12a

1246

(K12a

1246

)

A knot diagram

Linearized knot diagam

5 6 11 9 2 10 12 4 1 3 7 8

Solving Sequence

4,8

5,12

1 2 10 7 6 11 3

, c

Ideals for irreducible components

of X

par

= h−585818u

+ 2005165u

+ ··· + 356583b − 681791,

1498861u

− 5624519u

+ ··· + 1069749a + 1574450, u

− 4u

+ ··· + 3u − 1i

= h9.48071 × 10

132

+ 7.49196 × 10

132

+ ··· + 7.42425 × 10

133

b + 1.33608 × 10

135

1.27527 × 10

151

+ 2.38351 × 10

151

+ ··· + 1.51769 × 10

151

a − 5.45451 × 10

153

+ u

+ ··· + 3878u + 547i

= hu

+ 6u

− 11u

− 40u

+ 38u

+ 99u

− 52u

− 146u

+ 56u

+ 125u

+ 9b − 52u − 10,

− 8u

+ 9u

+ 49u

− 52u

− 109u

+ 96u

+ 158u

− 125u

− 133u

+ 131u

+ 3a − 16u − 1,

− 2u

− 5u

+ 12u

+ 7u

− 25u

− 7u

+ 36u

− 35u

+ 19u

+ u − 1i

* 3 irreducible components of dim

= 0, with total 95 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−5.86 × 10

+ 2.01 × 10

+ · · · + 3.57 × 10

b − 6.82 × 10

, 1.50 ×

−5.62×10

+· · ·+1.07×10

a+1.57×10

, u

−4u

+· · ·+3u −1i

(i) Arc colorings















−u

+ u





−1.40113u

+ 5.25779u

+ ··· + 2.52143u − 1.47179

1.64287u

− 5.62328u

+ ··· − 3.97561u + 1.91201





0.241732u

− 0.365484u

+ ··· − 1.45418u + 0.440218

1.64287u

− 5.62328u

+ ··· − 3.97561u + 1.91201





0.172921u

− 0.600708u

+ ··· − 1.02124u − 0.0922385

0.539597u

− 2.22583u

+ ··· − 2.94596u + 1.93400





−u

+ 1

−1.23409u

+ 4.60184u

+ ··· + 2.32068u − 2.46359





−1.40113u

+ 5.25779u

+ ··· + 2.52143u − 1.47179

1.22478u

− 4.59343u

+ ··· − 2.37387u + 2.42254





0.172921u

− 0.600708u

+ ··· − 1.02124u − 0.0922385

−0.910088u

+ 3.13290u

+ ··· + 1.57607u − 1.05067





−0.478935u

+ 2.36308u

+ ··· + 0.499732u − 2.01626





0.447338u

− 1.03420u

+ ··· + 0.420550u − 0.478935



(ii) Obstruction class = −1

(iii) Cusp Shapes = −

6043223

1069749

20837542

1069749

+ ··· +

15394660

1069749

u −

16108082

1069749

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

3(3u

+ 39u

+ ··· + 48u − 32)

, c

− 4u

+ ··· + 3u − 1

, c

+ u

+ ··· + 39u + 3

, c

3(3u

+ 42u

+ ··· + 160u + 64)

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

9(9y

− 261y

+ ··· − 256y −1024)

, c

− 14y

+ ··· + 3y −1

, c

+ 3y

+ ··· + 1557y −9

, c

9(9y

− 234y

+ ··· + 54272y −4096)

