12n

0312

(K12n

0312

)

A knot diagram

Linearized knot diagam

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

Solving Sequence

2,6

3 7

4,9

10 1 8 5 12 11

, c

Ideals for irreducible components

of X

par

= h−5.27353 × 10

+ 5.95554 × 10

+ ··· + 5.81254 × 10

b + 4.59993 × 10

7.75948 × 10

− 3.86755 × 10

+ ··· + 5.81254 × 10

a − 9.39756 × 10

, u

− 2u

+ ··· + 7u + 1i

= h2u

− u

+ 8u

− 5u

+ 19u

− 13u

+ 27u

− 16u

+ 28u

− 9u

+ 20u

+ u

+ 10u

+ b + 2u + 2,

− 2u

+ ··· + a − 2, u

− u

+ ··· − u + 1i

* 2 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−5.27×10

+5.96×10

+· · ·+5.81×10

b+4.60×10

, 7.76×

−3.87×10

+· · ·+5.81×10

a−9.40×10

, u

−2u

+· · ·+7u+1i

(i) Arc colorings











−u









+ u

+ 1





−0.133496u

+ 0.665380u

+ ··· + 15.0043u + 1.61677

0.0907267u

− 0.102460u

+ ··· + 0.430261u − 0.791380





−0.224885u

+ 0.863520u

+ ··· + 12.9927u + 1.29738

−0.000662998u

+ 0.0956792u

+ ··· − 1.58129u − 1.11078





+ 1

−u





−0.133496u

+ 0.665380u

+ ··· + 15.0043u + 1.61677

−0.100609u

+ 0.340183u

+ ··· − 2.22497u − 1.18977





1.39954u

− 3.02014u

+ ··· + 26.1706u + 4.28089

0.281992u

− 0.623894u

+ ··· + 2.36583u + 0.204479





−0.0433203u

+ 0.378199u

+ ··· + 15.8786u + 2.05202

0.483864u

− 1.27646u

+ ··· − 0.426089u − 1.03092





−2.08778u

+ 5.36211u

+ ··· − 10.8586u − 2.03985

−0.147373u

+ 0.395336u

+ ··· − 2.10105u − 0.958378



(ii) Obstruction class = −1

(iii) Cusp Shapes = 4.30999u

− 10.1429u

+ ··· + 42.2706u + 1.05077

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

+ 6u

+ ··· + 23u + 1

, c

− 2u

+ ··· + 7u + 1

+ 5u

+ ··· + 5688833u + 456713

, c

+ 13u

+ ··· − 4u + 7

, c

+ u

+ ··· + 4497u + 361

+ 3u

+ ··· − 4u + 1

− 5u

+ ··· − 361724u + 608312

− 26u

+ ··· − 362u + 49

− u

+ ··· − 3750504u + 772753

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

+ 66y

+ ··· − 193y + 1

, c

+ 6y

+ ··· + 23y + 1

+ 123y

+ ··· + 6314489480935y + 208586764369

, c

+ 26y

+ ··· + 362y + 49

, c

− 59y

+ ··· + 134503y + 130321

− y

+ ··· + 8y + 1

+ 53y

+ ··· + 1499383242864y + 370043489344

− 18y

+ ··· − 40394y + 2401

+ 77y

+ ··· − 906264208390y + 597147199009

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.262608 + 0.958166I

a = −0.189880 + 0.941685I

b = 0.00591 + 1.77956I

−0.43866 + 2.24384I −3.81906 − 5.12194I

u = 0.262608 − 0.958166I

a = −0.189880 − 0.941685I

b = 0.00591 − 1.77956I

−0.43866 − 2.24384I −3.81906 + 5.12194I

u = 0.926209 + 0.156398I

a = 0.217139 + 0.674278I

b = 0.392314 − 0.960986I

2.50089 + 2.28563I 2.12764 − 2.97233I

u = 0.926209 − 0.156398I

a = 0.217139 − 0.674278I

b = 0.392314 + 0.960986I

2.50089 − 2.28563I 2.12764 + 2.97233I

u = −0.415141 + 0.823170I

a = −0.510209 − 1.251400I

b = 0.404330 − 0.813064I

4.59855 + 0.55508I 3.65213 + 0.54524I

u = −0.415141 − 0.823170I

a = −0.510209 + 1.251400I

