12n

0339

(K12n

0339

)

A knot diagram

Linearized knot diagam

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

Solving Sequence

3,9

6,10

7 2 1 11 5 12 8

, c

Ideals for irreducible components

of X

par

= h1.66975 × 10

− 3.16547 × 10

+ ··· + 4.47134 × 10

b − 8.10923 × 10

− 1.22687 × 10

− 2.29862 × 10

+ ··· + 1.78854 × 10

a − 5.42549 × 10

, u

+ u

+ ··· − 24u − 8i

= hb + 1, 4a

+ 2a

u + 12a

+ 4au + 16a + 3u + 8, u

− 2i

= ha, b − 1, v

− v

+ 2v −1i

* 3 irreducible components of dim

= 0, with total 65 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.

= h1.67×10

−3.17×10

+· · ·+4.47×10

b−8.11×10

, −1.23×

−2.30×10

+· · ·+1.79×10

a−5.43×10

, u

+· · ·−24u−8i

(i) Arc colorings















0.0685965u

+ 0.128520u

+ ··· + 1.30791u + 3.03348

−0.373433u

+ 0.0707946u

+ ··· + 4.21694u + 1.81360





−u

+ u





−0.405753u

+ 0.122299u

+ ··· + 7.07171u + 5.59685

−0.513211u

+ 0.0509245u

+ ··· + 5.89345u + 2.99527





−0.240787u

+ 0.0796338u

+ ··· + 3.53793u + 4.36769

−0.164966u

+ 0.0426655u

+ ··· + 3.53379u + 1.22915





−0.405753u

+ 0.122299u

+ ··· + 7.07171u + 5.59685

−0.164966u

+ 0.0426655u

+ ··· + 3.53379u + 1.22915





−0.221862u

− 0.235942u

+ ··· + 14.8907u + 4.16689

−0.206006u

+ 0.0316302u

+ ··· + 0.697720u + 0.830810





−u

+ 1

−u

+ 2u





−1.04226u

− 0.0828767u

+ ··· + 18.0314u + 6.34714

−0.876806u

+ 0.0149551u

+ ··· + 11.0477u + 5.43910





−u



(ii) Obstruction class = −1

(iii) Cusp Shapes = 1.91247u

− 0.0651102u

+ ··· − 36.7295u − 19.6145

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

+ 22u

+ ··· + 6193u + 529

, c

+ 4u

+ ··· − 35u − 23

, c

+ u

+ ··· − 24u − 8

− 2u

+ ··· − 144u − 52

, c

+ 2u

+ ··· − 12u − 1

, c

− 20u

+ ··· − 70u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

+ 34y

+ ··· − 4251793y + 279841

, c

− 22y

+ ··· − 6193y + 529

, c

− 49y

+ ··· + 320y + 64

− 36y

+ ··· − 244856y + 2704

, c

− 20y

+ ··· − 70y + 1

, c

+ 36y

+ ··· − 2910y + 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −1.006180 + 0.341220I