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.002405 + 1.009230I

a = −2.10309 + 0.54054I

b = 1.44603 + 0.11464I

1.64475 + 3.69178I −0.02857 − 2.86809I

u = −0.002405 − 1.009230I

a = −2.10309 − 0.54054I

b = 1.44603 − 0.11464I

1.64475 − 3.69178I −0.02857 + 2.86809I

u = −1.02639

a = −0.734489

b = 2.36149

−3.39545 14.6070

u = 0.009683 + 0.858301I

a = 0.629661 + 0.211913I

b = −0.426574 + 0.480115I

−4.40513 − 1.65649I −4.18188 + 3.97830I

u = 0.009683 − 0.858301I

a = 0.629661 − 0.211913I

b = −0.426574 − 0.480115I

−4.40513 + 1.65649I −4.18188 − 3.97830I

u = −0.064630 + 0.840106I

a = −2.05534 − 0.19633I

b = 1.48214 − 0.04605I

7.60618 − 1.61468I 5.58840 + 3.35209I

u = −0.064630 − 0.840106I

a = −2.05534 + 0.19633I

b = 1.48214 + 0.04605I

7.60618 + 1.61468I 5.58840 − 3.35209I

u = 1.090900 + 0.454580I

a = −1.08976 − 1.11362I

b = 1.44888 − 0.45871I

1.69425 − 6.98980I −2.46764 + 7.25888I

u = 1.090900 − 0.454580I

a = −1.08976 + 1.11362I

b = 1.44888 + 0.45871I

1.69425 + 6.98980I −2.46764 − 7.25888I

u = 1.226010 + 0.358839I

a = 0.467670 + 0.349816I

b = −0.371119 + 1.025590I

−5.65901 − 7.48932I −7.43506 + 8.54905I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.226010 − 0.358839I

a = 0.467670 − 0.349816I

b = −0.371119 − 1.025590I

−5.65901 + 7.48932I −7.43506 − 8.54905I

u = 1.298790 + 0.244302I

a = 0.444127 − 0.222003I

b = −0.801483 − 0.900498I

−12.78890 − 5.46316I −9.57232 + 3.33503I

u = 1.298790 − 0.244302I

a = 0.444127 + 0.222003I

b = −0.801483 + 0.900498I

−12.78890 + 5.46316I −9.57232 − 3.33503I

u = −1.29721 + 0.58581I

a = −1.26120 + 0.99604I

b = 1.48832 + 0.38565I

0.26795 + 12.49270I −3.25634 − 8.76270I

u = −1.29721 − 0.58581I

a = −1.26120 − 0.99604I

b = 1.48832 − 0.38565I

0.26795 − 12.49270I −3.25634 + 8.76270I

u = −1.42314 + 0.44151I

a = 0.487234 − 0.317383I

b = −0.440971 − 0.938644I

−13.7809 + 11.5076I −9.22167 − 6.83714I

u = −1.42314 − 0.44151I

a = 0.487234 + 0.317383I

b = −0.440971 + 0.938644I

−13.7809 − 11.5076I −9.22167 + 6.83714I

u = 0.473594

a = −1.52002

b = 1.65788

7.50154 −23.5170

u = 0.164998 + 0.441187I

a = 0.641980 − 0.098310I

b = −0.521990 − 0.233072I

0.981568 + 0.658500I 5.66649 − 3.03192I

u = 0.164998 − 0.441187I

a = 0.641980 + 0.098310I

b = −0.521990 + 0.233072I

0.981568 − 0.658500I 5.66649 + 3.03192I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.46504 + 0.62403I

