





−1.06034u

+ 0.621352u

+ ··· + 3.40978u − 11.7196

0.128714u

− 0.148448u

+ ··· − 0.760314u + 0.405016





−1.59639u

+ 0.577200u

+ ··· + 4.50378u − 16.2065

0.578037u

− 0.297794u

+ ··· + 2.06984u + 11.1896





−0.0768387u

− 0.280256u

+ ··· − 3.25826u + 6.11664

−0.0786313u

+ 0.170391u

+ ··· + 3.31403u − 5.72912





−0.0768387u

− 0.280256u

+ ··· − 3.25826u + 6.11664

−0.0786313u

+ 0.170391u

+ ··· + 3.31403u − 5.72912



(ii) Obstruction class = −1

(iii) Cusp Shapes = −0.320053u

− 0.920029u

+ ··· + 14.1517u + 26.9488

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

+ 12u

+ ··· − u + 1

+ 24u

+ ··· + 13u + 1

, c

+ u

+ ··· − 16u − 11

+ 3u

+ ··· − 14u + 1

, c

− u

+ ··· + 268u − 119

− u

+ ··· + 10u − 27

− 5u

+ ··· − 22u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ 24y

+ ··· + 13y + 1

+ 8y

+ ··· − 71y + 1

, c

− 17y

+ ··· − 2302y + 121

+ 35y

+ ··· − 126y + 1

, c

− 25y

+ ··· − 291260y + 14161

− 19y

+ ··· − 6904y + 729

− 37y

+ ··· + 18y + 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.541870 + 0.901222I

a = 0.024980 + 0.703983I

b = 0.816951 + 0.697564I

−5.53120 + 0.07674I 3.78825 − 1.36866I

u = −0.541870 − 0.901222I

a = 0.024980 − 0.703983I

b = 0.816951 − 0.697564I

−5.53120 − 0.07674I 3.78825 + 1.36866I

u = −0.869571 + 0.293240I

a = 0.127295 + 0.324289I

b = −1.41833 − 0.31833I

3.26073 + 2.43030I 10.07781 − 2.10293I

u = −0.869571 − 0.293240I

a = 0.127295 − 0.324289I

b = −1.41833 + 0.31833I

3.26073 − 2.43030I 10.07781 + 2.10293I

u = 0.883071 + 0.696886I

a = 0.586523 − 1.138810I

b = −0.304793 − 0.919600I

−2.06429 + 2.66223I 9.42585 − 6.21325I

u = 0.883071 − 0.696886I

a = 0.586523 + 1.138810I

b = −0.304793 + 0.919600I

−2.06429 − 2.66223I 9.42585 + 6.21325I

u = 0.843476 + 0.745354I

a = 0.486746 − 1.003540I

b = 0.111927 − 0.997408I

−2.19332 + 2.77840I 8.82502 − 3.26643I

u = 0.843476 − 0.745354I

a = 0.486746 + 1.003540I

b = 0.111927 + 0.997408I

−2.19332 − 2.77840I 8.82502 + 3.26643I

u = −0.702040 + 0.493195I

a = 0.76028 − 2.18802I

b = 0.951952 + 0.007910I

3.52678 − 2.80965I 12.72101 + 4.52739I

u = −0.702040 − 0.493195I

a = 0.76028 + 2.18802I

b = 0.951952 − 0.007910I

3.52678 + 2.80965I 12.72101 − 4.52739I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.741649 + 0.369863I