b = 0.404330 + 0.813064I

4.59855 − 0.55508I 3.65213 − 0.54524I

u = −0.709121 + 0.812210I

a = 0.656724 + 0.475234I

b = 0.73014 + 1.50996I

4.83926 − 5.18733I 5.25176 + 6.54277I

u = −0.709121 − 0.812210I

a = 0.656724 − 0.475234I

b = 0.73014 − 1.50996I

4.83926 + 5.18733I 5.25176 − 6.54277I

u = 0.319846 + 1.045980I

a = 0.260908 + 0.248366I

b = −0.336124 − 0.552993I

−1.70481 + 5.48650I −4.87092 − 6.70893I

u = 0.319846 − 1.045980I

a = 0.260908 − 0.248366I

b = −0.336124 + 0.552993I

−1.70481 − 5.48650I −4.87092 + 6.70893I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.751933 + 0.494508I

a = 1.392250 + 0.221845I

b = 0.514073 − 0.795694I

1.51098 + 1.78901I 0.82025 − 3.56687I

u = 0.751933 − 0.494508I

a = 1.392250 − 0.221845I

b = 0.514073 + 0.795694I

1.51098 − 1.78901I 0.82025 + 3.56687I

u = −0.297122 + 0.826943I

a = −0.493050 + 0.530886I

b = −0.409100 − 0.824445I

−2.88688 − 1.42829I −8.07911 − 0.82991I

u = −0.297122 − 0.826943I

a = −0.493050 − 0.530886I

b = −0.409100 + 0.824445I

−2.88688 + 1.42829I −8.07911 + 0.82991I

u = 0.294371 + 0.826929I

a = 0.378431 + 0.565801I

b = 0.768928 + 0.890271I

−0.24576 + 1.84711I −2.38841 − 3.47069I

u = 0.294371 − 0.826929I

a = 0.378431 − 0.565801I

b = 0.768928 − 0.890271I

−0.24576 − 1.84711I −2.38841 + 3.47069I

u = −1.054610 + 0.435101I

a = −1.58864 + 0.59883I

b = −0.25725 − 1.66736I

4.29616 − 5.85650I 5.18701 + 8.29672I

u = −1.054610 − 0.435101I

a = −1.58864 − 0.59883I

b = −0.25725 + 1.66736I

4.29616 + 5.85650I 5.18701 − 8.29672I

u = 0.454261 + 1.183960I

a = 0.032608 + 0.790796I

b = 0.87425 + 1.29247I

−0.78848 + 2.37152I −2.00000 + 0.I

u = 0.454261 − 1.183960I

a = 0.032608 − 0.790796I

b = 0.87425 − 1.29247I

−0.78848 − 2.37152I −2.00000 + 0.I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.12042 + 0.91969I

a = −1.129020 + 0.673147I

b = −0.30929 + 1.59265I

16.0958 + 2.3517I 0

u = 1.12042 − 0.91969I

a = −1.129020 − 0.673147I

b = −0.30929 − 1.59265I

16.0958 − 2.3517I 0

u = −1.04883 + 1.00662I

a = −0.943173 − 0.988165I

b = 0.16566 − 1.65850I

11.50030 + 0.22277I 0

u = −1.04883 − 1.00662I

a = −0.943173 + 0.988165I

b = 0.16566 + 1.65850I

11.50030 − 0.22277I 0

u = −1.01766 + 1.04986I

a = 1.113840 + 0.762342I

b = 0.69672 + 2.05244I

11.34810 − 7.79886I 0

u = −1.01766 − 1.04986I

a = 1.113840 − 0.762342I

b = 0.69672 − 2.05244I

11.34810 + 7.79886I 0

u = −0.407119 + 0.328791I

a = 1.96312 + 0.79373I

b = 1.54195 − 0.43951I

1.42527 − 5.22858I −1.53718 + 8.98097I

u = −0.407119 − 0.328791I

a = 1.96312 − 0.79373I

b = 1.54195 + 0.43951I

1.42527 + 5.22858I −1.53718 − 8.98097I

u = −0.87350 + 1.19690I

a = −0.196741 + 0.749309I

b = −2.00712 + 0.06148I

0.46508 − 3.72342I 0

u = −0.87350 − 1.19690I

a = −0.196741 − 0.749309I

b = −2.00712 − 0.06148I

0.46508 + 3.72342I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.96551 + 1.14045I

