12n

0703

(K12n

0703

)

A knot diagram

Linearized knot diagam

4 6 7 8 9 10 4 12 2 3 9 7

Solving Sequence

4,8 5,12

9 6 7 1 2 3 11 10

, c

Ideals for irreducible components

of X

par

= h1.60229 × 10

+ 2.91450 × 10

+ ··· + 1.26296 × 10

b − 3.52131 × 10

1.21366 × 10

+ 2.79487 × 10

+ ··· + 1.32611 × 10

a + 1.28362 × 10

100

, u

+ 2u

+ ··· + 10u − 21i

= h−u

− 2u

+ 8u

+ 16u

− 24u

− 45u

+ 38u

+ 56u

− 34u

− 29u

+ 9u

+ 4u

+ 9u

+ b + u + 1,

− 2u

+ ··· + a + 5,

+ 3u

− 6u

− 24u

+ 8u

+ 69u

+ 7u

− 94u

− 22u

+ 63u

+ 20u

− 13u

− 14u

− 10u

− 1i

= hb

+ b − a, a

+ a + 1, u − 1i

* 3 irreducible components of dim

= 0, with total 74 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.

I. I

h1.60×10

+2.91×10

+· · ·+1.26×10

b−3.52×10

, 1.21×10

2.79 × 10

+ · · · + 1.33 × 10

a + 1.28 × 10

100

, u

+ 2u

+ · · · + 10u − 21i

(i) Arc colorings















−0.0915205u

− 0.210758u

+ ··· − 20.1374u − 9.67965

−0.0126868u

− 0.0230768u

+ ··· + 4.47039u + 0.278815





0.0149847u

+ 0.0198107u

+ ··· + 7.10770u + 2.36249

0.0166454u

+ 0.0346016u

+ ··· + 4.03014u + 0.137160





−0.110827u

− 0.258163u

+ ··· − 29.3739u − 6.63387

0.0161463u

+ 0.0324579u

+ ··· + 0.912590u − 0.403284









−0.100369u

− 0.231157u

+ ··· − 21.4928u − 10.3099

−0.0215354u

− 0.0434760u

+ ··· + 3.11502u − 0.351471





−0.0788337u

− 0.187681u

+ ··· − 24.6078u − 9.95846

−0.0215354u

− 0.0434760u

+ ··· + 3.11502u − 0.351471





−u

+ 1

−u





0.112884u

+ 0.258117u

+ ··· + 33.6265u + 7.39414

−0.00613650u

− 0.00991033u

+ ··· + 2.47671u + 1.02640





0.115245u

+ 0.257703u

+ ··· + 28.9349u + 5.85332

−0.00189354u

− 0.00106986u

+ ··· + 2.46134u + 1.14169



(ii) Obstruction class = −1

(iii) Cusp Shapes = 0.0893522u

+ 0.122027u

+ ··· − 35.4397u − 10.8689

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

+ 7u

+ ··· − 107283u + 5687

− 2u

+ ··· + 11u + 1

, c

+ 2u

+ ··· + 10u − 21

+ u

+ ··· − 11533u − 4223

+ 2u

+ ··· − 28u + 47

, c

+ 3u

+ ··· − 23u − 7

− 5u

+ ··· + 136u − 48

+ 17u

+ ··· + 586u − 227

+ u

+ ··· − 5060u − 2767

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

− 99y

+ ··· + 1442878657y −32341969

+ 2y

+ ··· + 75y −1

, c

− 76y

+ ··· + 6862y −441

+ 29y

+ ··· − 23722333y −17833729

− 12y

+ ··· + 71378y −2209

, c

+ 5y

+ ··· + 2125y −49

− 10y

+ ··· + 63808y −2304

+ 34y

+ ··· − 605918y −51529

− 107y

+ ··· − 5436606y −7656289

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.843879 + 0.544766I

a = 1.298890 − 0.127602I

b = 1.156400 + 0.474581I

−3.16540 + 3.11054I −14.1931 − 9.0876I

u = −0.843879 − 0.544766I

a = 1.298890 + 0.127602I

b = 1.156400 − 0.474581I

−3.16540 − 3.11054I −14.1931 + 9.0876I

u = 0.948829 + 0.204011I

a = −0.942145 − 0.845434I

b = −0.842082 − 0.113281I

−2.44958 − 4.10717I −10.9496 + 9.7884I

u = 0.948829 − 0.204011I

a = −0.942145 + 0.845434I

b = −0.842082 + 0.113281I

