12n

0669

(K12n

0669

)

A knot diagram

Linearized knot diagam

4 5 6 8 9 12 11 2 3 8 7 6

Solving Sequence

7,12

1,4

2 3 11 8 5 10 9

, c

Ideals for irreducible components

of X

par

= h−99u

− 595u

+ ··· + 181b − 1270, −7972u

− 42371u

+ ··· + 11403a − 75384,

+ 5u

+ ··· + 18u + 9i

= h−u

a − 13u

+ ··· + a − 9, u

a + u

+ ··· + a + 2, u

− 3u

+ ··· + 4u

+ 1i

= h−u

+ 3u

− 11u

+ 22u

− 41u

+ 55u

− 63u

+ 54u

− 37u

+ 18u

+ b − 6u + 1,

− u

+ 2u

− 9u

+ 13u

− 27u

+ 26u

− 29u

+ 13u

− 4u

− 7u

+ a + 4u − 4,

− 2u

+ 10u

− 16u

+ 37u

− 46u

+ 62u

− 56u

+ 46u

− 25u

+ 13u

− 2u + 1i

= ha, b − 1, v −1i

* 4 irreducible components of dim

= 0, with total 73 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−99u

− 595u

+ · · · + 181b − 1270, −7972u

− 42371u

+ · · · +

11403a − 75384, u

+ 5u

+ · · · + 18u + 9i

(i) Arc colorings











−u





−u

+ u





0.699114u

+ 3.71578u

+ ··· + 13.4910u + 6.61089

0.546961u

+ 3.28729u

+ ··· + 8.67956u + 7.01657





1.45523u

+ 7.64395u

+ ··· + 37.2140u + 25.2139

−1.21547u

− 3.08287u

+ ··· + 5.82320u + 13.6298





0.559414u

+ 2.93677u

+ ··· + 11.9148u + 11.6456

−0.220205u

− 0.414365u

+ ··· + 5.97316u + 6.29203









+ 1





0.419714u

+ 2.15777u

+ ··· + 8.33868u + 6.68035

0.122336u

+ 0.563536u

+ ··· − 0.540647u + 3.05998





+ 2u

+ u





−1.11225u

− 4.07980u

+ ··· − 12.1491u − 1.59984

−0.775848u

− 2.30939u

+ ··· − 0.764799u + 3.32281



(ii) Obstruction class = −1

(iii) Cusp Shapes = −

1388

1267

−

1029

181

+ ··· −

71766

1267

u +

12063

1267

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

+ 2u

+ ··· − 4u + 1

+ 18u

+ ··· + 72u + 9

, c

− 2u

+ ··· − u + 8

, c

− u

+ ··· + u + 1

, c

− 5u

+ ··· − 18u + 9

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

− 34y

+ ··· − 12y + 1

+ 46y

+ ··· + 1260y + 81

, c

+ 10y

+ ··· + 879y + 64

, c

− 11y

+ ··· − 27y + 1

, c

+ 33y

+ ··· − 90y + 81

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.279310 + 1.005780I

a = 0.111453 − 0.538123I

b = −0.460280 − 0.329159I

2.15334 − 3.08002I −5.41932 + 2.17495I

u = 0.279310 − 1.005780I

a = 0.111453 + 0.538123I

b = −0.460280 + 0.329159I

2.15334 + 3.08002I −5.41932 − 2.17495I

u = −0.720208 + 0.617732I

a = −0.067974 − 1.221620I

b = −0.518022 + 0.676690I

−5.18301 + 11.95320I −6.36826 − 8.35721I

u = −0.720208 − 0.617732I

a = −0.067974 + 1.221620I

b = −0.518022 − 0.676690I

−5.18301 − 11.95320I −6.36826 + 8.35721I

u = −0.778368 + 0.420776I

a = 0.148251 − 0.811625I

b = −1.044860 + 0.185626I

−5.77287 − 6.98018I −7.82028 + 3.54637I

u = −0.778368 − 0.420776I

a = 0.148251 + 0.811625I

b = −1.044860 − 0.185626I

−5.77287 + 6.98018I −7.82028 − 3.54637I

u = −0.588348 + 0.532762I

a = −0.326563 + 1.326180I

b = 0.777651 − 0.025379I

−4.60494 + 0.48065I −11.27827 + 0.66157I

u = −0.588348 − 0.532762I

a = −0.326563 − 1.326180I

b = 0.777651 + 0.025379I

−4.60494 − 0.48065I −11.27827 − 0.66157I

u = −0.609349 + 0.472094I

a = 0.554010 + 1.282630I

b = 0.814858 − 0.516381I

−4.78529 + 3.61019I −12.2949 − 8.1596I

u = −0.609349 − 0.472094I

a = 0.554010 − 1.282630I

b = 0.814858 + 0.516381I

−4.78529 − 3.61019I −12.2949 + 8.1596I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.230601 + 0.555602I