a = −0.289797 − 0.354743I

b = 0.753588 + 0.708565I

−1.067960 − 0.006602I −5.64848 + 0.I

u = −1.006180 − 0.341220I

a = −0.289797 + 0.354743I

b = 0.753588 − 0.708565I

−1.067960 + 0.006602I −5.64848 + 0.I

u = 0.229845 + 0.885092I

a = 0.23373 + 1.60210I

b = −1.066080 − 0.785797I

2.82839 − 10.02440I −1.48494 + 7.67479I

u = 0.229845 − 0.885092I

a = 0.23373 − 1.60210I

b = −1.066080 + 0.785797I

2.82839 + 10.02440I −1.48494 − 7.67479I

u = 0.095889 + 0.905571I

a = 0.41943 + 1.46050I

b = −0.910114 − 0.875500I

7.54385 − 3.22762I 3.27833 + 3.06176I

u = 0.095889 − 0.905571I

a = 0.41943 − 1.46050I

b = −0.910114 + 0.875500I

7.54385 + 3.22762I 3.27833 − 3.06176I

u = 0.987650 + 0.502370I

a = −0.286230 + 0.250539I

b = 0.881358 − 0.804502I

0.47314 + 5.10436I 0

u = 0.987650 − 0.502370I

a = −0.286230 − 0.250539I

b = 0.881358 + 0.804502I

0.47314 − 5.10436I 0

u = −0.062857 + 0.881765I

a = 0.58725 + 1.29532I

b = −0.690478 − 0.924886I

3.98324 + 3.71635I 0.54832 − 2.83161I

u = −0.062857 − 0.881765I

a = 0.58725 − 1.29532I

b = −0.690478 + 0.924886I

3.98324 − 3.71635I 0.54832 + 2.83161I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.786679 + 0.359198I

a = 0.432713 − 0.772670I

b = 0.471201 + 0.699941I

−0.08460 − 3.96138I −1.83399 + 7.39744I

u = 0.786679 − 0.359198I

a = 0.432713 + 0.772670I

b = 0.471201 − 0.699941I

−0.08460 + 3.96138I −1.83399 − 7.39744I

u = −0.202973 + 0.835141I

a = 0.31939 − 1.67631I

b = −1.011030 + 0.737718I

1.39627 + 4.40461I −3.28369 − 3.30771I

u = −0.202973 − 0.835141I

a = 0.31939 + 1.67631I

b = −1.011030 − 0.737718I

1.39627 − 4.40461I −3.28369 + 3.30771I

u = −1.15688

a = −1.40454

b = −1.29717

−3.09499 0

u = 0.002274 + 0.798617I

a = 0.67122 − 1.43784I

b = −0.729713 + 0.782717I

2.26056 + 1.36637I −1.86008 − 2.59968I

u = 0.002274 − 0.798617I

a = 0.67122 + 1.43784I

b = −0.729713 − 0.782717I

2.26056 − 1.36637I −1.86008 + 2.59968I

u = −1.230490 + 0.202314I

a = −1.221100 − 0.322026I

b = −1.341000 − 0.107492I

−6.99348 + 5.20308I 0

u = −1.230490 − 0.202314I

a = −1.221100 + 0.322026I

b = −1.341000 + 0.107492I

−6.99348 − 5.20308I 0

u = −1.253730 + 0.113458I

a = −0.29240 + 1.67063I

b = 0.798165 − 0.447170I

−7.89052 − 1.16203I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −1.253730 − 0.113458I

a = −0.29240 − 1.67063I

b = 0.798165 + 0.447170I

−7.89052 + 1.16203I 0

u = 1.183640 + 0.457210I

a = −0.399011 + 0.254230I

b = 0.686195 − 0.927663I

4.20004 − 1.62927I 0

u = 1.183640 − 0.457210I

a = −0.399011 − 0.254230I

b = 0.686195 + 0.927663I

4.20004 + 1.62927I 0

u = 1.265580 + 0.146299I

a = −0.06646 − 1.75568I

b = 0.843815 + 0.469241I

−8.04174 − 4.90764I 0

u = 1.265580 − 0.146299I

a = −0.06646 + 1.75568I

b = 0.843815 − 0.469241I

−8.04174 + 4.90764I 0

u = −1.208550 + 0.422798I

a = 0.571547 + 1.151150I

b = 0.889236 − 0.816585I

0.452903 + 0.953294I 0

u = −1.208550 − 0.422798I

a = 0.571547 − 1.151150I

b = 0.889236 + 0.816585I

0.452903 − 0.953294I 0

u = −0.686053 + 0.086131I

a = 0.079007 − 0.372551I

b = 0.701986 + 0.419047I

−1.231800 − 0.090410I −7.02973 − 0.67945I

u = −0.686053 − 0.086131I

a = 0.079007 + 0.372551I

b = 0.701986 − 0.419047I

−1.231800 + 0.090410I −7.02973 + 0.67945I

u = 1.302460 + 0.169792I

a = −1.133380 + 0.246466I

b = −1.285030 + 0.150211I

−7.79470 − 0.02282I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.302460 − 0.169792I

