12n

0787

(K12n

0787

)

A knot diagram

Linearized knot diagam

4 5 11 8 3 12 5 12 1 4 6 9

Solving Sequence

8,12

9 1

5,10

4 2 7 6 11 3

, c

Ideals for irreducible components

of X

par

= h−4.86056 × 10

− 6.69927 × 10

+ ··· + 6.23296 × 10

b + 8.49108 × 10

− 6.68649 × 10

+ 2.75220 × 10

+ ··· + 4.79459 × 10

a + 8.71827 × 10

− 4u

+ ··· + 18u + 1i

= h−u

− u

+ ··· + b + 1, 2u

+ u

+ ··· + a − 6u, u

+ u

+ ··· − 2u − 1i

* 2 irreducible components of dim

= 0, with total 69 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−4.86 × 10

− 6.70 × 10

+ · · · + 6.23 × 10

b + 8.49 ×

, −6.69 × 10

+ 2.75 × 10

+ · · · + 4.79 × 10

a + 8.72 ×

, u

− 4u

+ · · · + 18u + 1i

(i) Arc colorings















−u

+ u





1.39459u

− 5.74023u

+ ··· + 155.294u − 18.1836

0.0779815u

+ 0.107481u

+ ··· − 22.1919u − 1.36229





−u

+ 1

−u

+ 2u





1.47257u

− 5.63275u

+ ··· + 133.102u − 19.5459

0.0779815u

+ 0.107481u

+ ··· − 22.1919u − 1.36229





−4.28758u

+ 17.1080u

+ ··· − 1091.27u − 36.3160

0.0338379u

− 0.0711693u

+ ··· − 2.55862u + 1.27029





−1.21648u

+ 4.74618u

+ ··· − 367.518u − 25.5631

−0.0685253u

+ 0.296845u

+ ··· − 8.41934u + 0.118102





−1.21648u

+ 4.74618u

+ ··· − 367.518u − 25.5631

−0.194638u

+ 0.560317u

+ ··· − 5.04742u + 0.237849





1.55761u

− 6.02658u

+ ··· + 450.253u + 35.6977

0.0494698u

− 0.154809u

+ ··· + 12.1116u − 0.0549377





−1.21792u

+ 5.14238u

+ ··· − 481.653u − 35.7438

−0.124343u

+ 0.226786u

+ ··· − 5.42725u + 0.405315



(ii) Obstruction class = −1

(iii) Cusp Shapes = 0.948355u

− 2.66963u

+ ··· + 228.868u + 10.1763

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

− 9u

+ ··· + 27964u − 1601

, c

− 2u

+ ··· + 273u + 131

, c

− u

+ ··· + 455u + 47

, c

− 3u

+ ··· + 6u − 1

, c

− 14u

+ ··· − 1895u + 425

, c

+ 4u

+ ··· − 18u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

− 69y

+ ··· + 3606192y + 2563201

, c

− 26y

+ ··· − 263693y + 17161

, c

+ 19y

+ ··· − 52301y + 2209

, c

+ 13y

+ ··· − 80y + 1

, c

− 28y

+ ··· − 3054675y + 180625

, c

− 68y

+ ··· + 260y + 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.963102 + 0.345038I

a = 0.367913 + 0.884454I

b = −0.701674 − 0.540338I

1.19699 + 4.57480I 0

u = −0.963102 − 0.345038I

a = 0.367913 − 0.884454I

b = −0.701674 + 0.540338I

1.19699 − 4.57480I 0

u = 1.010440 + 0.226511I

a = −0.195406 + 0.336697I

b = −0.565644 − 0.187214I

−1.74134 − 0.12755I 0

u = 1.010440 − 0.226511I

a = −0.195406 − 0.336697I

b = −0.565644 + 0.187214I

−1.74134 + 0.12755I 0

u = −0.284882 + 1.011440I

a = 0.769715 + 0.747090I

b = −0.604356 − 0.603378I

3.70336 − 4.26964I 0

u = −0.284882 − 1.011440I

a = 0.769715 − 0.747090I

b = −0.604356 + 0.603378I

3.70336 + 4.26964I 0

u = −0.654100 + 0.538210I

a = 0.26052 + 1.52753I

b = 0.855051 − 0.775108I

−1.64856 + 4.08097I −3.59358 − 7.53580I

u = −0.654100 − 0.538210I

a = 0.26052 − 1.52753I

b = 0.855051 + 0.775108I

−1.64856 − 4.08097I −3.59358 + 7.53580I

u = 1.109320 + 0.362480I

a = −0.49904 + 1.54272I

b = −0.519449 − 0.934936I

0.59353 − 3.33817I 0

u = 1.109320 − 0.362480I

a = −0.49904 − 1.54272I

b = −0.519449 + 0.934936I

0.59353 + 3.33817I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.822872 + 0.103062I

