12n

0049

(K12n

0049

)

A knot diagram

Linearized knot diagam

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

Solving Sequence

2,6

5 3

1,11

10 7 9 4 8 12

, c

Ideals for irreducible components

of X

par

= h−484296105u

− 876453979u

+ ··· + 5825897536b + 2936630968,

2622553061u

+ 6852014457u

+ ··· + 11651795072a + 6583505056, u

+ 2u

+ ··· − 3u + 4i

= h−6a

u + 44a

− 29a

u + 50a

− 44au + 61b − 23a + 26u − 28,

− 2a

u + 5a

− 2a

u + 4au − 6a + 5u − 3, u

− u + 1i

= h26u

+ 8a

− 12u

a + 15a

u − 31u

a − 12u

+ 6a

+ 4au + 40u

+ 71b − 41a + 4u + 30,

+ 4a

− 2u

a + a

+ 4a

u − 5u

a − u

− 7au − u

− 5a + u + 2, u

+ u

+ 1i

* 3 irreducible components of dim

= 0, with total 56 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−4.84 × 10

− 8.76 × 10

+ · · · + 5.83 × 10

b + 2.94 × 10

, 2.62 ×

+6.85×10

+· · ·+1.17×10

a+6.58×10

, u

+2u

+· · ·−3u+4i

(i) Arc colorings















+ u





+ u





−0.225077u

− 0.588065u

+ ··· − 2.43489u − 0.565021

0.0831282u

+ 0.150441u

+ ··· − 0.808963u − 0.504065





−0.308205u

− 0.738506u

+ ··· − 1.62593u − 0.0609557

0.0831282u

+ 0.150441u

+ ··· − 0.808963u − 0.504065





0.00526049u

+ 0.0984092u

+ ··· − 1.00467u + 1.90403

−0.130367u

− 0.265551u

+ ··· + 0.257479u − 0.749489





−0.315652u

− 0.320533u

+ ··· − 3.86030u + 1.93751

−0.213900u

− 0.524671u

+ ··· + 1.76935u − 2.11821





−u

+ u





−0.448719u

− 0.603542u

+ ··· − 4.28587u + 1.06239

−0.174790u

− 0.478417u

+ ··· + 2.25099u − 2.05071





0.0695792u

+ 0.105837u

+ ··· − 0.289164u + 0.533612

0.106950u

+ 0.199836u

+ ··· + 0.0528230u + 0.809104



(ii) Obstruction class = −1

(iii) Cusp Shapes =

1359975379

2912948768

808893889

1456474384

+ ··· +

371799183

2912948768

u −

4242546469

728237192

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

+ 10u

+ ··· + 255u + 16

, c

+ 2u

+ ··· − 3u + 4

− 2u

+ ··· + 110445u + 62564

, c

− 2u

+ ··· − 3584u + 2048

, c

+ 3u

+ ··· + 4u + 1

, c

+ 3u

+ ··· + 2u + 1

− 23u

+ ··· − 6u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

+ 34y

+ ··· + 19807y + 256

, c

+ 10y

+ ··· + 255y + 16

+ 58y

+ ··· + 87628895247y + 3914254096

, c

+ 30y

+ ··· + 13893632y + 4194304

, c

+ 27y

+ ··· + 6y + 1

, c

+ 23y

+ ··· + 6y + 1

− 17y

+ ··· + 6y + 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.171600 + 1.110920I