a = −1.133380 − 0.246466I

b = −1.285030 − 0.150211I

−7.79470 + 0.02282I 0

u = 1.283110 + 0.353977I

a = 0.62422 − 1.32590I

b = 0.971987 + 0.717214I

−1.73554 − 5.51211I 0

u = 1.283110 − 0.353977I

a = 0.62422 + 1.32590I

b = 0.971987 − 0.717214I

−1.73554 + 5.51211I 0

u = −1.284720 + 0.360060I

a = −0.496822 − 0.268927I

b = 0.497181 + 0.900810I

−1.75826 + 2.80506I 0

u = −1.284720 − 0.360060I

a = −0.496822 + 0.268927I

b = 0.497181 − 0.900810I

−1.75826 − 2.80506I 0

u = 1.317840 + 0.407750I

a = −0.487396 + 0.226625I

b = 0.496076 − 0.988968I

−0.32844 − 8.33898I 0

u = 1.317840 − 0.407750I

a = −0.487396 − 0.226625I

b = 0.496076 + 0.988968I

−0.32844 + 8.33898I 0

u = 1.38998

a = −1.03411

b = −1.06011

−6.53389 0

u = −1.346720 + 0.418450I

a = 0.78256 + 1.22776I

b = 1.071450 − 0.792956I

3.02423 + 7.97264I 0

u = −1.346720 − 0.418450I

a = 0.78256 − 1.22776I

b = 1.071450 + 0.792956I

3.02423 − 7.97264I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.39916 + 0.36081I

a = 0.90858 − 1.34750I

b = 1.137040 + 0.699212I

−3.68128 − 8.73528I 0

u = 1.39916 − 0.36081I

a = 0.90858 + 1.34750I

b = 1.137040 − 0.699212I

−3.68128 + 8.73528I 0

u = −0.071746 + 0.541437I

a = −0.0956064 − 0.0169262I

b = 1.239380 + 0.055514I

−3.47352 − 2.49924I −1.84511 + 2.12132I

u = −0.071746 − 0.541437I

a = −0.0956064 + 0.0169262I

b = 1.239380 − 0.055514I

−3.47352 + 2.49924I −1.84511 − 2.12132I

u = −1.41936 + 0.37849I

a = 0.94833 + 1.29184I

b = 1.171180 − 0.721786I

−2.4029 + 14.5849I 0

u = −1.41936 − 0.37849I

a = 0.94833 − 1.29184I

b = 1.171180 + 0.721786I

−2.4029 − 14.5849I 0

u = 0.267258 + 0.452591I

a = 0.981532 − 0.698076I

b = −0.137372 + 0.470727I

1.38052 + 0.70261I 3.81139 − 1.05801I

u = 0.267258 − 0.452591I

a = 0.981532 + 0.698076I

b = −0.137372 − 0.470727I

1.38052 − 0.70261I 3.81139 + 1.05801I

u = −1.47532

a = −0.898246

b = −0.558622

−4.26438 0

u = 1.51089 + 0.06240I

a = −0.880755 + 0.098234I

b = −0.890378 + 0.394410I

−8.44146 − 0.83388I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.51089 − 0.06240I

a = −0.880755 − 0.098234I

b = −0.890378 − 0.394410I

−8.44146 + 0.83388I 0

u = −1.52798 + 0.02835I

a = −0.851707 − 0.066826I

b = −0.756667 − 0.444461I

−7.94390 − 4.32216I 0

u = −1.52798 − 0.02835I

a = −0.851707 + 0.066826I

b = −0.756667 + 0.444461I

−7.94390 + 4.32216I 0

u = −0.014467 + 0.397572I

a = 4.05108 − 0.61951I

b = −0.737254 + 0.042361I

−4.09903 + 2.92617I 2.95211 − 3.95214I

u = −0.014467 − 0.397572I

a = 4.05108 + 0.61951I

b = −0.737254 − 0.042361I

−4.09903 − 2.92617I 2.95211 + 3.95214I

u = −0.390682

a = 0.117034

b = 0.806447

−1.01597 −12.5900

II. I

= hb + 1, 4a

+ 2a

u + 12a

+ 4au + 16a + 3u + 8, u

− 2i

(i) Arc colorings















−1





−u





−a − 2

−2a − 3





a + 1

−1





−1





−a

u − au − u





−1





−a

u − 2a

− 2au − 3a −

u − 2

−2a

− 2a − 1







(ii) Obstruction class = 1

(iii) Cusp Shapes = 8a

+ 4au + 16a + 4u + 4

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

(u − 1)