a = 0.257461 + 0.646673I

b = −0.242471 + 1.056410I

6.24954 − 0.94391I 0.647108 − 0.326933I

u = −0.822872 − 0.103062I

a = 0.257461 − 0.646673I

b = −0.242471 − 1.056410I

6.24954 + 0.94391I 0.647108 + 0.326933I

u = −0.862860 + 0.795004I

a = 0.01742 − 1.46293I

b = −0.818392 + 0.955221I

1.92110 + 10.19650I 0

u = −0.862860 − 0.795004I

a = 0.01742 + 1.46293I

b = −0.818392 − 0.955221I

1.92110 − 10.19650I 0

u = 0.940755 + 0.772008I

a = −0.376983 − 0.720478I

b = 0.668255 + 0.424349I

−0.98442 − 3.07513I 0

u = 0.940755 − 0.772008I

a = −0.376983 + 0.720478I

b = 0.668255 − 0.424349I

−0.98442 + 3.07513I 0

u = −0.038382 + 0.763918I

a = 0.34582 − 2.02691I

b = −0.418556 + 0.708156I

4.27045 − 0.69241I 2.11238 − 0.92531I

u = −0.038382 − 0.763918I

a = 0.34582 + 2.02691I

b = −0.418556 − 0.708156I

4.27045 + 0.69241I 2.11238 + 0.92531I

u = 1.251610 + 0.050476I

a = −0.50166 + 1.68503I

b = −0.371536 − 1.046800I

0.92724 − 3.35039I 0

u = 1.251610 − 0.050476I

a = −0.50166 − 1.68503I

b = −0.371536 + 1.046800I

0.92724 + 3.35039I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −1.272460 + 0.135660I

a = 0.48984 + 1.43474I

b = −0.144334 − 0.106513I

1.17738 + 4.15170I 0

u = −1.272460 − 0.135660I

a = 0.48984 − 1.43474I

b = −0.144334 + 0.106513I

1.17738 − 4.15170I 0

u = −0.687341 + 0.187968I

a = −0.167504 − 0.552195I

b = 0.675651 + 0.912887I

−1.04394 − 1.60688I −0.66527 − 4.34427I

u = −0.687341 − 0.187968I

a = −0.167504 + 0.552195I

b = 0.675651 − 0.912887I

−1.04394 + 1.60688I −0.66527 + 4.34427I

u = 0.647636 + 0.201060I

a = −0.00791 − 1.98697I

b = 0.806130 + 0.597381I

−1.174450 − 0.681589I −4.08137 − 1.34656I

u = 0.647636 − 0.201060I

a = −0.00791 + 1.98697I

b = 0.806130 − 0.597381I

−1.174450 + 0.681589I −4.08137 + 1.34656I

u = 1.42899 + 0.06703I

a = −0.209013 − 0.868503I

b = −0.03651 + 1.49771I

1.98258 − 2.19587I 0

u = 1.42899 − 0.06703I

a = −0.209013 + 0.868503I

b = −0.03651 − 1.49771I

1.98258 + 2.19587I 0

u = 1.59652

a = 0.0339995

b = −0.841839

−2.31786 0

u = 1.61247 + 0.20315I

a = 0.576829 − 1.030930I

b = 1.00137 + 1.04577I

−9.32125 − 7.00176I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.61247 − 0.20315I

a = 0.576829 + 1.030930I

b = 1.00137 − 1.04577I

−9.32125 + 7.00176I 0

u = −1.64815 + 0.06439I

a = 0.225695 + 1.000060I

b = 1.06497 − 1.24440I

−9.35796 + 1.73629I 0

u = −1.64815 − 0.06439I

a = 0.225695 − 1.000060I

b = 1.06497 + 1.24440I

−9.35796 − 1.73629I 0

u = 0.025016 + 0.346811I

a = −1.56278 − 0.62107I

b = 0.478121 + 0.406062I

−0.212444 − 1.082960I −3.65080 + 5.73682I

u = 0.025016 − 0.346811I

a = −1.56278 + 0.62107I

b = 0.478121 − 0.406062I

−0.212444 + 1.082960I −3.65080 − 5.73682I

u = −0.324576 + 0.095938I

a = −1.45555 + 2.26639I

b = −0.12420 − 1.49308I

7.90529 + 1.59104I −6.15709 − 6.22190I

u = −0.324576 − 0.095938I

a = −1.45555 − 2.26639I

b = −0.12420 + 1.49308I

7.90529 − 1.59104I −6.15709 + 6.22190I

u = 1.67054 + 0.05789I

a = 0.072885 + 0.406252I

b = 1.08948 − 0.99449I

−9.55452 + 0.59565I 0

u = 1.67054 − 0.05789I

a = 0.072885 − 0.406252I

b = 1.08948 + 0.99449I

−9.55452 − 0.59565I 0

u = 1.69396 + 0.07384I

a = 0.019572 − 0.434345I

b = −1.29976 + 0.82350I

−8.09214 − 6.09898I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.69396 − 0.07384I