a = −0.35152 − 1.72739I

b = −1.046450 − 0.878314I

2.97315 + 6.07189I 11.5551 − 10.8395I

u = 0.741649 − 0.369863I

a = −0.35152 + 1.72739I

b = −1.046450 + 0.878314I

2.97315 − 6.07189I 11.5551 + 10.8395I

u = −0.684846 + 0.951602I

a = −0.519439 − 0.379915I

b = −1.025990 − 0.559251I

−0.10143 + 2.03024I 9.27605 − 1.57972I

u = −0.684846 − 0.951602I

a = −0.519439 + 0.379915I

b = −1.025990 + 0.559251I

−0.10143 − 2.03024I 9.27605 + 1.57972I

u = 1.048110 + 0.559665I

a = 0.76825 − 1.24356I

b = −0.594486 − 0.287588I

−1.85237 + 2.17126I 11.26403 + 0.I

u = 1.048110 − 0.559665I

a = 0.76825 + 1.24356I

b = −0.594486 + 0.287588I

−1.85237 − 2.17126I 11.26403 + 0.I

u = −0.690139 + 0.360388I

a = −0.72752 + 1.24362I

b = −1.089830 + 0.609642I

3.63018 − 0.51155I 11.50496 + 4.41570I

u = −0.690139 − 0.360388I

a = −0.72752 − 1.24362I

b = −1.089830 − 0.609642I

3.63018 + 0.51155I 11.50496 − 4.41570I

u = 0.748525

a = −2.51365

b = 1.31936

5.55263 20.1450

u = −0.587154 + 0.447682I

a = −1.33591 − 2.09829I

b = 1.297980 − 0.296087I

2.15454 − 5.46033I 6.95643 + 10.69062I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.587154 − 0.447682I

a = −1.33591 + 2.09829I

b = 1.297980 + 0.296087I

2.15454 + 5.46033I 6.95643 − 10.69062I

u = 0.377726 + 0.619690I

a = 0.599599 − 1.043790I

b = −0.047506 − 0.807730I

−2.18331 + 1.63548I 3.97796 − 4.36559I

u = 0.377726 − 0.619690I

a = 0.599599 + 1.043790I

b = −0.047506 + 0.807730I

−2.18331 − 1.63548I 3.97796 + 4.36559I

u = −0.902068 + 0.916115I

a = 0.512066 + 0.717598I

b = 0.44776 + 1.37089I

−4.30258 − 7.07120I 7.00000 + 6.78102I

u = −0.902068 − 0.916115I

a = 0.512066 − 0.717598I

b = 0.44776 − 1.37089I

−4.30258 + 7.07120I 7.00000 − 6.78102I

u = 0.659900 + 0.253316I

a = 0.97673 + 2.73037I

b = 0.801186 − 0.190096I

2.78226 − 3.51974I 11.16150 + 1.38253I

u = 0.659900 − 0.253316I

a = 0.97673 − 2.73037I

b = 0.801186 + 0.190096I

2.78226 + 3.51974I 11.16150 − 1.38253I

u = 0.640560 + 1.139710I

a = −0.470605 + 0.463131I

b = −1.104340 + 0.854023I

−3.03425 − 7.47849I 0

u = 0.640560 − 1.139710I

a = −0.470605 − 0.463131I

b = −1.104340 − 0.854023I

−3.03425 + 7.47849I 0

u = 0.904630 + 0.964964I

a = 0.086405 + 1.139180I

b = 0.865094 + 0.549237I

−5.42165 + 4.76380I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.904630 − 0.964964I

a = 0.086405 − 1.139180I

b = 0.865094 − 0.549237I

−5.42165 − 4.76380I 0

u = −0.981632 + 0.915325I

a = 0.605329 + 1.050400I

b = −0.831231 + 1.115400I

−4.08127 + 0.33982I 0

u = −0.981632 − 0.915325I

a = 0.605329 − 1.050400I

b = −0.831231 − 1.115400I

−4.08127 − 0.33982I 0

u = −1.089380 + 0.813811I

a = −0.29168 − 1.41143I

b = 1.258230 − 0.611794I

1.11909 − 8.52957I 0

u = −1.089380 − 0.813811I

a = −0.29168 + 1.41143I

b = 1.258230 + 0.611794I

1.11909 + 8.52957I 0

u = 0.994777 + 0.952249I

a = −0.355078 + 0.290456I

b = −0.602542 + 0.470290I

−5.15741 + 2.22291I 0

u = 0.994777 − 0.952249I

a = −0.355078 − 0.290456I

b = −0.602542 − 0.470290I

−5.15741 − 2.22291I 0

u = 0.504319 + 0.352823I

a = 0.390749 − 0.726369I

b = −1.63711 + 0.11804I

3.91125 + 1.34687I 8.42551 − 6.39280I

u = 0.504319 − 0.352823I

a = 0.390749 + 0.726369I

b = −1.63711 − 0.11804I

3.91125 − 1.34687I 8.42551 + 6.39280I

u = −1.208410 + 0.710850I

a = 0.774025 + 1.048360I

b = −1.106840 + 0.481324I

−3.44366 − 6.15745I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −1.208410 − 0.710850I

