12n

0344

(K12n

0344

)

A knot diagram

Linearized knot diagam

3 6 8 7 2 11 3 4 12 6 9 10

Solving Sequence

3,7

8 4

9,11

6 2 1 5 10 12

, c

Ideals for irreducible components

of X

par

= h−1.57884 × 10

+ 4.19415 × 10

+ ··· + 3.14492 × 10

b + 2.00463 × 10

5.51340 × 10

− 1.47280 × 10

+ ··· + 3.14492 × 10

a − 7.82161 × 10

, u

− 3u

+ ··· − 36u + 4i

= hau + b + 2a + 1, 2a

− au + 2a + 2u − 3, u

− 2i

= ha, b + v −2, v

− 3v + 1i

* 3 irreducible components of dim

= 0, with total 50 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−1.58 × 10

+ 4.19 × 10

+ · · · + 3.14 × 10

b + 2.00 ×

, 5.51 × 10

− 1.47 × 10

+ · · · + 3.14 × 10

a − 7.82 ×

, u

− 3u

+ · · · − 36u + 4i

(i) Arc colorings











−u





−u

+ u





−u

+ 1

− 2u





−17.5312u

+ 46.8311u

+ ··· − 1316.37u + 248.706

5.02029u

− 13.3363u

+ ··· + 367.657u − 63.7420





3.47461u

− 10.7515u

+ ··· + 355.136u − 74.5401

−1.68885u

+ 5.62072u

+ ··· − 173.747u + 30.1506





−9.86564u

+ 26.8155u

+ ··· − 755.031u + 138.369

−4.70217u

+ 10.4432u

+ ··· − 226.148u + 33.6781





−9.86564u

+ 26.8155u

+ ··· − 755.031u + 138.369

−4.03012u

+ 8.38511u

+ ··· − 165.479u + 22.5523





−u

+ 2u

−u

+ u





−19.4067u

+ 52.8978u

+ ··· − 1495.34u + 274.133

−4.36737u

+ 8.86394u

+ ··· − 164.017u + 21.4464





−15.0159u

+ 40.6500u

+ ··· − 1164.20u + 225.930

5.45610u

− 13.6789u

+ ··· + 357.423u − 61.0333



(ii) Obstruction class = −1

(iii) Cusp Shapes = −58.5401u

+ 159.424u

+ ··· − 4534.07u + 846.150

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

+ 45u

+ ··· + 4203u + 81

, c

+ 3u

+ ··· + 21u − 9

, c

− 3u

+ ··· − 36u + 4

+ 9u

+ ··· + 1500u − 964

, c

+ 2u

+ ··· + 10u + 1

, c

+ 4u

+ ··· − 18u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

− 85y

+ ··· − 6110883y + 6561

, c

− 45y

+ ··· − 4203y + 81

, c

− 39y

+ ··· − 368y + 16

+ 21y

+ ··· − 41187888y + 929296

, c

− 12y

+ ··· − 58y + 1

, c

− 36y

+ ··· − 242y + 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.361562 + 0.932667I

a = 0.23727 − 1.40400I

b = 0.961486 − 1.024300I

−4.54866 − 9.17617I 5.81808 + 6.48451I

u = −0.361562 − 0.932667I

a = 0.23727 + 1.40400I

b = 0.961486 + 1.024300I

−4.54866 + 9.17617I 5.81808 − 6.48451I

u = 0.242419 + 0.963914I

a = 0.542404 + 0.771039I

b = 0.650253 + 0.479584I

2.03227 + 3.85207I 10.41827 − 8.61488I

u = 0.242419 − 0.963914I

a = 0.542404 − 0.771039I

b = 0.650253 − 0.479584I

2.03227 − 3.85207I 10.41827 + 8.61488I

u = −0.155342 + 0.896950I

a = −0.31935 + 1.38694I

b = −0.99704 + 1.03670I

−8.52514 − 3.75610I 2.09209 + 2.89832I

u = −0.155342 − 0.896950I

a = −0.31935 − 1.38694I

b = −0.99704 − 1.03670I

−8.52514 + 3.75610I 2.09209 − 2.89832I

u = 1.125730 + 0.043899I

a = 0.058942 + 0.745233I

b = 0.556341 + 0.553872I

1.99922 − 0.04818I 6.00000 + 0.I

u = 1.125730 − 0.043899I

a = 0.058942 − 0.745233I

b = 0.556341 − 0.553872I

1.99922 + 0.04818I 6.00000 + 0.I

u = −0.851420 + 0.746270I

a = −0.677609 − 0.190566I

b = −0.609425 − 0.874938I

−3.05540 + 3.53185I 6.00000 + 0.I

u = −0.851420 − 0.746270I

a = −0.677609 + 0.190566I

b = −0.609425 + 0.874938I

−3.05540 − 3.53185I 6.00000 + 0.I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.060206 + 0.789681I