a = −0.204619 + 1.345050I

b = −0.216810 − 1.196860I

−4.27639 + 3.16772I −7.58797 − 3.35954I

u = 0.171600 − 1.110920I

a = −0.204619 − 1.345050I

b = −0.216810 + 1.196860I

−4.27639 − 3.16772I −7.58797 + 3.35954I

u = 1.085660 + 0.293972I

a = 0.392792 − 0.045820I

b = 0.334592 + 0.680226I

4.30159 + 1.64830I 7.39222 − 3.81709I

u = 1.085660 − 0.293972I

a = 0.392792 + 0.045820I

b = 0.334592 − 0.680226I

4.30159 − 1.64830I 7.39222 + 3.81709I

u = −0.312081 + 0.807793I

a = 1.53056 + 0.47632I

b = −0.04471 − 1.51818I

−7.22153 + 1.57633I −9.02842 − 6.04950I

u = −0.312081 − 0.807793I

a = 1.53056 − 0.47632I

b = −0.04471 + 1.51818I

−7.22153 − 1.57633I −9.02842 + 6.04950I

u = 0.633550 + 0.959306I

a = 1.67177 + 0.11512I

b = 0.190966 + 0.946097I

−1.10855 + 3.29892I −6.24385 − 2.89898I

u = 0.633550 − 0.959306I

a = 1.67177 − 0.11512I

b = 0.190966 − 0.946097I

−1.10855 − 3.29892I −6.24385 + 2.89898I

u = 0.923008 + 0.689836I

a = −0.417168 − 0.169238I

b = −0.346298 + 0.404592I

3.90051 + 1.86347I 6.48131 − 1.21859I

u = 0.923008 − 0.689836I

a = −0.417168 + 0.169238I

b = −0.346298 − 0.404592I

3.90051 − 1.86347I 6.48131 + 1.21859I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.874677 + 0.761101I

a = −0.370685 − 0.647821I

b = −0.59935 − 1.30228I

3.00591 + 2.79905I −0.254837 − 1.357172I

u = −0.874677 − 0.761101I

a = −0.370685 + 0.647821I

b = −0.59935 + 1.30228I

3.00591 − 2.79905I −0.254837 + 1.357172I

u = −0.433561 + 0.706966I

a = −1.95347 − 0.21519I

b = −0.16134 + 1.55299I

−6.76494 − 4.64397I −3.32082 − 3.17287I

u = −0.433561 − 0.706966I

a = −1.95347 + 0.21519I

b = −0.16134 − 1.55299I

−6.76494 + 4.64397I −3.32082 + 3.17287I

u = 0.458151 + 0.676958I

a = 0.753522 − 0.718675I

b = 0.019557 − 0.666846I

−0.198612 + 1.374800I −3.09098 − 4.69147I

u = 0.458151 − 0.676958I

a = 0.753522 + 0.718675I

b = 0.019557 + 0.666846I

−0.198612 − 1.374800I −3.09098 + 4.69147I

u = 0.471893 + 1.096490I

a = 0.224206 + 0.323614I

b = 0.422956 − 0.007097I

1.60525 + 3.66384I 4.88856 − 3.83188I

u = 0.471893 − 1.096490I

a = 0.224206 − 0.323614I

b = 0.422956 + 0.007097I

1.60525 − 3.66384I 4.88856 + 3.83188I

u = −1.024050 + 0.695309I

a = 0.535986 + 0.556491I

b = 0.567012 + 1.295000I

7.75189 + 8.17134I 1.99685 − 4.00929I

u = −1.024050 − 0.695309I

a = 0.535986 − 0.556491I

b = 0.567012 − 1.295000I

7.75189 − 8.17134I 1.99685 + 4.00929I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.961809 + 0.820602I