a = 0.774025 − 1.048360I

b = −1.106840 − 0.481324I

−3.44366 + 6.15745I 0

u = 1.40818 + 0.13200I

a = −0.772395 + 0.203916I

b = 1.185140 − 0.228161I

7.19540 + 0.40564I 0

u = 1.40818 − 0.13200I

a = −0.772395 − 0.203916I

b = 1.185140 + 0.228161I

7.19540 − 0.40564I 0

u = 1.18080 + 0.85198I

a = −0.443194 + 1.290850I

b = 1.34618 + 0.78553I

−1.3361 + 14.6102I 0

u = 1.18080 − 0.85198I

a = −0.443194 − 1.290850I

b = 1.34618 − 0.78553I

−1.3361 − 14.6102I 0

u = −0.475453

a = 0.423852

b = −0.331940

0.656820 15.2640

u = −1.56662 + 0.07941I

a = −0.523086 − 0.170729I

b = 0.733336 + 0.437414I

5.39976 + 3.46453I 0

u = −1.56662 − 0.07941I

a = −0.523086 + 0.170729I

b = 0.733336 − 0.437414I

5.39976 − 3.46453I 0

II.

= hu

−4u

+· · ·+6u

+b, 2u

−10u

+· · ·+a−7, u

−5u

+· · ·−6u

+1i

(i) Arc colorings











−u





−u

+ u





−2u

+ 10u

+ 2u

− 21u

− 8u

+ 29u

+ 9u

− 26u

− 2u + 7

−u

+ 4u

+ u

− 7u

− 3u

+ 9u

+ 2u

− 6u





−5u

+ 23u

+ ··· + 10u − 2

− 5u

− u

+ 11u

+ 4u

− 16u

− 5u

+ 14u

+ 2u

− 5u





−u

+ 5u

+ u

− 11u

− 4u

+ 16u

+ 5u

− 15u

− 2u + 5

−u

+ 5u

+ u

− 10u

− 4u

+ 13u

+ 4u

− 10u

+ 1





−u





−4u

+ 18u

+ ··· + 4u − 2

− u

+ ··· − 9u + 2





−u

+ 6u

+ u

− 14u

− 5u

+ 20u

+ 7u

− 20u

− 2u + 7

−u

+ 4u

+ u

− 7u

− 3u

+ 9u

+ 2u

− 6u





−u

+ 2u

+ ··· + 3u − 8

− 5u

− u

+ 10u

+ 4u

− 13u

− 4u

+ 11u

− 1





−u

+ 2u

+ ··· + 3u − 8

− 5u

− u

+ 10u

+ 4u

− 13u

− 4u

+ 11u

− 1



(ii) Obstruction class = 1

(iii) Cusp Shapes

= −2u

+ 3u

+ 7u

− 8u

− 17u

+ 12u

+ 31u

− 14u

− 24u

+ 2u + 19

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

+ u

+ ··· + u + 1

+ 7u

+ ··· + 7u + 1

, c

− 5u

+ u

+ 11u

− 4u

− 16u

+ 5u

+ 15u

− 2u

− 6u

+ 1

+ u

− 3u

− 2u

+ 4u

− u

+ 3u

+ u

− 4u

+ 1

− u

+ ··· − u + 1

+ 2u

+ ··· + 2u + 1

− 5u

− u

+ 11u

+ 4u

− 16u

− 5u

+ 15u

+ 2u

− 6u

+ 1

− 4u

+ u

+ 3u

− u

+ 4u

− 2u

− 3u

+ u

+ 1

− 2u

+ ··· − 2u + 1

+ 2u

− u

− 2u

+ 3u

+ u

+ 7u

+ 2u

+ 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ 7y

+ ··· + 7y + 1

+ 3y

+ ··· − y + 1

, c

− 10y

+ ··· − 12y + 1

+ 2y

+ ··· − 8y + 1

, c

− 10y

+ ··· + 2y + 1

− 8y

+ ··· + 2y + 1

− 6y

+ ··· + 4y + 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.944121 + 0.586418I