a = −1.31309 − 0.92775I

b = 1.50798 − 0.35891I

−7.5447 − 16.2015I −5.54952 + 7.59036I

u = 1.46504 − 0.62403I

a = −1.31309 + 0.92775I

b = 1.50798 + 0.35891I

−7.5447 + 16.2015I −5.54952 − 7.59036I

u = −0.383297

a = 1.55813

b = 0.358207

−1.00078 −13.8410

II. I

= h9.48 × 10

132

+ 7.49 × 10

132

+ · · · + 7.42 × 10

133

b + 1.34 ×

135

, 1.28 × 10

151

+ 2.38 × 10

151

+ · · · + 1.52 × 10

151

a − 5.45 ×

153

, u

+ u

+ · · · + 3878u + 547i

(i) Arc colorings















−u

+ u





−0.840267u

− 1.57048u

+ ··· + 2940.26u + 359.394

−0.127699u

− 0.100912u

+ ··· − 65.0761u − 17.9961





−0.967967u

− 1.67139u

+ ··· + 2875.18u + 341.398

−0.127699u

− 0.100912u

+ ··· − 65.0761u − 17.9961





−0.918075u

− 1.76510u

+ ··· + 3363.75u + 412.637

−0.104523u

− 0.0906565u

+ ··· − 24.0762u − 10.6894





−1.70374u

− 3.43508u

+ ··· + 6797.59u + 836.982

1.05872u

+ 2.27370u

+ ··· − 4904.73u − 619.679





0.925260u

+ 2.03609u

+ ··· − 4447.53u − 559.148

0.259425u

+ 0.496942u

+ ··· − 972.189u − 117.868





−1.43148u

− 2.78713u

+ ··· + 5519.38u + 680.124

−0.157674u

− 0.275409u

+ ··· + 484.781u + 59.3485





0.386613u

+ 0.815067u

+ ··· − 1623.39u − 198.882

0.449788u

+ 0.874364u

+ ··· − 1511.47u − 173.851





−1.14111u

− 2.35744u

+ ··· + 4758.06u + 589.099

−0.151779u

− 0.155968u

+ ··· − 150.729u − 40.2437



(ii) Obstruction class = −1

(iii) Cusp Shapes = −1.32061u

− 2.83972u

+ ··· + 5862.79u + 729.940

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

− u

− 3u

+ 2u

+ u − 1)

, c

+ u

+ ··· + 3878u + 547

, c

− 7u

+ ··· + 54036u − 6079

, c

− u

− 2u

+ u

+ u + 1)

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

− 7y

+ 17y

− 16y

+ 6y

− 5y + 1)

, c

− 49y

+ ··· + 5849952y + 299209

, c

+ 27y

+ ··· − 1424649824y + 36954241

, c

− 5y

+ 8y

− 3y

− y −1)

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.974583 + 0.092136I

a = 0.157749 − 0.672406I

b = 0.309916 − 0.549911I

−1.64546 + 0.44183I 0

u = −0.974583 − 0.092136I

a = 0.157749 + 0.672406I

b = 0.309916 + 0.549911I

−1.64546 − 0.44183I 0

u = −0.985032 + 0.280490I

a = 1.90504 − 1.43106I

b = −1.41878 − 0.21917I

0.19891 + 4.40083I 0

u = −0.985032 − 0.280490I

a = 1.90504 + 1.43106I

b = −1.41878 + 0.21917I

0.19891 − 4.40083I 0

u = 1.052290 + 0.003589I

a = 1.67828 − 1.88799I

b = −1.41878 − 0.21917I

−6.72233 + 4.40083I 0

u = 1.052290 − 0.003589I

a = 1.67828 + 1.88799I

b = −1.41878 + 0.21917I

−6.72233 − 4.40083I 0

u = 0.942202 + 0.055227I

a = 0.36140 + 2.10364I

b = 1.21774

−6.22930 − 4.59213I −7.09999 + 3.20482I

u = 0.942202 − 0.055227I

a = 0.36140 − 2.10364I

b = 1.21774

−6.22930 + 4.59213I −7.09999 − 3.20482I

u = −0.898064 + 0.266660I

a = −0.82093 + 2.07297I

b = 1.21774

0.42652 − 1.97241I −2.00000 + 3.68478I

u = −0.898064 − 0.266660I

a = −0.82093 − 2.07297I

b = 1.21774

0.42652 + 1.97241I −2.00000 − 3.68478I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −1.072370 + 0.111026I