−2.44958 + 4.10717I −10.9496 − 9.7884I

u = −0.037941 + 1.123190I

a = −0.309131 − 0.625328I

b = −0.250371 − 0.018761I

−1.10227 + 4.51894I 0

u = −0.037941 − 1.123190I

a = −0.309131 + 0.625328I

b = −0.250371 + 0.018761I

−1.10227 − 4.51894I 0

u = −1.090260 + 0.307766I

a = −0.153294 − 0.936767I

b = −0.727540 + 0.848969I

−2.42178 − 2.55675I 0

u = −1.090260 − 0.307766I

a = −0.153294 + 0.936767I

b = −0.727540 − 0.848969I

−2.42178 + 2.55675I 0

u = 0.792699 + 0.232053I

a = −1.39064 − 0.28620I

b = −1.170460 + 0.185340I

−4.12045 − 1.98383I −18.7598 + 3.0273I

u = 0.792699 − 0.232053I

a = −1.39064 + 0.28620I

b = −1.170460 − 0.185340I

−4.12045 + 1.98383I −18.7598 − 3.0273I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −1.150340 + 0.254911I

a = −0.425744 + 0.326070I

b = −1.380530 − 0.225219I

−1.61488 + 0.87614I 0

u = −1.150340 − 0.254911I

a = −0.425744 − 0.326070I

b = −1.380530 + 0.225219I

−1.61488 − 0.87614I 0

u = −1.124160 + 0.427568I

a = 0.599114 + 0.157148I

b = 0.573870 + 0.680404I

−2.81458 + 0.86949I 0

u = −1.124160 − 0.427568I

a = 0.599114 − 0.157148I

b = 0.573870 − 0.680404I

−2.81458 − 0.86949I 0

u = 1.213070 + 0.090501I

a = 0.454982 − 0.314837I

b = 0.627652 + 1.153370I

−3.98050 − 5.51374I 0

u = 1.213070 − 0.090501I

a = 0.454982 + 0.314837I

b = 0.627652 − 1.153370I

−3.98050 + 5.51374I 0

u = 0.742164 + 0.235850I

a = 0.299105 + 1.265320I

b = −0.453999 + 1.033190I

2.30362 + 3.30557I −2.87153 − 3.56943I

u = 0.742164 − 0.235850I

a = 0.299105 − 1.265320I

b = −0.453999 − 1.033190I

2.30362 − 3.30557I −2.87153 + 3.56943I

u = −1.301400 + 0.156837I

a = 0.251488 + 1.049080I

b = −0.057943 + 0.886147I

−1.28653 − 3.07187I 0

u = −1.301400 − 0.156837I

a = 0.251488 − 1.049080I

b = −0.057943 − 0.886147I

−1.28653 + 3.07187I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.078130 + 0.779868I

a = 0.937931 + 0.091074I

b = 1.219160 + 0.105261I

−4.41965 − 10.75660I 0

u = 1.078130 − 0.779868I

a = 0.937931 − 0.091074I

b = 1.219160 − 0.105261I

−4.41965 + 10.75660I 0

u = −1.062820 + 0.800842I

a = −0.700193 − 0.073534I

b = −0.941274 + 0.263175I

−4.22067 + 1.89516I 0

u = −1.062820 − 0.800842I

a = −0.700193 + 0.073534I

b = −0.941274 − 0.263175I

−4.22067 − 1.89516I 0

u = −0.181860 + 0.623471I

a = 1.072740 − 0.311332I

b = 0.846917 + 0.444278I

1.18559 + 2.23449I −0.71696 − 3.13365I

u = −0.181860 − 0.623471I

a = 1.072740 + 0.311332I

b = 0.846917 − 0.444278I

1.18559 − 2.23449I −0.71696 + 3.13365I

u = 1.344180 + 0.263000I

a = 0.033573 − 0.599843I

b = −0.307839 + 0.697502I

−3.77877 − 5.48694I 0

u = 1.344180 − 0.263000I

a = 0.033573 + 0.599843I

b = −0.307839 − 0.697502I

−3.77877 + 5.48694I 0

u = −0.554000

a = 0.302766

b = −0.620774

−1.07952 −9.55000

u = 0.003980 + 0.413867I

a = 1.88223 + 0.89459I

b = 0.131386 + 0.662442I

0.54485 + 2.00796I −2.63887 − 4.05218I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.003980 − 0.413867I