a = 0.85764 − 1.21516I

b = −0.316252 − 0.773855I

−2.69108 + 2.27732I −0.79309 − 1.51304I

u = 0.944121 − 0.586418I

a = 0.85764 + 1.21516I

b = −0.316252 + 0.773855I

−2.69108 − 2.27732I −0.79309 + 1.51304I

u = −0.971824 + 0.903078I

a = 0.199108 + 0.774068I

b = −0.226863 + 0.457126I

−5.04286 − 3.33069I 6.48064 + 3.71539I

u = −0.971824 − 0.903078I

a = 0.199108 − 0.774068I

b = −0.226863 − 0.457126I

−5.04286 + 3.33069I 6.48064 − 3.71539I

u = −1.339700 + 0.047045I

a = −0.920911 − 0.442643I

b = 1.230580 + 0.195712I

7.43656 − 1.12784I 13.7843 + 5.8074I

u = −1.339700 − 0.047045I

a = −0.920911 + 0.442643I

b = 1.230580 − 0.195712I

7.43656 + 1.12784I 13.7843 − 5.8074I

u = 0.555310 + 0.250101I

a = 0.60842 − 3.02308I

b = −1.167560 − 0.430017I

2.81163 + 4.85898I 13.04273 − 4.67018I

u = 0.555310 − 0.250101I

a = 0.60842 + 3.02308I

b = −1.167560 + 0.430017I

2.81163 − 4.85898I 13.04273 + 4.67018I

u = 1.399120 + 0.104604I

a = −0.338465 + 0.499440I

b = 0.964221 − 0.298157I

6.28022 − 3.33267I 14.8487 + 3.1328I

u = 1.399120 − 0.104604I

a = −0.338465 − 0.499440I

b = 0.964221 + 0.298157I

6.28022 + 3.33267I 14.8487 − 3.1328I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.587029 + 0.077244I

a = 0.59421 + 1.34198I

b = −1.48412 + 0.20351I

4.36500 + 0.58143I 14.6367 + 0.1461I

u = −0.587029 − 0.077244I

a = 0.59421 − 1.34198I

b = −1.48412 − 0.20351I

4.36500 − 0.58143I 14.6367 − 0.1461I

III. u-Polynomials

Crossings u-Polynomials at each crossing

+ u

+ ··· + u + 1)(u

+ 12u

+ ··· − u + 1)

+ 7u

+ ··· + 7u + 1)(u

+ 24u

+ ··· + 13u + 1)

, c

− 5u

+ u

+ 11u

− 4u

− 16u

+ 5u

+ 15u

− 2u

− 6u

+ 1)

· (u

+ u

+ ··· − 16u − 11)

+ u

− 3u

− 2u

+ 4u

− u

+ 3u

+ u

− 4u

+ 1)

· (u

+ 3u

+ ··· − 14u + 1)

− u

+ ··· − u + 1)(u

+ 12u

+ ··· − u + 1)

+ 2u

+ ··· + 2u + 1)(u

− u

+ ··· + 268u − 119)

− 5u

− u

+ 11u

+ 4u

− 16u

− 5u

+ 15u

+ 2u

− 6u

+ 1)

· (u

+ u

+ ··· − 16u − 11)

− 4u

+ u

+ 3u

− u

+ 4u

− 2u

− 3u

+ u

+ 1)

· (u

− u

+ ··· + 10u − 27)

− 2u

+ ··· − 2u + 1)(u

− u

+ ··· + 268u − 119)

+ 2u

− u

− 2u

+ 3u

+ u

+ 7u

+ 2u

+ 1)

· (u

− 5u

+ ··· − 22u + 1)

IV. Riley Polynomials

Crossings Riley Polynomials at each crossing

, c

+ 7y

+ ··· + 7y + 1)(y

+ 24y

+ ··· + 13y + 1)

+ 3y

+ ··· − y + 1)(y

+ 8y

+ ··· − 71y + 1)

, c

− 10y

+ ··· − 12y + 1)(y

− 17y

+ ··· − 2302y + 121)

+ 2y

+ ··· − 8y + 1)(y

+ 35y

+ ··· − 126y + 1)

, c

− 10y

+ ··· + 2y + 1)(y

− 25y

+ ··· − 291260y + 14161)

− 8y

+ ··· + 2y + 1)(y

− 19y

+ ··· − 6904y + 729)

− 6y

+ ··· + 4y + 1)(y

− 37y

+ ··· + 18y + 1)