(u + 1)

, c

− 2)

, c

− u

+ 2u − 1)

+ u

− 1)

+ u

+ 2u + 1)

− u

+ 1)

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

(y −1)

, c

(y −2)

, c

+ 3y

+ 2y −1)

, c

− y

+ 2y −1)

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.41421

a = −1.40294

b = −1.00000

−5.46628 −4.98050

u = 1.41421

a = −1.15208 + 0.92429I

b = −1.00000

−9.60386 − 2.82812I −11.50976 + 2.97945I

u = 1.41421

a = −1.15208 − 0.92429I

b = −1.00000

−9.60386 + 2.82812I −11.50976 − 2.97945I

u = −1.41421

a = −0.847916 + 0.924288I

b = −1.00000

−9.60386 + 2.82812I −11.50976 − 2.97945I

u = −1.41421

a = −0.847916 − 0.924288I

b = −1.00000

−9.60386 − 2.82812I −11.50976 + 2.97945I

u = −1.41421

a = −0.597062

b = −1.00000

−5.46628 −4.98050

III. I

= ha, b − 1, v

− v

+ 2v − 1i

(i) Arc colorings



























−1





−1





−v









−v

− 1







(ii) Obstruction class = 1

(iii) Cusp Shapes = 10v

− 6v + 6

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

(u − 1)

, c

(u + 1)

, c

+ u

+ 2u + 1

− u

+ 1

+ u

− 1

− u

+ 2u − 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

(y − 1)

, c

+ 3y

+ 2y − 1

, c

− y

+ 2y − 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

v = 0.215080 + 1.307140I

a = 0

b = 1.00000

−4.66906 + 2.82812I −11.91407 − 2.22005I

v = 0.215080 − 1.307140I

a = 0

b = 1.00000

−4.66906 − 2.82812I −11.91407 + 2.22005I

v = 0.569840

a = 0

b = 1.00000

−0.531480 5.82810

IV. u-Polynomials

Crossings u-Polynomials at each crossing

((u − 1)

)(u

+ 22u

+ ··· + 6193u + 529)

((u − 1)

)(u + 1)

+ 4u

+ ··· − 35u − 23)

, c

− 2)

+ u

+ ··· − 24u − 8)

((u − 1)

)(u + 1)

+ 4u

+ ··· − 35u − 23)

((u

− u

+ 2u − 1)

)(u

+ u

+ 2u + 1)(u

− 2u

+ ··· − 144u − 52)

− u

+ 1)(u

+ u

− 1)

+ 2u

+ ··· − 12u − 1)

((u

+ u

+ 2u + 1)

)(u

− 20u

+ ··· − 70u + 1)

((u

− u

+ 1)

)(u

+ u

− 1)(u

+ 2u

+ ··· − 12u − 1)

((u

− u

+ 2u − 1)

)(u

− 20u

+ ··· − 70u + 1)

V. Riley Polynomials

Crossings Riley Polynomials at each crossing

((y − 1)

)(y

+ 34y

+ ··· − 4251793y + 279841)

, c

((y − 1)

)(y

− 22y

+ ··· − 6193y + 529)

, c

(y − 2)

− 49y

+ ··· + 320y + 64)

((y

+ 3y

+ 2y − 1)

)(y

− 36y

+ ··· − 244856y + 2704)

, c

((y

− y

+ 2y − 1)

)(y

− 20y

+ ··· − 70y + 1)

, c

((y

+ 3y

+ 2y − 1)

)(y

+ 36y

+ ··· − 2910y + 1)