a = 0.808271 − 0.969514I

b = 0.22694 − 1.92160I

15.3328 + 5.2849I 0

u = 0.96551 − 1.14045I

a = 0.808271 + 0.969514I

b = 0.22694 + 1.92160I

15.3328 − 5.2849I 0

u = −0.455563 + 0.075943I

a = −3.41002 + 0.16418I

b = −0.022227 − 0.704888I

4.54784 + 1.17562I 6.58243 − 1.22324I

u = −0.455563 − 0.075943I

a = −3.41002 − 0.16418I

b = −0.022227 + 0.704888I

4.54784 − 1.17562I 6.58243 + 1.22324I

u = 1.03222 + 1.17188I

a = −1.053170 + 0.792325I

b = −0.64032 + 2.51487I

15.1921 + 13.6048I 0

u = 1.03222 − 1.17188I

a = −1.053170 − 0.792325I

b = −0.64032 − 2.51487I

15.1921 − 13.6048I 0

u = 1.22561 + 0.99201I

a = 1.019900 − 0.871315I

b = −0.68980 − 1.82950I

15.9053 − 5.4238I 0

u = 1.22561 − 0.99201I

a = 1.019900 + 0.871315I

b = −0.68980 + 1.82950I

15.9053 + 5.4238I 0

u = −0.074323 + 0.230026I

a = −0.32928 + 2.47850I

b = −1.149970 − 0.375487I

−1.50780 − 0.09249I −7.98485 − 1.09942I

u = −0.074323 − 0.230026I

a = −0.32928 − 2.47850I

b = −1.149970 + 0.375487I

−1.50780 + 0.09249I −7.98485 + 1.09942I

II.

= h2u

− u

+ · · · + b + 2, u

− 2u

+ · · · + a − 2, u

− u

+ · · · − u + 1i

(i) Arc colorings











−u









+ u

+ 1





−u

+ 2u

+ ··· − 7u + 2

−2u

+ u

+ ··· − 2u − 2





−u

− 4u

+ ··· − 3u − 1

− 5u

+ ··· + 2u − 5





+ 1

−u





−u

+ 2u

+ ··· − 7u + 2

−3u

+ 2u

+ ··· − 15u

− 3





− 5u

+ ··· + 11u − 5

−2u

+ 4u

+ ··· − 3u + 4





+ 4u

+ ··· + u + 5

+ 4u

+ ··· + 13u

+ 4





− 4u

+ ··· + 8u + 4

− 7u

+ ··· + 11u − 5



(ii) Obstruction class = 1

(iii) Cusp Shapes = −14u

+ 22u

− 69u

+ 102u

− 195u

+ 266u

− 354u

393u

− 428u

+ 384u

− 338u

+ 239u

− 155u

+ 106u

− 38u + 19

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

− 9u

+ ··· − 11u + 1

− u

+ ··· − u + 1

− 2u

+ ··· + u + 1

+ u

+ ··· + 3u

+ 1

− 6u

+ ··· + u + 1

+ u

+ ··· + u + 1

+ 2u

+ ··· + 2u + 1

− 6u

+ ··· − u + 1

+ 4u

+ ··· + 6u + 1

− u

+ ··· + 3u

+ 1

− 9u

+ ··· − 6u + 1

− 2u

+ ··· − 2u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

+ 5y

+ ··· − 5y + 1

, c

+ 9y

+ ··· + 11y + 1

− 2y

+ ··· + 23y + 1

, c

+ 9y

+ ··· + 6y + 1

, c

− 12y

+ ··· − 17y + 1

− 6y

+ ··· − 12y + 1

+ 4y

+ ··· − 2y + 1

+ y

+ ··· + 2y + 1

− 12y

+ ··· − 6y + 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.929391 + 0.578619I