a = 1.181150 + 0.495596I

b = 1.059240 − 0.084079I

11.48810 + 2.42769I 4.62667 − 0.56621I

u = −0.961809 − 0.820602I

a = 1.181150 − 0.495596I

b = 1.059240 + 0.084079I

11.48810 − 2.42769I 4.62667 + 0.56621I

u = −0.785168 + 1.017390I

a = −1.76172 − 0.30795I

b = −0.54057 + 1.40007I

2.20898 − 8.97826I −1.63229 + 5.82526I

u = −0.785168 − 1.017390I

a = −1.76172 + 0.30795I

b = −0.54057 − 1.40007I

2.20898 + 8.97826I −1.63229 − 5.82526I

u = −0.854722 + 1.028010I

a = 1.038600 + 0.610663I

b = 1.088070 − 0.034474I

10.81730 − 9.09210I 3.56135 + 5.43028I

u = −0.854722 − 1.028010I

a = 1.038600 − 0.610663I

b = 1.088070 + 0.034474I

10.81730 + 9.09210I 3.56135 − 5.43028I

u = −0.810811 + 1.108300I

a = 1.71062 + 0.36230I

b = 0.53618 − 1.37404I

6.4290 − 14.8448I 0.25659 + 8.03190I

u = −0.810811 − 1.108300I

a = 1.71062 − 0.36230I

b = 0.53618 + 1.37404I

6.4290 + 14.8448I 0.25659 − 8.03190I

u = 0.310580 + 1.362320I

a = 0.544180 − 0.799588I

b = 0.307951 + 1.137470I

−1.47960 + 6.60474I −1.77461 − 8.22994I

u = 0.310580 − 1.362320I

a = 0.544180 + 0.799588I

b = 0.307951 − 1.137470I

−1.47960 − 6.60474I −1.77461 + 8.22994I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.92557 + 1.09311I

a = −0.857998 + 0.114331I

b = −0.322915 − 0.915206I

2.65507 + 4.99154I 3.97038 − 7.84261I

u = 0.92557 − 1.09311I

a = −0.857998 − 0.114331I

b = −0.322915 + 0.915206I

2.65507 − 4.99154I 3.97038 + 7.84261I

u = −0.165244 + 0.479278I

a = −1.83465 − 0.61814I

b = −0.570372 + 0.472484I

0.02049 − 1.94674I −0.99192 + 2.87831I

u = −0.165244 − 0.479278I

a = −1.83465 + 0.61814I

b = −0.570372 − 0.472484I

0.02049 + 1.94674I −0.99192 − 2.87831I

u = 0.242112 + 0.308667I

a = 0.941920 − 0.135172I

b = −0.224155 − 0.681318I

−0.235696 + 1.266250I −2.12322 − 5.45165I

u = 0.242112 − 0.308667I

a = 0.941920 + 0.135172I

b = −0.224155 + 0.681318I

−0.235696 − 1.266250I −2.12322 + 5.45165I

II.

= h−6a

u − 29a

u + · · · − 23a − 28, −2a

u − 2a

u + · · · − 6a − 3, u

−u +1i

(i) Arc colorings











u − 1





u − 1





−1





0.0983607a

u + 0.475410a

u + ··· + 0.377049a + 0.459016





−0.0983607a

u − 0.475410a

u + ··· + 0.622951a − 0.459016

0.0983607a

u + 0.475410a

u + ··· + 0.377049a + 0.459016





1.18033a

u − 0.295082a

u + ··· + 0.524590a − 0.491803

−0.786885a

u + 0.196721a

u + ··· + 0.983607a + 2.32787





0.196721a

u + 0.950820a

u + ··· + 0.754098a + 0.918033

−1.44262a

u − 1.63934a

u + ··· − 0.196721a + 0.934426





u − 1





0.196721a

u + 0.950820a

u + ··· + 0.754098a + 0.918033

−1.44262a

u − 1.63934a

u + ··· − 0.196721a + 0.934426





0.393443a

u − 0.0983607a

u + ··· + 1.50820a − 0.163934

−0.786885a

u + 0.196721a

u + ··· + 0.983607a + 2.32787



(ii) Obstruction class = 1

(iii) Cusp Shapes =

u −

188

−

u −

136

−

au +

248

a −

344

u +

347

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

− u + 1)

+ u + 1)

, c

+ u

+ 3u

+ 2u + 1)

+ u

+ 1)

, c

− u

+ 3u

− 2u + 1)

− u

+ u

+ 1)

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ y + 1)

, c

+ 5y

+ 7y

+ 2y + 1)

, c

+ y

+ 3y

+ 2y + 1)