a = −0.857392 − 0.551333I

b = −0.249740 + 0.519303I

0.39899 − 1.65572I −2.33445 + 5.92900I

u = 0.230601 − 0.555602I

a = −0.857392 + 0.551333I

b = −0.249740 − 0.519303I

0.39899 + 1.65572I −2.33445 − 5.92900I

u = 0.02508 + 1.41638I

a = −0.74984 + 1.49379I

b = −0.20717 + 2.40362I

3.21161 − 0.20656I −6.00000 − 0.51080I

u = 0.02508 − 1.41638I

a = −0.74984 − 1.49379I

b = −0.20717 − 2.40362I

3.21161 + 0.20656I −6.00000 + 0.51080I

u = −0.29358 + 1.42827I

a = 1.004870 − 0.924707I

b = 1.49328 − 0.86181I

0.13364 − 3.10062I −6.00000 + 3.00953I

u = −0.29358 − 1.42827I

a = 1.004870 + 0.924707I

b = 1.49328 + 0.86181I

0.13364 + 3.10062I −6.00000 − 3.00953I

u = −0.18111 + 1.50663I

a = −0.84422 + 2.04492I

b = −1.34773 + 3.07117I

1.71233 + 6.43075I −9.24234 − 8.11110I

u = −0.18111 − 1.50663I

a = −0.84422 − 2.04492I

b = −1.34773 − 3.07117I

1.71233 − 6.43075I −9.24234 + 8.11110I

u = 0.05585 + 1.53567I

a = −0.229321 − 1.036530I

b = −1.01658 − 1.57906I

7.40879 − 2.63530I 0. + 1.41712I

u = 0.05585 − 1.53567I

a = −0.229321 + 1.036530I

b = −1.01658 + 1.57906I

7.40879 + 2.63530I 0. − 1.41712I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.449761 + 0.053633I

a = −0.698805 − 0.615735I

b = 0.311401 + 0.365904I

−1.113100 − 0.415234I −10.08873 + 1.99111I

u = 0.449761 − 0.053633I

a = −0.698805 + 0.615735I

b = 0.311401 − 0.365904I

−1.113100 + 0.415234I −10.08873 − 1.99111I

u = −0.17350 + 1.54958I

a = −1.34694 + 1.07933I

b = −2.24580 + 1.72156I

2.33140 + 3.21187I −6.00000 + 0.I

u = −0.17350 − 1.54958I

a = −1.34694 − 1.07933I

b = −2.24580 − 1.72156I

2.33140 − 3.21187I −6.00000 + 0.I

u = −0.24174 + 1.57099I

a = 0.93340 − 1.79161I

b = 1.98417 − 2.74478I

2.0404 + 15.5256I −6.00000 − 8.00298I

u = −0.24174 − 1.57099I

a = 0.93340 + 1.79161I

b = 1.98417 + 2.74478I

2.0404 − 15.5256I −6.00000 + 8.00298I

u = 0.04560 + 1.71954I

a = 0.369072 − 0.185559I

b = 0.708836 − 0.625204I

11.93830 − 4.23690I 0

u = 0.04560 − 1.71954I

a = 0.369072 + 0.185559I

b = 0.708836 + 0.625204I

11.93830 + 4.23690I 0

II. I

h−u

a−13u

+· · ·+a − 9, u

a+u

+· · ·+a + 2, u

−3u

+· · ·+4u

+1i

(i) Arc colorings











−u





−u

+ u





0.0454545au

+ 0.590909u

+ ··· − 0.0454545a + 0.409091





0.590909au

− 0.318182u

+ ··· + 0.409091a − 0.681818

0.409091au

− 0.681818u

+ ··· − 0.409091a − 0.318182





0.0454545au

+ 0.590909u

+ ··· + 0.954545a + 0.409091

− 4u

+ ··· + au + u









+ 1





0.181818au

+ 0.363636u

+ ··· + 0.818182a + 0.636364

0.136364au

+ 0.772727u

+ ··· − 0.136364a + 0.227273





+ 2u

+ u





−0.0454545au

+ 0.409091u

+ ··· + 1.04545a − 0.409091

−0.181818au

+ 0.636364u

+ ··· + 0.181818a + 0.363636



(ii) Obstruction class = −1

(iii) Cusp Shapes = 4u

− 4u

+ 28u

− 16u

+ 52u

+ 16u

− 40u

+ 164u

−

224u

+ 284u

− 232u

+ 188u

− 88u

+ 40u

− 16u + 2

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

+ u

+ ··· − 27u + 976

− 7u

+ ··· + 4u

+ 1)