a = 1.120080 + 0.128738I

b = 0.91178 − 1.33839I

3.21916 + 5.01414I 0.26989 − 5.16816I

u = 0.929391 − 0.578619I

a = 1.120080 − 0.128738I

b = 0.91178 + 1.33839I

3.21916 − 5.01414I 0.26989 + 5.16816I

u = −0.451615 + 1.007870I

a = 0.338249 + 0.437888I

b = 0.231634 − 0.176676I

−2.35639 − 2.66812I −6.05034 + 3.60958I

u = −0.451615 − 1.007870I

a = 0.338249 − 0.437888I

b = 0.231634 + 0.176676I

−2.35639 + 2.66812I −6.05034 − 3.60958I

u = 0.396309 + 1.073370I

a = −0.565280 + 0.711972I

b = −1.052300 + 0.412205I

−0.63819 + 7.12816I −3.20870 − 8.22524I

u = 0.396309 − 1.073370I

a = −0.565280 − 0.711972I

b = −1.052300 − 0.412205I

−0.63819 − 7.12816I −3.20870 + 8.22524I

u = −0.462450 + 0.682292I

a = −0.332664 − 0.550280I

b = −0.85241 − 1.25415I

−1.24504 − 1.12270I −5.33111 + 3.33125I

u = −0.462450 − 0.682292I

a = −0.332664 + 0.550280I

b = −0.85241 + 1.25415I

−1.24504 + 1.12270I −5.33111 − 3.33125I

u = 0.255308 + 0.671839I

a = −0.033499 − 1.285680I

b = 0.94036 − 1.49852I

0.99305 − 4.20394I −1.88003 + 3.39974I

u = 0.255308 − 0.671839I

a = −0.033499 + 1.285680I

b = 0.94036 + 1.49852I

0.99305 + 4.20394I −1.88003 − 3.39974I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.485789 + 1.201540I

a = −0.150894 + 1.067090I

b = 0.29348 + 1.84901I

0.487588 + 0.633074I −0.204988 − 0.217129I

u = 0.485789 − 1.201540I

a = −0.150894 − 1.067090I

b = 0.29348 − 1.84901I

0.487588 − 0.633074I −0.204988 + 0.217129I

u = 0.030701 + 0.695739I

a = −0.07548 − 2.07079I

b = 0.336792 − 0.535431I

3.73407 + 1.39379I −4.07877 − 4.94416I

u = 0.030701 − 0.695739I

a = −0.07548 + 2.07079I

b = 0.336792 + 0.535431I

3.73407 − 1.39379I −4.07877 + 4.94416I

u = −0.683433 + 1.166390I

a = −0.300514 + 0.906230I

b = −1.80932 + 0.74833I

−0.90438 − 3.31503I −5.01594 + 7.05179I

u = −0.683433 − 1.166390I

a = −0.300514 − 0.906230I

b = −1.80932 − 0.74833I

−0.90438 + 3.31503I −5.01594 − 7.05179I

III. u-Polynomials

Crossings u-Polynomials at each crossing

− 9u

+ ··· − 11u + 1)(u

+ 6u

+ ··· + 23u + 1)

− u

+ ··· − u + 1)(u

− 2u

+ ··· + 7u + 1)

− 2u

+ ··· + u + 1)(u

+ 5u

+ ··· + 5688833u + 456713)

+ u

+ ··· + 3u

+ 1)(u

+ 13u

+ ··· − 4u + 7)

− 6u

+ ··· + u + 1)(u

+ u

+ ··· + 4497u + 361)

+ u

+ ··· + u + 1)(u

− 2u

+ ··· + 7u + 1)

+ 2u

+ ··· + 2u + 1)(u

+ 3u

+ ··· − 4u + 1)

− 6u

+ ··· − u + 1)(u

+ u

+ ··· + 4497u + 361)

+ 4u

+ ··· + 6u + 1)(u

− 5u

+ ··· − 361724u + 608312)

− u

+ ··· + 3u

+ 1)(u

+ 13u

+ ··· − 4u + 7)

− 9u

+ ··· − 6u + 1)(u

− 26u

+ ··· − 362u + 49)

− 2u

+ ··· − 2u + 1)(u

− u

+ ··· − 3750504u + 772753)

IV. Riley Polynomials

Crossings Riley Polynomials at each crossing

+ 5y

+ ··· − 5y + 1)(y

+ 66y

+ ··· − 193y + 1)

, c

+ 9y

+ ··· + 11y + 1)(y

+ 6y

+ ··· + 23y + 1)

− 2y

+ ··· + 23y + 1)

· (y

+ 123y

+ ··· + 6314489480935y + 208586764369)

, c

+ 9y

+ ··· + 6y + 1)(y

+ 26y

+ ··· + 362y + 49)

, c

− 12y

+ ··· − 17y + 1)(y

− 59y

+ ··· + 134503y + 130321)

− 6y

+ ··· − 12y + 1)(y

− y

+ ··· + 8y + 1)

+ 4y

+ ··· − 2y + 1)

· (y

+ 53y

+ ··· + 1499383242864y + 370043489344)

+ y

+ ··· + 2y + 1)(y

− 18y

+ ··· − 40394y + 2401)

− 12y

+ ··· − 6y + 1)

· (y

+ 77y

+ ··· − 906264208390y + 597147199009)