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.500000 + 0.866025I

a = −0.334772 + 0.902624I

b = −0.395123 + 0.506844I

0.211005 + 0.614778I 2.28131 + 2.56093I

u = 0.500000 + 0.866025I

a = 1.118210 − 0.202000I

b = −0.10488 + 1.55249I

−6.79074 − 1.13408I 0.84181 − 3.00733I

u = 0.500000 + 0.866025I

a = −1.212650 − 0.218250I

b = −0.395123 − 0.506844I

0.21101 + 3.44499I −0.06504 − 6.27596I

u = 0.500000 + 0.866025I

a = −1.57079 + 0.38365I

b = −0.10488 − 1.55249I

−6.79074 + 5.19385I −4.18309 − 10.81465I

u = 0.500000 − 0.866025I

a = −0.334772 − 0.902624I

b = −0.395123 − 0.506844I

0.211005 − 0.614778I 2.28131 − 2.56093I

u = 0.500000 − 0.866025I

a = 1.118210 + 0.202000I

b = −0.10488 − 1.55249I

−6.79074 + 1.13408I 0.84181 + 3.00733I

u = 0.500000 − 0.866025I

a = −1.212650 + 0.218250I

b = −0.395123 + 0.506844I

0.21101 − 3.44499I −0.06504 + 6.27596I

u = 0.500000 − 0.866025I

a = −1.57079 − 0.38365I

b = −0.10488 + 1.55249I

−6.79074 − 5.19385I −4.18309 + 10.81465I

III.

= h26u

−12u

a+· · ·−41a+30, 2u

−2u

a+· · ·−5a+2, u

+1i

(i) Arc colorings















+ u





+ u

+ 1





−0.366197a

+ 0.169014au

+ ··· + 0.577465a − 0.422535





0.366197a

− 0.169014au

+ ··· + 0.422535a + 0.422535

−0.366197a

+ 0.169014au

+ ··· + 0.577465a − 0.422535





−0.267606a

+ 0.661972au

+ ··· − 1.15493a + 0.845070

0.239437a

+ 0.197183au

+ ··· + 0.507042a + 0.507042





+ 1

−u

− u

− 1





−u

+ u









−0.366197a

+ 0.169014au

+ ··· − 0.422535a − 0.422535

0.366197a

− 0.169014au

+ ··· − 0.577465a + 0.422535



(ii) Obstruction class = −1

(iii) Cusp Shapes = −4u

− 4u − 2

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

+ u

+ 3u

+ 2u + 1)

, c

+ u

+ 1)

− u

+ 5u

+ u + 2)

, c

+ 4u

+ ··· − 2u + 1

− 8u

+ ··· − 10u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ 5y

+ 7y

+ 2y + 1)

, c

+ y

+ 3y

+ 2y + 1)

+ 9y

+ 31y

+ 19y + 4)

, c

+ 8y

+ ··· + 10y + 1

− 8y

+ ··· + 2y + 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.351808 + 0.720342I