a = 0.019572 + 0.434345I

b = −1.29976 − 0.82350I

−8.09214 + 6.09898I 0

u = 1.69403 + 0.24798I

a = −0.417925 + 1.083500I

b = −0.99514 − 1.24001I

−6.6989 − 14.2733I 0

u = 1.69403 − 0.24798I

a = −0.417925 − 1.083500I

b = −0.99514 + 1.24001I

−6.6989 + 14.2733I 0

u = −1.72157 + 0.11548I

a = −0.252652 − 0.581934I

b = −1.024730 + 0.709607I

−11.31890 + 1.98764I 0

u = −1.72157 − 0.11548I

a = −0.252652 + 0.581934I

b = −1.024730 − 0.709607I

−11.31890 − 1.98764I 0

u = −1.73054 + 0.06720I

a = −0.366356 − 0.965910I

b = −0.79731 + 1.27731I

−9.45621 + 4.84743I 0

u = −1.73054 − 0.06720I

a = −0.366356 + 0.965910I

b = −0.79731 − 1.27731I

−9.45621 − 4.84743I 0

u = −1.72514 + 0.16764I

a = 0.047255 + 0.719370I

b = 1.21416 − 0.93670I

−10.30920 + 6.54217I 0

u = −1.72514 − 0.16764I

a = 0.047255 − 0.719370I

b = 1.21416 + 0.93670I

−10.30920 − 6.54217I 0

u = 1.76333

a = 0.283022

b = 0.127597

−3.04170 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.0287121 + 0.0617140I

a = −26.0966 + 4.5514I

b = −0.332012 − 0.710988I

5.14104 − 3.45107I 1.85198 + 12.31156I

u = −0.0287121 − 0.0617140I

a = −26.0966 − 4.5514I

b = −0.332012 + 0.710988I

5.14104 + 3.45107I 1.85198 − 12.31156I

II.

= h−u

−u

+· · ·+b+1, 2u

+· · ·+a−6u, u

+· · ·−2u−1i

(i) Arc colorings















−u

+ u





−2u

− u

+ ··· + 6u

+ 6u

+ u

+ ··· − 3u − 1





−u

+ 1

−u

+ 2u





−u

+ 11u

+ ··· + 3u − 1

+ u

+ ··· − 3u − 1





− u

+ ··· − 12u − 5

−u

+ u

+ ··· + 4u + 2





−2u

+ u

+ ··· − 4u − 1

−u

+ u

+ ··· + 2u + 3





−2u

+ u

+ ··· − 4u − 1

−5u

+ 2u

+ ··· + 6u + 6





−u

− u

+ ··· + 7u + 4

−3u

+ u

+ ··· + 5u + 1





+ u

+ ··· − 15u − 2

− 9u

+ ··· + 6u + 2



(ii) Obstruction class = 1

(iii) Cusp Shapes = 10u

− 6u

− 110u

+ 70u

+ 488u

− 325u

− 1118u

745u

+ 1405u

− 837u

− 967u

+ 345u

+ 383u

+ 54u

− 104u

− 30u − 7

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

− 2u

+ ··· − 6u − 1

+ 3u

+ ··· + 3u + 1

+ 6u

+ ··· + 5u + 1

− 2u

+ ··· + 3u

+ 1

− 3u

+ ··· + 3u − 1

− u

+ ··· + u − 1

+ 2u

+ ··· − 3u

− 1

, c

+ u

+ ··· − 2u − 1

+ 6u

+ ··· + 5u − 1

+ u

+ ··· + u + 1

− u

+ ··· − 2u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

+ 4y

+ ··· − 26y −1

, c

− 9y

+ ··· − y −1

, c

+ 12y

+ ··· − y −1

, c

+ 14y

+ ··· − 6y −1

, c

− 15y

+ ··· − 11y −1

, c

− 23y

+ ··· − 10y −1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.814883 + 0.146214I

