12n

0116

(K12n

0116

)

A knot diagram

Linearized knot diagam

3 5 6 2 10 3 12 11 5 7 8 9

Solving Sequence

5,9

3,6

7 11 2 1 4 8 12

, c

Ideals for irreducible components

of X

par

= h−1.49041 × 10

− 1.63923 × 10

+ ··· + 4.94994 × 10

b + 1.35928 × 10

− 1.49041 × 10

− 1.63923 × 10

+ ··· + 4.94994 × 10

a + 1.35928 × 10

, u

+ 2u

+ ··· − u − 1i

= h−u

+ u

+ 3u

− 2u

+ b − u − 1, −u

+ u

+ 3u

− 2u

+ a − 2u − 1, u

− u

− 3u

+ 2u

+ u − 1i

* 2 irreducible components of dim

= 0, with total 47 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.

= h−1.49×10

−1.64×10

+· · ·+4.95×10

b+1.36×10

, −1.49×

−1.64×10

+· · ·+4.95×10

a+1.36×10

, u

+2u

+· · ·−u−1i

(i) Arc colorings











−u





0.301096u

+ 0.331162u

+ ··· + 2.34511u − 0.274605

0.301096u

+ 0.331162u

+ ··· + 3.34511u − 0.274605





−u

+ u





−0.501619u

− 0.639447u

+ ··· + 0.896473u + 0.455440

−0.458393u

− 0.639616u

+ ··· + 0.799469u + 0.637044





−0.205384u

− 0.351951u

+ ··· + 0.606975u + 1.47006

−0.559530u

− 0.970963u

+ ··· + 1.39792u + 1.11199





0.301096u

+ 0.331162u

+ ··· + 2.34511u − 0.274605

0.0224886u

− 0.0444496u

+ ··· + 3.31504u − 0.00357471





0.110835u

− 0.0229094u

+ ··· − 0.234831u + 0.545396

−0.390784u

− 0.662356u

+ ··· + 0.661642u + 1.00084





0.257870u

+ 0.331331u

+ ··· + 2.44211u − 0.456209

0.313467u

+ 0.443108u

+ ··· + 3.39872u − 0.542830





−0.659770u

− 1.09530u

+ ··· + 1.32120u + 1.69134

−0.119568u

+ 0.0303721u

+ ··· − 0.186514u − 1.02623





0.501619u

+ 0.639447u

+ ··· − 0.896473u − 0.455440

−0.390784u

− 0.662356u

+ ··· + 0.661642u + 1.00084



(ii) Obstruction class = −1

(iii) Cusp Shapes = −4.91398u

− 6.25021u

+ ··· − 14.4903u + 31.2535

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

+ 47u

+ ··· + 296u + 1

, c

− 7u

+ ··· − 12u + 1

, c

+ 7u

+ ··· + 640u − 64

, c

+ 2u

+ ··· − u − 1

, c

+ 2u

+ ··· + u + 1

, c

− 2u

+ ··· − 47u + 17

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

− 99y

+ ··· + 111528y −1

, c

− 47y

+ ··· + 296y −1

, c

+ 39y

+ ··· + 90112y −4096

, c

+ 42y

+ ··· + 7y −1

, c

+ 36y

+ ··· + 7y −1

, c

− 12y

+ ··· − 2041y −289

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.546127 + 0.811291I

a = 0.743645 − 1.202480I

b = 0.197518 − 0.391191I

−4.83591 − 7.62929I 1.63110 + 8.21040I

u = −0.546127 − 0.811291I

a = 0.743645 + 1.202480I

b = 0.197518 + 0.391191I

−4.83591 + 7.62929I 1.63110 − 8.21040I

u = 0.559771 + 0.753240I

a = −0.624352 − 1.085930I

b = −0.064581 − 0.332685I

0.18158 + 4.25829I 7.22708 − 8.04646I

u = 0.559771 − 0.753240I

a = −0.624352 + 1.085930I

b = −0.064581 + 0.332685I

0.18158 − 4.25829I 7.22708 + 8.04646I

u = −0.664122 + 0.603424I

a = 0.468587 − 0.663053I

b = −0.195535 − 0.059628I

−2.14123 − 1.43316I 6.02200 + 3.64151I

u = −0.664122 − 0.603424I

a = 0.468587 + 0.663053I

b = −0.195535 + 0.059628I

−2.14123 + 1.43316I 6.02200 − 3.64151I

u = 0.350975 + 0.790999I

a = −0.39756 − 1.62860I

b = −0.046582 − 0.837603I

−6.73300 + 0.22938I −2.25086 − 2.33731I

u = 0.350975 − 0.790999I

a = −0.39756 + 1.62860I

b = −0.046582 + 0.837603I

−6.73300 − 0.22938I −2.25086 + 2.33731I

u = 0.087719 + 0.850756I

a = −0.12108 − 2.10269I

b = −0.033358 − 1.251940I

−8.03114 + 3.86698I −3.56668 − 3.96784I

u = 0.087719 − 0.850756I

a = −0.12108 + 2.10269I

b = −0.033358 + 1.251940I

−8.03114 − 3.86698I −3.56668 + 3.96784I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.445566 + 0.616611I