a = 0.420124 − 1.337940I

b = 1.05150 − 1.02729I

−4.31168 + 1.72166I 4.04968 − 1.22187I

u = 0.060206 − 0.789681I

a = 0.420124 + 1.337940I

b = 1.05150 + 1.02729I

−4.31168 − 1.72166I 4.04968 + 1.22187I

u = −1.104880 + 0.498321I

a = 0.424315 + 0.083138I

b = 0.625620 + 1.104260I

−5.61992 − 1.18304I 0

u = −1.104880 − 0.498321I

a = 0.424315 − 0.083138I

b = 0.625620 − 1.104260I

−5.61992 + 1.18304I 0

u = 1.22068

a = −1.07819

b = 1.88874

10.3320 0

u = 1.218830 + 0.333934I

a = 1.13833 − 0.87054I

b = −1.31850 − 0.66505I

−0.76043 + 2.33473I 0

u = 1.218830 − 0.333934I

a = 1.13833 + 0.87054I

b = −1.31850 + 0.66505I

−0.76043 − 2.33473I 0

u = −1.271900 + 0.268067I

a = −0.553133 − 1.124420I

b = 0.895901 − 0.644934I

2.75377 − 4.58010I 0

u = −1.271900 − 0.268067I

a = −0.553133 + 1.124420I

b = 0.895901 + 0.644934I

2.75377 + 4.58010I 0

u = −1.305420 + 0.064505I

a = 1.20456 + 0.91583I

b = −0.813618 + 0.359887I

5.20530 − 0.47373I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −1.305420 − 0.064505I

a = 1.20456 − 0.91583I

b = −0.813618 − 0.359887I

5.20530 + 0.47373I 0

u = 1.310900 + 0.166284I

a = −0.028578 + 0.886239I

b = −0.526233 + 0.907268I

5.87917 + 2.87968I 0

u = 1.310900 − 0.166284I

a = −0.028578 − 0.886239I

b = −0.526233 − 0.907268I

5.87917 − 2.87968I 0

u = −1.310400 + 0.345353I

a = −0.233101 − 0.138958I

b = −0.79762 − 1.32164I

−0.02123 − 5.81626I 0

u = −1.310400 − 0.345353I

a = −0.233101 + 0.138958I

b = −0.79762 + 1.32164I

−0.02123 + 5.81626I 0

u = −1.39785

a = 8.91764

b = −0.188474

4.90257 0

u = −0.006322 + 0.581193I

a = −0.89655 − 1.33079I

b = −0.503249 − 0.484782I

−1.17226 + 1.37524I 0.82630 − 4.37313I

u = −0.006322 − 0.581193I

a = −0.89655 + 1.33079I

b = −0.503249 + 0.484782I

−1.17226 − 1.37524I 0.82630 + 4.37313I

u = 1.37514 + 0.39616I

a = −0.881677 + 1.000200I

b = 1.24438 + 0.87011I

−3.70647 + 8.39508I 0

u = 1.37514 − 0.39616I

a = −0.881677 − 1.000200I

b = 1.24438 − 0.87011I

−3.70647 − 8.39508I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.33260 + 0.53021I