a = 0.745241 + 0.170119I

b = −1.41878 + 0.21917I

−2.75782 + 0.19129I 0

u = −1.072370 − 0.111026I

a = 0.745241 − 0.170119I

b = −1.41878 − 0.21917I

−2.75782 − 0.19129I 0

u = 1.095370 + 0.259211I

a = −0.233077 − 0.935984I

b = 0.309916 − 0.549911I

−1.64546 − 3.50299I 0

u = 1.095370 − 0.259211I

a = −0.233077 + 0.935984I

b = 0.309916 + 0.549911I

−1.64546 + 3.50299I 0

u = 0.384883 + 0.772449I

a = 1.64885 + 0.61278I

b = −1.41878 − 0.21917I

3.89801 + 2.42842I 0

u = 0.384883 − 0.772449I

a = 1.64885 − 0.61278I

b = −1.41878 + 0.21917I

3.89801 − 2.42842I 0

u = −0.127271 + 0.791997I

a = −0.011294 − 0.622453I

b = 0.309916 + 0.549911I

−1.64546 + 3.50299I −4.06061 − 8.11543I

u = −0.127271 − 0.791997I

a = −0.011294 + 0.622453I

b = 0.309916 − 0.549911I

−1.64546 − 3.50299I −4.06061 + 8.11543I

u = −0.151080 + 1.188450I

a = 1.84107 − 0.17810I

b = −1.41878 + 0.21917I

3.89801 − 6.37324I 0

u = −0.151080 − 1.188450I

a = 1.84107 + 0.17810I

b = −1.41878 − 0.21917I

3.89801 + 6.37324I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.209430 + 0.057378I

a = −0.807569 − 0.455475I

b = 0.309916 − 0.549911I

−5.34455 − 1.53058I 0

u = 1.209430 − 0.057378I

a = −0.807569 + 0.455475I

b = 0.309916 + 0.549911I

−5.34455 + 1.53058I 0

u = 1.004530 + 0.679945I

a = −1.50731 − 1.23644I

b = 1.21774

0.42652 − 1.97241I 0

u = 1.004530 − 0.679945I

a = −1.50731 + 1.23644I

b = 1.21774

0.42652 + 1.97241I 0

u = 0.346940 + 1.164010I

a = −0.152569 + 0.333032I

b = 0.309916 − 0.549911I

−8.30128 − 6.12271I 0

u = 0.346940 − 1.164010I

a = −0.152569 − 0.333032I

b = 0.309916 + 0.549911I

−8.30128 + 6.12271I 0

u = 1.159910 + 0.376539I

a = 0.735375 + 0.972190I

b = −1.41878 + 0.21917I

3.89801 − 2.42842I 0

u = 1.159910 − 0.376539I

a = 0.735375 − 0.972190I

b = −1.41878 − 0.21917I

3.89801 + 2.42842I 0

u = −1.257970 + 0.394985I

a = −0.442688 + 0.963617I

b = 0.309916 + 0.549911I

−8.30128 + 6.12271I 0

u = −1.257970 − 0.394985I

a = −0.442688 − 0.963617I

b = 0.309916 − 0.549911I

−8.30128 − 6.12271I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −1.316720 + 0.132375I

a = −0.900231 − 0.667605I

b = 0.309916 − 0.549911I

−12.26580 − 1.53058I 0

u = −1.316720 − 0.132375I

a = −0.900231 + 0.667605I

b = 0.309916 + 0.549911I

−12.26580 + 1.53058I 0

u = −1.267180 + 0.459289I

a = 0.87588 − 1.23608I

b = −1.41878 − 0.21917I

3.89801 + 6.37324I 0

u = −1.267180 − 0.459289I

a = 0.87588 + 1.23608I

b = −1.41878 + 0.21917I

3.89801 − 6.37324I 0

u = −0.645770 + 0.020009I

a = −0.173886 + 0.107924I

b = −1.41878 − 0.21917I

−2.75782 − 0.19129I −3.83682 − 0.29377I

u = −0.645770 − 0.020009I

a = −0.173886 − 0.107924I

b = −1.41878 + 0.21917I

−2.75782 + 0.19129I −3.83682 + 0.29377I

u = 1.287540 + 0.440046I

a = 0.049673 + 0.291469I

b = 0.309916 + 0.549911I

−8.30128 − 3.06155I 0

u = 1.287540 − 0.440046I

a = 0.049673 − 0.291469I

b = 0.309916 − 0.549911I

−8.30128 + 3.06155I 0

u = −1.349540 + 0.397143I

a = −0.479182 + 0.151695I

b = 0.309916 + 0.549911I

−5.34455 + 1.53058I 0

u = −1.349540 − 0.397143I

a = −0.479182 − 0.151695I

b = 0.309916 − 0.549911I

−5.34455 − 1.53058I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.173300 + 0.776333I