a = −0.160618 + 1.013790I

b = −0.571946 − 0.823470I

−1.33985 − 2.24720I −5.95506 + 5.95440I

u = 0.814883 − 0.146214I

a = −0.160618 − 1.013790I

b = −0.571946 + 0.823470I

−1.33985 + 2.24720I −5.95506 − 5.95440I

u = 1.095140 + 0.425247I

a = 0.092570 + 1.009470I

b = −0.455837 − 0.491181I

−1.08205 − 2.27893I −6.70496 + 1.73929I

u = 1.095140 − 0.425247I

a = 0.092570 − 1.009470I

b = −0.455837 + 0.491181I

−1.08205 + 2.27893I −6.70496 − 1.73929I

u = −1.275130 + 0.141662I

a = 0.37799 + 2.40221I

b = 0.219893 − 0.781229I

1.94744 + 4.76023I 2.64985 − 7.50749I

u = −1.275130 − 0.141662I

a = 0.37799 − 2.40221I

b = 0.219893 + 0.781229I

1.94744 − 4.76023I 2.64985 + 7.50749I

u = −1.360960 + 0.148840I

a = −0.176402 − 0.162239I

b = 0.183220 + 1.287410I

3.94456 + 3.04243I −0.60355 − 3.01266I

u = −1.360960 − 0.148840I

a = −0.176402 + 0.162239I

b = 0.183220 − 1.287410I

3.94456 − 3.04243I −0.60355 + 3.01266I

u = 1.42974 + 0.17726I

a = 0.068411 − 1.219830I

b = −0.04806 + 1.42695I

3.20138 − 0.56588I −0.308792 − 0.292572I

u = 1.42974 − 0.17726I

a = 0.068411 + 1.219830I

b = −0.04806 − 1.42695I

3.20138 + 0.56588I −0.308792 + 0.292572I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.361683 + 0.406042I

a = −2.74838 + 0.48990I

b = 0.271380 + 0.625613I

5.13097 − 2.92831I 1.67399 − 2.10848I

u = −0.361683 − 0.406042I

a = −2.74838 − 0.48990I

b = 0.271380 − 0.625613I

5.13097 + 2.92831I 1.67399 + 2.10848I

u = −0.067162 + 0.319437I

a = −2.12846 + 2.03319I

b = 0.101807 − 1.385190I

8.35935 − 1.32853I 8.08277 − 1.45889I

u = −0.067162 − 0.319437I

a = −2.12846 − 2.03319I

b = 0.101807 + 1.385190I

8.35935 + 1.32853I 8.08277 + 1.45889I

u = −1.68979 + 0.08907I

a = −0.307853 − 0.828725I

b = −0.95599 + 1.10192I

−10.26660 + 3.59650I −5.48002 − 1.90134I

u = −1.68979 − 0.08907I

a = −0.307853 + 0.828725I

b = −0.95599 − 1.10192I

−10.26660 − 3.59650I −5.48002 + 1.90134I

u = 1.82991

a = −0.0345207

b = 0.511063

−3.34108 −21.7080

III. u-Polynomials

Crossings u-Polynomials at each crossing

− 2u

+ ··· − 6u − 1)(u

− 9u

+ ··· + 27964u − 1601)

+ 3u

+ ··· + 3u + 1)(u

− 2u

+ ··· + 273u + 131)

+ 6u

+ ··· + 5u + 1)(u

− u

+ ··· + 455u + 47)

− 2u

+ ··· + 3u

+ 1)(u

− 3u

+ ··· + 6u − 1)

− 3u

+ ··· + 3u − 1)(u

− 2u

+ ··· + 273u + 131)

− u

+ ··· + u − 1)(u

− 14u

+ ··· − 1895u + 425)

+ 2u

+ ··· − 3u

− 1)(u

− 3u

+ ··· + 6u − 1)

, c

+ u

+ ··· − 2u − 1)(u

+ 4u

+ ··· − 18u + 1)

+ 6u

+ ··· + 5u − 1)(u

− u

+ ··· + 455u + 47)

+ u

+ ··· + u + 1)(u

− 14u

+ ··· − 1895u + 425)

− u

+ ··· − 2u + 1)(u

+ 4u

+ ··· − 18u + 1)

IV. Riley Polynomials

Crossings Riley Polynomials at each crossing

+ 4y

+ ··· − 26y −1)

· (y

− 69y

+ ··· + 3606192y + 2563201)

, c

− 9y

+ ··· − y −1)(y

− 26y

+ ··· − 263693y + 17161)

, c

+ 12y

+ ··· − y −1)(y

+ 19y

+ ··· − 52301y + 2209)

, c

+ 14y

+ ··· − 6y −1)(y

+ 13y

+ ··· − 80y + 1)

, c

− 15y

+ ··· − 11y −1)

· (y

− 28y

+ ··· − 3054675y + 180625)

, c

− 23y

+ ··· − 10y −1)(y

− 68y

+ ··· + 260y + 1)