, c

+ u

+ ··· + 298u + 43

, c

+ u

+ ··· + 13u + 8

, c

+ 3u

+ ··· + 4u

+ 1)

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

− 9y

+ ··· + 352583y + 952576

+ y

+ ··· + 8y + 1)

, c

+ 11y

+ ··· − 23702y + 1849

, c

+ 7y

+ ··· − 377y + 64

, c

+ 17y

+ ··· + 8y + 1)

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.736907 + 0.630715I

a = −0.347357 − 1.185090I

b = 0.346570 + 0.897786I

−3.73069 − 3.30359I −11.5550 + 13.2403I

u = 0.736907 + 0.630715I

a = −0.097352 + 0.707530I

b = −0.595615 − 0.098261I

−3.73069 − 3.30359I −11.5550 + 13.2403I

u = 0.736907 − 0.630715I

a = −0.347357 + 1.185090I

b = 0.346570 − 0.897786I

−3.73069 + 3.30359I −11.5550 − 13.2403I

u = 0.736907 − 0.630715I

a = −0.097352 − 0.707530I

b = −0.595615 + 0.098261I

−3.73069 + 3.30359I −11.5550 − 13.2403I

u = 0.770485 + 0.383157I

a = −0.501042 + 0.870322I

b = −0.419626 − 0.267018I

−4.45888 − 1.70911I −18.3582 + 0.4103I

u = 0.770485 + 0.383157I

a = −0.250273 − 0.516782I

b = 1.35131 + 0.47758I

−4.45888 − 1.70911I −18.3582 + 0.4103I

u = 0.770485 − 0.383157I

a = −0.501042 − 0.870322I

b = −0.419626 + 0.267018I

−4.45888 + 1.70911I −18.3582 − 0.4103I

u = 0.770485 − 0.383157I

a = −0.250273 + 0.516782I

b = 1.35131 − 0.47758I

−4.45888 + 1.70911I −18.3582 − 0.4103I

u = 0.23207 + 1.42418I

a = 0.22218 + 1.51395I

b = 0.52047 + 2.40459I

1.25225 − 5.27528I −9.67373 + 5.08255I

u = 0.23207 + 1.42418I

a = −1.29258 − 1.32241I

b = −1.73185 − 1.01396I

1.25225 − 5.27528I −9.67373 + 5.08255I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.23207 − 1.42418I

a = 0.22218 − 1.51395I

b = 0.52047 − 2.40459I

1.25225 + 5.27528I −9.67373 − 5.08255I

u = 0.23207 − 1.42418I

a = −1.29258 + 1.32241I

b = −1.73185 + 1.01396I

1.25225 + 5.27528I −9.67373 − 5.08255I

u = −0.113421 + 0.521878I

a = −1.094860 + 0.565660I

b = −1.051420 + 0.591620I

1.35067 − 2.72058I −0.320802 − 0.633673I

u = −0.113421 + 0.521878I

a = −1.72097 − 2.11921I

b = 0.195684 + 0.312539I

1.35067 − 2.72058I −0.320802 − 0.633673I

u = −0.113421 − 0.521878I

a = −1.094860 − 0.565660I

b = −1.051420 − 0.591620I

1.35067 + 2.72058I −0.320802 + 0.633673I

u = −0.113421 − 0.521878I

a = −1.72097 + 2.11921I

b = 0.195684 − 0.312539I

1.35067 + 2.72058I −0.320802 + 0.633673I

u = −0.07564 + 1.47034I

a = 0.804239 + 0.140801I

b = 2.39710 + 0.12858I

6.50466 + 5.66478I −1.14168 − 7.61626I

u = −0.07564 + 1.47034I

a = 0.46427 + 2.67817I

b = 0.20535 + 3.65834I

6.50466 + 5.66478I −1.14168 − 7.61626I

u = −0.07564 − 1.47034I

a = 0.804239 − 0.140801I

b = 2.39710 − 0.12858I

6.50466 − 5.66478I −1.14168 + 7.61626I

u = −0.07564 − 1.47034I

a = 0.46427 − 2.67817I

b = 0.20535 − 3.65834I

6.50466 − 5.66478I −1.14168 + 7.61626I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.00370 + 1.51777I