a = 1.75422 + 0.67540I

b = −1.41878 + 0.21917I

0.19891 − 4.40083I 0

u = 1.173300 − 0.776333I

a = 1.75422 − 0.67540I

b = −1.41878 − 0.21917I

0.19891 + 4.40083I 0

u = 1.37357 + 0.47414I

a = 0.93811 + 1.41351I

b = −1.41878 + 0.21917I

−2.75782 − 8.99296I 0

u = 1.37357 − 0.47414I

a = 0.93811 − 1.41351I

b = −1.41878 − 0.21917I

−2.75782 + 8.99296I 0

u = −1.51007

a = −0.0164319

b = 1.21774

−3.27257 0

u = 1.52601

a = 0.457789

b = 1.21774

−10.1938 0

u = −0.02802 + 1.54640I

a = 1.79489 − 0.01521I

b = −1.41878 − 0.21917I

−2.75782 + 8.99296I 0

u = −0.02802 − 1.54640I

a = 1.79489 + 0.01521I

b = −1.41878 + 0.21917I

−2.75782 − 8.99296I 0

u = −1.25568 + 1.03399I

a = −1.55111 + 0.70824I

b = 1.21774

−6.22930 + 4.59213I 0

u = −1.25568 − 1.03399I

a = −1.55111 − 0.70824I

b = 1.21774

−6.22930 − 4.59213I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.099250 + 0.343403I

a = −2.23337 − 2.40988I

b = 0.309916 − 0.549911I

−8.30128 + 3.06155I −8.06602 + 1.22583I

u = −0.099250 − 0.343403I

a = −2.23337 + 2.40988I

b = 0.309916 + 0.549911I

−8.30128 − 3.06155I −8.06602 − 1.22583I

u = 1.61284 + 0.58574I

a = −0.342297 − 0.081885I

b = 0.309916 − 0.549911I

−12.26580 − 1.53058I 0

u = 1.61284 − 0.58574I

a = −0.342297 + 0.081885I

b = 0.309916 + 0.549911I

−12.26580 + 1.53058I 0

u = −0.087674 + 0.212302I

a = 2.46392 + 1.97194I

b = 0.309916 − 0.549911I

−1.64546 + 0.44183I −4.06061 + 0.74587I

u = −0.087674 − 0.212302I

a = 2.46392 − 1.97194I

b = 0.309916 + 0.549911I

−1.64546 − 0.44183I −4.06061 − 0.74587I

u = −1.45021 + 1.04440I

a = 1.65442 − 0.48085I

b = −1.41878 − 0.21917I

−6.72233 + 4.40083I 0

u = −1.45021 − 1.04440I

a = 1.65442 + 0.48085I

b = −1.41878 + 0.21917I

−6.72233 − 4.40083I 0

u = 1.82688

a = −0.810042

b = 1.21774

−3.27257 0

u = −2.19561

a = −1.08248

b = 1.21774

−10.1938 0

III.

= hu

+6u

+· · ·+9b−10, −8u

+9u

+· · ·+3a−1, u

−2u

+· · ·+u−1i

(i) Arc colorings















−u

+ u





− 3u

+ ··· +

u +

−

+ ··· +

u +





−

+ ··· +

100

u +

−

+ ··· +

u +





− 2u

+ ··· +

u +

−

+ ··· +

u +





− 1

−u

+ 2u

+ ··· − 5u − 3





−

+ 3u

+ ··· −

u −

−

+ ··· +

u +





−

+ 2u

+ ··· −

u −

−

+ ··· −

u −





−1

−0.370370u

+ 1.11111u

+ ··· − 5.74074u − 2.62963





−0.370370u

+ 0.111111u

+ ··· + 3.25926u + 0.370370



(ii) Obstruction class = 1

(iii) Cusp Shapes =

1394

−

467

−

8377

8419

18214

−

1840

−

26111

23240

22255

−

25469

2491

u +

2278

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

3(3u

+ 6u

+ ··· + 2u + 1)

, c

− 2u

+ ··· + u − 1

, c

+ 2u

+ ··· − u − 1

3(3u

− 6u

+ ··· − 2u + 1)