a = 0.266204 − 0.424111I

b = −0.202218 − 0.425275I

−0.21101 + 1.41510I −1.82674 − 4.90874I

u = 0.351808 + 0.720342I

a = 1.61961 − 0.46490I

b = 0.169110 − 0.735861I

−0.21101 + 1.41510I −1.82674 − 4.90874I

u = 0.351808 + 0.720342I

a = −0.70433 − 3.80711I

b = 0.033108 + 1.161140I

−0.21101 + 1.41510I −1.82674 − 4.90874I

u = 0.351808 − 0.720342I

a = 0.266204 + 0.424111I

b = −0.202218 + 0.425275I

−0.21101 − 1.41510I −1.82674 + 4.90874I

u = 0.351808 − 0.720342I

a = 1.61961 + 0.46490I

b = 0.169110 + 0.735861I

−0.21101 − 1.41510I −1.82674 + 4.90874I

u = 0.351808 − 0.720342I

a = −0.70433 + 3.80711I

b = 0.033108 − 1.161140I

−0.21101 − 1.41510I −1.82674 + 4.90874I

u = −0.851808 + 0.911292I

a = −1.140580 − 0.606578I

b = −1.096690 + 0.070743I

6.79074 − 3.16396I 1.82674 + 2.56480I

u = −0.851808 + 0.911292I

a = 0.220330 + 0.512696I

b = 0.59056 + 1.34306I

6.79074 − 3.16396I 1.82674 + 2.56480I

u = −0.851808 + 0.911292I

a = 1.73877 + 0.20498I

b = 0.50613 − 1.41380I

6.79074 − 3.16396I 1.82674 + 2.56480I

u = −0.851808 − 0.911292I

a = −1.140580 + 0.606578I

b = −1.096690 − 0.070743I

6.79074 + 3.16396I 1.82674 − 2.56480I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.851808 − 0.911292I

a = 0.220330 − 0.512696I

b = 0.59056 − 1.34306I

6.79074 + 3.16396I 1.82674 − 2.56480I

u = −0.851808 − 0.911292I

a = 1.73877 − 0.20498I

b = 0.50613 + 1.41380I

6.79074 + 3.16396I 1.82674 − 2.56480I

IV. u-Polynomials

Crossings u-Polynomials at each crossing

− u + 1)

+ u

+ 3u

+ 2u + 1)

· (u

+ 10u

+ ··· + 255u + 16)

((u

+ u + 1)

)(u

+ u

+ 1)

+ 2u

+ ··· − 3u + 4)

− u + 1)

− u

+ 5u

+ u + 2)

· (u

− 2u

+ ··· + 110445u + 62564)

, c

+ u

+ 3u

+ 2u + 1)

− 2u

+ ··· − 3584u + 2048)

((u

− u + 1)

)(u

+ u

+ 1)

+ 2u

+ ··· − 3u + 4)

((u

+ u

+ 3u

+ 2u + 1)

)(u

+ 4u

+ ··· − 2u + 1)

· (u

+ 3u

+ ··· + 4u + 1)

((u

+ u

+ 1)

)(u

+ 4u

+ ··· − 2u + 1)(u

+ 3u

+ ··· + 2u + 1)

, c

((u

− u

+ 3u

− 2u + 1)

)(u

+ 4u

+ ··· − 2u + 1)

· (u

+ 3u

+ ··· + 4u + 1)

((u

− u

+ u

+ 1)

)(u

+ 4u

+ ··· − 2u + 1)(u

+ 3u

+ ··· + 2u + 1)

((u

− u

+ 3u

− 2u + 1)

)(u

− 8u

+ ··· − 10u + 1)

· (u

− 23u

+ ··· − 6u + 1)

V. Riley Polynomials

Crossings Riley Polynomials at each crossing

+ y + 1)

+ 5y

+ 7y

+ 2y + 1)

· (y

+ 34y

+ ··· + 19807y + 256)

, c

+ y + 1)

+ y

+ 3y

+ 2y + 1)

· (y

+ 10y

+ ··· + 255y + 16)

+ y + 1)

+ 9y

+ 31y

+ 19y + 4)

· (y

+ 58y

+ ··· + 87628895247y + 3914254096)

, c

+ 5y

+ 7y

+ 2y + 1)

· (y

+ 30y

+ ··· + 13893632y + 4194304)

, c

((y

+ 5y

+ 7y

+ 2y + 1)

)(y

+ 8y

+ ··· + 10y + 1)

· (y

+ 27y

+ ··· + 6y + 1)

, c

((y

+ y

+ 3y

+ 2y + 1)

)(y

+ 8y

+ ··· + 10y + 1)

· (y

+ 23y

+ ··· + 6y + 1)

((y

+ 5y

+ 7y

+ 2y + 1)

)(y

− 8y

+ ··· + 2y + 1)

· (y

− 17y

+ ··· + 6y + 1)