a = 0.112439 − 1.137990I

b = −0.333128 − 0.521377I

−1.53709 − 1.40851I 1.34634 + 3.01002I

u = −0.445566 − 0.616611I

a = 0.112439 + 1.137990I

b = −0.333128 + 0.521377I

−1.53709 + 1.40851I 1.34634 − 3.01002I

u = −0.090722 + 0.752674I

a = 0.05605 − 1.99845I

b = −0.034673 − 1.245770I

−2.86548 − 1.28813I 1.16839 + 4.84793I

u = −0.090722 − 0.752674I

a = 0.05605 + 1.99845I

b = −0.034673 + 1.245770I

−2.86548 + 1.28813I 1.16839 − 4.84793I

u = −0.527293 + 0.436682I

a = −0.973519 − 0.176954I

b = −1.50081 + 0.25973I

−4.01492 + 3.79256I 2.77393 − 0.06472I

u = −0.527293 − 0.436682I

a = −0.973519 + 0.176954I

b = −1.50081 − 0.25973I

−4.01492 − 3.79256I 2.77393 + 0.06472I

u = 0.468495 + 0.464998I

a = 0.622134 − 0.271062I

b = 1.090630 + 0.193936I

0.599224 − 0.610593I 8.50615 − 0.01136I

u = 0.468495 − 0.464998I

a = 0.622134 + 0.271062I

b = 1.090630 − 0.193936I

0.599224 + 0.610593I 8.50615 + 0.01136I

u = −0.325958 + 0.548034I

a = −0.267538 + 0.084708I

b = −0.593496 + 0.632743I

−2.79420 − 2.18222I 4.51636 + 3.99594I

u = −0.325958 − 0.548034I

a = −0.267538 − 0.084708I

b = −0.593496 − 0.632743I

−2.79420 + 2.18222I 4.51636 − 3.99594I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.397250 + 0.182037I

a = −0.506275 − 0.004273I

b = 0.890974 + 0.177764I

2.57061 + 4.43167I 14.03660 + 0.I

u = 1.397250 − 0.182037I

a = −0.506275 + 0.004273I

b = 0.890974 − 0.177764I

2.57061 − 4.43167I 14.03660 + 0.I

u = −1.41231

a = 0.496036

b = −0.916272

6.54065 18.5250

u = 0.487776 + 0.155470I

a = 2.02925 − 0.39422I

b = 2.51703 − 0.23875I

−4.99926 + 2.47497I 10.9995 − 16.9397I

u = 0.487776 − 0.155470I

a = 2.02925 + 0.39422I

b = 2.51703 + 0.23875I

−4.99926 − 2.47497I 10.9995 + 16.9397I

u = 0.497461

a = −0.110298

b = 0.387162

0.683544 14.8150

u = −1.05090 + 1.14678I

a = 0.504687 + 0.968425I

b = −0.54621 + 2.11520I

−11.9065 − 13.7324I 0

u = −1.05090 − 1.14678I

a = 0.504687 − 0.968425I

b = −0.54621 − 2.11520I

−11.9065 + 13.7324I 0

u = 1.05595 + 1.16152I

a = −0.501764 + 0.917028I

b = 0.55418 + 2.07855I

−6.55369 + 9.57234I 0

u = 1.05595 − 1.16152I

a = −0.501764 − 0.917028I

b = 0.55418 − 2.07855I

−6.55369 − 9.57234I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.10127 + 1.14227I