, c

+ u

+ ··· + 3u − 3

3(3u

+ 3u

+ ··· + u − 1)

, c

3(3u

− 3u

+ ··· − u − 1)

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

9(9y

− 138y

+ ··· − 10y + 1)

, c

− 14y

+ ··· − 39y + 1

, c

+ 3y

+ ··· − 165y + 9

, c

9(9y

− 129y

+ ··· − 5y + 1)

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.932006 + 0.551595I

a = 1.94798 + 1.16375I

b = −1.378330 + 0.226018I

1.23298 − 4.56667I 0.57839 + 5.34211I

u = 0.932006 − 0.551595I

a = 1.94798 − 1.16375I

b = −1.378330 − 0.226018I

1.23298 + 4.56667I 0.57839 − 5.34211I

u = 1.012880 + 0.538063I

a = −0.913750 − 0.403762I

b = −0.084384 − 0.404586I

−8.91282 − 4.41756I −11.80744 + 3.92940I

u = 1.012880 − 0.538063I

a = −0.913750 + 0.403762I

b = −0.084384 + 0.404586I

−8.91282 + 4.41756I −11.80744 − 3.92940I

u = −0.982710 + 0.822426I

a = 2.32770 − 0.87516I

b = −1.376400 − 0.141519I

−4.45821 + 6.27261I −4.06543 − 5.44516I

u = −0.982710 − 0.822426I

a = 2.32770 + 0.87516I

b = −1.376400 + 0.141519I

−4.45821 − 6.27261I −4.06543 + 5.44516I

u = −1.38593

a = −0.540766

b = 0.849230

−4.82166 −10.3490

u = 1.59916

a = −0.745784

b = 0.340870

−12.3887 −13.0030

u = 1.66692

a = −0.445586

b = 1.24424

−2.73363 6.28030

u = 0.267125

a = −0.380081

b = 1.63102

7.68547 20.1110

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.215477

a = −3.17648

b = −0.685186

−0.526513 4.89240

u = −1.85614

a = −0.435151

b = 1.29805

−8.99699 −2.34230

IV. u-Polynomials

Crossings u-Polynomials at each crossing

, c

9(u

− u

+ ··· + u − 1)

(3u

+ 6u

+ ··· + 2u + 1)

· (3u

+ 39u

+ ··· + 48u − 32)

, c

− 2u

+ ··· + u − 1)(u

− 4u

+ ··· + 3u − 1)

· (u

+ u

+ ··· + 3878u + 547)

, c

+ 2u

+ ··· − u − 1)(u

− 4u

+ ··· + 3u − 1)

· (u

+ u

+ ··· + 3878u + 547)

9(u

− u

+ ··· + u − 1)

(3u

− 6u

+ ··· − 2u + 1)

· (3u

+ 39u

+ ··· + 48u − 32)

, c

+ u

+ ··· + 3u − 3)(u

+ u

+ ··· + 39u + 3)

· (u

− 7u

+ ··· + 54036u − 6079)

9(u

− u

+ ··· + u + 1)

(3u

+ 3u

+ ··· + u − 1)

· (3u

+ 42u

+ ··· + 160u + 64)

, c

9(u

− u

+ ··· + u + 1)

(3u

− 3u

+ ··· − u − 1)

· (3u

+ 42u

+ ··· + 160u + 64)

V. Riley Polynomials

Crossings Riley Polynomials at each crossing

, c

81(y

− 7y

+ 17y

− 16y

+ 6y

− 5y + 1)

· (9y

− 138y

+ ··· − 10y + 1)(9y

− 261y

+ ··· − 256y −1024)

, c

− 14y

+ ··· − 39y + 1)(y

− 14y

+ ··· + 3y −1)

· (y

− 49y

+ ··· + 5849952y + 299209)

, c

+ 3y

+ ··· − 165y + 9)(y

+ 3y

+ ··· + 1557y −9)

· (y

+ 27y

+ ··· − 1424649824y + 36954241)

, c

81(y

− 5y

+ ··· − y −1)

(9y

− 129y

+ ··· − 5y + 1)

· (9y

− 234y

+ ··· + 54272y −4096)