a = 0.594067 − 0.444832I

b = −0.016890 − 0.443911I

8.17367 − 2.54285I 2.47471 + 1.82426I

u = 0.00370 + 1.51777I

a = −0.60427 − 2.10333I

b = −1.19623 − 3.64553I

8.17367 − 2.54285I 2.47471 + 1.82426I

u = 0.00370 − 1.51777I

a = 0.594067 + 0.444832I

b = −0.016890 + 0.443911I

8.17367 + 2.54285I 2.47471 − 1.82426I

u = 0.00370 − 1.51777I

a = −0.60427 + 2.10333I

b = −1.19623 + 3.64553I

8.17367 + 2.54285I 2.47471 − 1.82426I

u = −0.307694 + 0.311549I

a = 0.85542 + 1.13412I

b = −0.08749 − 1.42606I

0.57349 + 4.39205I −7.1332 − 12.4476I

u = −0.307694 + 0.311549I

a = 2.63362 − 1.90072I

b = 0.530367 + 0.052913I

0.57349 + 4.39205I −7.1332 − 12.4476I

u = −0.307694 − 0.311549I

a = 0.85542 − 1.13412I

b = −0.08749 + 1.42606I

0.57349 − 4.39205I −7.1332 + 12.4476I

u = −0.307694 − 0.311549I

a = 2.63362 + 1.90072I

b = 0.530367 − 0.052913I

0.57349 − 4.39205I −7.1332 + 12.4476I

u = 0.25359 + 1.56853I

a = 0.667535 + 1.052820I

b = 1.12652 + 1.60326I

3.49430 − 7.00115I −2.29217 + 10.66775I

u = 0.25359 + 1.56853I

a = −0.83262 − 1.61500I

b = −2.07424 − 2.36731I

3.49430 − 7.00115I −2.29217 + 10.66775I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.25359 − 1.56853I

a = 0.667535 − 1.052820I

b = 1.12652 − 1.60326I

3.49430 + 7.00115I −2.29217 − 10.66775I

u = 0.25359 − 1.56853I

a = −0.83262 + 1.61500I

b = −2.07424 + 2.36731I

3.49430 + 7.00115I −2.29217 − 10.66775I

III.

= h−u

+3u

+· · ·+b+1, −u

+2u

+· · ·+a−4, u

−2u

+· · ·−2u+1i

(i) Arc colorings











−u





−u

+ u





− 2u

+ ··· − 4u + 4

− 3u

+ ··· + 6u − 1





−u

+ 2u

+ ··· − 16u + 1

− 2u

+ 8u

− 12u

+ 22u

− 23u

+ 24u

− 15u

+ 9u

− u

+ 1





− 2u

+ ··· + u + 3

−u

+ 3u

+ ··· + 6u − 1









+ 1





− 2u

+ ··· − u + 4

−u

+ 3u

+ ··· + 5u − 1





+ 2u

+ u





−u

+ 2u

+ ··· − 8u − 1

− 2u

+ 5u

− 6u

+ 6u

− 3u + 1



(ii) Obstruction class = 1

(iii) Cusp Shapes

= −3u

+ 12u

− 31u

+ 71u

− 97u

+ 129u

− 106u

+ 70u

− 28u + 6

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

− 5u

+ ··· − 4u + 1

+ 7u

+ ··· − 2u

+ 1

, c

− u

+ 3u

− 2u

+ 4u

− 2u

+ 5u

− 2u

+ 5u

− u

+ 2u

+ 1

, c

+ 2u

+ u

+ 5u

+ 2u

+ 5u

+ 2u

+ 4u

+ 2u

+ 3u

+ u + 1

, c

− 2u

+ ··· − 2u + 1

, c

+ 2u

+ ··· + 2u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ y

+ ··· + 12y + 1

− y

+ ··· − 4y + 1

, c

+ 5y

+ ··· + 4y + 1

, c

+ 4y

+ ··· + 5y + 1

, c

+ 16y

+ ··· + 22y + 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.062845 + 0.891437I