a = −0.126765 − 0.487206I

b = −0.626528 − 0.301390I

5.26881 + 2.02524I 0

u = 1.33260 − 0.53021I

a = −0.126765 + 0.487206I

b = −0.626528 + 0.301390I

5.26881 − 2.02524I 0

u = 1.45079

a = 0.972042

b = −0.251576

3.37301 0

u = −1.45928

a = −0.521642

b = 1.51795

13.6404 0

u = −1.41359 + 0.38694I

a = 0.320048 + 0.993129I

b = −0.997773 + 0.724464I

7.26218 − 8.61162I 0

u = −1.41359 − 0.38694I

a = 0.320048 − 0.993129I

b = −0.997773 − 0.724464I

7.26218 + 8.61162I 0

u = 1.48503 + 0.37724I

a = 0.730260 − 1.019420I

b = −1.20624 − 0.98697I

1.34332 + 13.91980I 0

u = 1.48503 − 0.37724I

a = 0.730260 + 1.019420I

b = −1.20624 + 0.98697I

1.34332 − 13.91980I 0

u = −0.115716 + 0.402697I

a = −0.38670 + 2.62883I

b = 0.377022 + 0.479190I

1.42746 − 0.71018I 6.25077 − 1.25816I

u = −0.115716 − 0.402697I

a = −0.38670 − 2.62883I

b = 0.377022 − 0.479190I

1.42746 + 0.71018I 6.25077 + 1.25816I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.339286

a = −1.00783

b = −1.53932

7.49147 26.0080

u = 0.302786

a = −0.689575

b = 0.583905

0.759214 14.0520

u = 0.266557

a = 9.48986

b = −0.525421

−0.455563 39.4620

u = 1.76844

a = −0.0279231

b = 0.581616

6.40427 0

II. I

= hau + b + 2a + 1, 2a

− au + 2a + 2u − 3, u

− 2i

(i) Arc colorings











−2





−u





−1





−au − 2a − 1





au + 2a + 2





au + 2a + u + 2





au + 2a + 2





−u





au + 2a +

au + 2a + 2





−au − a − 1

−au − 2a − 1



(ii) Obstruction class = 1

(iii) Cusp Shapes = 12

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

(u − 1)

(u + 1)

, c

− 2)

, c

+ u − 1)

, c

− u − 1)

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

(y −1)

, c

(y −2)

, c

− 3y + 1)

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.41421

a = −0.473911

b = 0.618034

4.27683 12.0000

u = 1.41421

a = 0.181018

b = −1.61803

12.1725 12.0000

u = −1.41421

a = 1.05505

b = −1.61803

12.1725 12.0000

u = −1.41421

a = −2.76216

b = 0.618034

4.27683 12.0000

III. I

= ha, b + v − 2, v

− 3v + 1i

(i) Arc colorings























−v + 2





−v + 3





v − 1

v − 3





−1

v − 3









v − 2

v − 3





−v + 2



(ii) Obstruction class = 1

(iii) Cusp Shapes = −6

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

(u − 1)

, c

(u + 1)

, c

− u − 1

, c

+ u − 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

(y − 1)

, c

− 3y + 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

v = 0.381966

a = 0

b = 1.61803

7.23771 −6.00000

v = 2.61803

a = 0

b = −0.618034

−0.657974 −6.00000

IV. u-Polynomials

Crossings u-Polynomials at each crossing

((u − 1)

)(u

+ 45u

+ ··· + 4203u + 81)

((u − 1)

)(u + 1)

+ 3u

+ ··· + 21u − 9)

, c

− 2)

− 3u

+ ··· − 36u + 4)

− 2)

+ 9u

+ ··· + 1500u − 964)

((u − 1)

)(u + 1)

+ 3u

+ ··· + 21u − 9)

− u − 1)(u

+ u − 1)

+ 2u

+ ··· + 10u + 1)

((u

− u − 1)

)(u

+ 4u

+ ··· − 18u + 1)

((u

− u − 1)

)(u

+ u − 1)(u

+ 2u

+ ··· + 10u + 1)

, c

((u

+ u − 1)

)(u

+ 4u

+ ··· − 18u + 1)

V. Riley Polynomials

Crossings Riley Polynomials at each crossing

((y − 1)

)(y

− 85y

+ ··· − 6110883y + 6561)

, c

((y − 1)

)(y

− 45y

+ ··· − 4203y + 81)

, c

(y − 2)

− 39y

+ ··· − 368y + 16)

(y − 2)

+ 21y

+ ··· − 4.11879 × 10

y + 929296)

, c

((y

− 3y + 1)

)(y

− 12y

+ ··· − 58y + 1)

, c

((y

− 3y + 1)

)(y

− 36y

+ ··· − 242y + 1)