a = −0.673483 + 0.861835I

b = 0.42779 + 2.00411I

−16.5464 + 4.1585I 0

u = 1.10127 − 1.14227I

a = −0.673483 − 0.861835I

b = 0.42779 − 2.00411I

−16.5464 − 4.1585I 0

u = −1.07763 + 1.17451I

a = 0.535143 + 0.849624I

b = −0.54248 + 2.02413I

−8.52808 − 4.96231I 0

u = −1.07763 − 1.17451I

a = 0.535143 − 0.849624I

b = −0.54248 − 2.02413I

−8.52808 + 4.96231I 0

u = −1.16301 + 1.12527I

a = 0.754065 + 0.641582I

b = −0.40895 + 1.76685I

−11.60780 + 5.44383I 0

u = −1.16301 − 1.12527I

a = 0.754065 − 0.641582I

b = −0.40895 − 1.76685I

−11.60780 − 5.44383I 0

u = −0.373875

a = −2.77728

b = −3.15116

−0.771990 64.9410

u = −1.13639 + 1.17348I

a = 0.623222 + 0.717077I

b = −0.51317 + 1.89056I

−8.37413 − 3.52292I 0

u = −1.13639 − 1.17348I

a = 0.623222 − 0.717077I

b = −0.51317 − 1.89056I

−8.37413 + 3.52292I 0

u = 1.16288 + 1.15013I

a = −0.687885 + 0.655673I

b = 0.47499 + 1.80580I

−6.27214 − 1.18033I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.16288 − 1.15013I

a = −0.687885 − 0.655673I

b = 0.47499 − 1.80580I

−6.27214 + 1.18033I 0

II. I

= h−u

+ u

+ 3u

− 2u

+ b − u − 1, −u

+ u

+ 3u

− 2u

+ a −

2u − 1, u

− u

− 3u

+ 2u

+ u − 1i

(i) Arc colorings











−u





− u

− 3u

+ 2u

+ 2u + 1

− u

− 3u

+ 2u

+ u + 1





−u

+ u





−u

+ u





−u

+ 1

− 2u





− u

− 3u

+ 2u

+ 2u + 1

− u

− 3u

+ 2u

+ 1





−u





− u

− 3u

+ 2u

+ 2u + 1

− u

− 3u

+ 2u

+ u + 1





−u

+ 2u

+ u

− 3u

+ u





−u



(ii) Obstruction class = 1

(iii) Cusp Shapes = −7u

+ 3u

+ 19u

− 5u

− 8u − 6

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

(u − 1)

, c

(u + 1)

+ u

− 3u

− 2u

+ 2u

− u − 1

, c

− u

+ 3u

− 2u

+ 2u

− u − 1

, c

− u

− 3u

+ 2u

+ u − 1

+ u

+ 3u

+ 2u

+ u − 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

(y −1)

, c

− 7y

+ 17y

− 16y

+ 6y

− 5y + 1

, c

+ 5y

+ 9y

+ 4y

− 6y

− 5y + 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.493180 + 0.575288I

a = −0.858925 − 1.001920I

b = −0.36575 − 1.57721I

−4.60518 − 1.97241I 3.78159 + 4.50121I

u = −0.493180 − 0.575288I

a = −0.858925 + 1.001920I

b = −0.36575 + 1.57721I

−4.60518 + 1.97241I 3.78159 − 4.50121I

u = 0.483672

a = 2.06752

b = 1.58384

−0.906083 −8.91030

u = 1.52087 + 0.16310I

a = 0.650045 − 0.069710I

b = −0.870821 − 0.232805I

2.05064 + 4.59213I −0.56679 − 5.39767I

u = 1.52087 − 0.16310I

a = 0.650045 + 0.069710I

b = −0.870821 + 0.232805I

2.05064 − 4.59213I −0.56679 + 5.39767I

u = −1.53904

a = −0.649754

b = 0.889289

6.01515 2.48070

III. u-Polynomials

Crossings u-Polynomials at each crossing

((u − 1)

)(u

+ 47u

+ ··· + 296u + 1)

((u − 1)

)(u

− 7u

+ ··· − 12u + 1)

, c

+ 7u

+ ··· + 640u − 64)

((u + 1)

)(u

− 7u

+ ··· − 12u + 1)

+ u

− 3u

− 2u

+ 2u

− u − 1)(u

+ 2u

+ ··· − u − 1)

, c

− u

+ 3u

− 2u

+ 2u

− u − 1)(u

+ 2u

+ ··· + u + 1)

− u

− 3u

+ 2u

+ u − 1)(u

+ 2u

+ ··· − u − 1)

, c

− u

− 3u

+ 2u

+ u − 1)(u

− 2u

+ ··· − 47u + 17)

+ u

+ 3u

+ 2u

+ u − 1)(u

+ 2u

+ ··· + u + 1)

IV. Riley Polynomials

Crossings Riley Polynomials at each crossing

((y −1)

)(y

− 99y

+ ··· + 111528y −1)

, c

((y −1)

)(y

− 47y

+ ··· + 296y −1)

, c

+ 39y

+ ··· + 90112y −4096)

, c

− 7y

+ ··· − 5y + 1)(y

+ 42y

+ ··· + 7y −1)

, c

+ 5y

+ ··· − 5y + 1)(y

+ 36y

+ ··· + 7y −1)

, c

− 7y

+ 17y

− 16y

+ 6y

− 5y + 1)

· (y

− 12y

+ ··· − 2041y −289)