a = −0.628237 + 0.822197I

b = −0.566446 + 0.024137I

3.05705 − 3.82507I 1.89342 + 5.86722I

u = 0.062845 − 0.891437I

a = −0.628237 − 0.822197I

b = −0.566446 − 0.024137I

3.05705 + 3.82507I 1.89342 − 5.86722I

u = 0.707140 + 0.501490I

a = −0.069670 + 0.915815I

b = −0.685751 − 0.402378I

−3.69632 − 2.35930I −7.76501 + 3.34696I

u = 0.707140 − 0.501490I

a = −0.069670 − 0.915815I

b = −0.685751 + 0.402378I

−3.69632 + 2.35930I −7.76501 − 3.34696I

u = 0.22473 + 1.49020I

a = 0.66766 + 1.50515I

b = 1.17799 + 2.08028I

2.75451 − 5.74454I −3.13416 + 4.41804I

u = 0.22473 − 1.49020I

a = 0.66766 − 1.50515I

b = 1.17799 − 2.08028I

2.75451 + 5.74454I −3.13416 − 4.41804I

u = −0.01439 + 1.51623I

a = 0.49936 − 1.54519I

b = 1.57217 − 2.22848I

7.50866 + 3.81798I −0.96857 − 7.15164I

u = −0.01439 − 1.51623I

a = 0.49936 + 1.54519I

b = 1.57217 + 2.22848I

7.50866 − 3.81798I −0.96857 + 7.15164I

u = −0.013723 + 0.332523I

a = 3.15459 − 1.45385I

b = 0.441210 + 0.948917I

1.08380 + 3.67567I −0.27845 − 6.20952I

u = −0.013723 − 0.332523I

a = 3.15459 + 1.45385I

b = 0.441210 − 0.948917I

1.08380 − 3.67567I −0.27845 + 6.20952I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.03339 + 1.69695I

a = −0.123705 + 0.529063I

b = −0.439173 + 1.086920I

12.32140 − 4.31104I 8.75276 + 5.09710I

u = 0.03339 − 1.69695I

a = −0.123705 − 0.529063I

b = −0.439173 − 1.086920I

12.32140 + 4.31104I 8.75276 − 5.09710I

IV. I

= ha, b − 1, v − 1i

(i) Arc colorings

















































(ii) Obstruction class = −1

(iii) Cusp Shapes = −6

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

u + 1

, c

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

y − 1

, c

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

v = 1.00000

a = 0

b = 1.00000

−1.64493 −6.00000

V. u-Polynomials

Crossings u-Polynomials at each crossing

, c

(u + 1)(u

− 5u

+ ··· − 4u + 1)(u

+ 2u

+ ··· − 4u + 1)

· (u

+ u

+ ··· − 27u + 976)

u(u

+ 7u

+ ··· − 2u

+ 1)(u

− 7u

+ ··· + 4u

+ 1)

· (u

+ 18u

+ ··· + 72u + 9)

, c

(u + 1)

· (u

− u

+ 3u

− 2u

+ 4u

− 2u

+ 5u

− 2u

+ 5u

− u

+ 2u

+ 1)

· (u

− 2u

+ ··· − u + 8)(u

+ u

+ ··· + 298u + 43)

, c

(u + 1)(u

+ 2u

+ ··· + u + 1)

· (u

− u

+ ··· + u + 1)(u

+ u

+ ··· + 13u + 8)

, c

u(u

− 2u

+ ··· − 2u + 1)(u

+ 3u

+ ··· + 4u

+ 1)

· (u

− 5u

+ ··· − 18u + 9)

, c

u(u

+ 2u

+ ··· + 2u + 1)(u

+ 3u

+ ··· + 4u

+ 1)

· (u

− 5u

+ ··· − 18u + 9)

VI. Riley Polynomials

Crossings Riley Polynomials at each crossing

, c

(y − 1)(y

+ y

+ ··· + 12y + 1)(y

− 34y

+ ··· − 12y + 1)

· (y

− 9y

+ ··· + 352583y + 952576)

y(y

− y

+ ··· − 4y + 1)(y

+ y

+ ··· + 8y + 1)

· (y

+ 46y

+ ··· + 1260y + 81)

, c

(y − 1)(y

+ 5y

+ ··· + 4y + 1)(y

+ 10y

+ ··· + 879y + 64)

· (y

+ 11y

+ ··· − 23702y + 1849)

, c

(y − 1)(y

+ 4y

+ ··· + 5y + 1)(y

− 11y

+ ··· − 27y + 1)

· (y

+ 7y

+ ··· − 377y + 64)

, c

y(y

+ 16y

+ ··· + 22y + 1)(y

+ 17y

+ ··· + 8y + 1)

· (y

+ 33y

+ ··· − 90y + 81)