a = 1.88223 − 0.89459I

b = 0.131386 − 0.662442I

0.54485 − 2.00796I −2.63887 + 4.05218I

u = −0.183724 + 0.367833I

a = 0.58192 + 1.74816I

b = −0.299016 + 0.515843I

−1.46466 + 0.28580I −10.27103 − 1.57830I

u = −0.183724 − 0.367833I

a = 0.58192 − 1.74816I

b = −0.299016 − 0.515843I

−1.46466 − 0.28580I −10.27103 + 1.57830I

u = 1.65391

a = 0.249685

b = 1.86192

−9.07692 0

u = −1.66786 + 0.09211I

a = 0.751228 − 0.535995I

b = 2.66084 − 0.38730I

−12.75570 + 3.35483I 0

u = −1.66786 − 0.09211I

a = 0.751228 + 0.535995I

b = 2.66084 + 0.38730I

−12.75570 − 3.35483I 0

u = −1.72061 + 0.05114I

a = 0.679921 − 0.682618I

b = 2.27477 − 0.94586I

−12.03510 + 5.10367I 0

u = −1.72061 − 0.05114I

a = 0.679921 + 0.682618I

b = 2.27477 + 0.94586I

−12.03510 − 5.10367I 0

u = −0.145583 + 0.234667I

a = −2.42652 + 0.00455I

b = −0.11826 + 1.67678I

0.55411 + 4.57385I −7.8171 − 13.5503I

u = −0.145583 − 0.234667I

a = −2.42652 − 0.00455I

b = −0.11826 − 1.67678I

0.55411 − 4.57385I −7.8171 + 13.5503I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.266031 + 0.033873I

a = 0.13429 + 5.34542I

b = 0.444871 − 0.069784I

3.84010 + 3.87958I −14.7891 − 1.0481I

u = 0.266031 − 0.033873I

a = 0.13429 − 5.34542I

b = 0.444871 + 0.069784I

3.84010 − 3.87958I −14.7891 + 1.0481I

u = 1.73181 + 0.18076I

a = −0.720894 − 0.731345I

b = −2.16250 − 0.49231I

−12.24970 − 6.15405I 0

u = 1.73181 − 0.18076I

a = −0.720894 + 0.731345I

b = −2.16250 + 0.49231I

−12.24970 + 6.15405I 0

u = −1.77155 + 0.23587I

a = −0.696419 + 0.603643I

b = −2.34613 + 0.51535I

−14.1664 + 14.9969I 0

u = −1.77155 − 0.23587I

a = −0.696419 − 0.603643I

b = −2.34613 − 0.51535I

−14.1664 − 14.9969I 0

u = −1.78772 + 0.04019I

a = −0.733763 − 0.585348I

b = −2.15718 − 0.56893I

−15.0134 + 6.2911I 0

u = −1.78772 − 0.04019I

a = −0.733763 + 0.585348I

b = −2.15718 + 0.56893I

−15.0134 − 6.2911I 0

u = 1.77789 + 0.25574I

a = 0.657004 + 0.451249I

b = 2.28450 + 0.38651I

−13.8622 − 6.3433I 0

u = 1.77789 − 0.25574I

a = 0.657004 − 0.451249I

b = 2.28450 − 0.38651I

−13.8622 + 6.3433I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.79768 + 0.03453I

a = 0.527842 − 0.629408I

b = 1.97284 − 0.48816I

−13.39870 + 1.16047I 0

u = 1.79768 − 0.03453I

a = 0.527842 + 0.629408I

b = 1.97284 + 0.48816I

−13.39870 − 1.16047I 0

u = 1.82600 + 0.05971I

a = −0.823032 − 0.428595I

b = −2.11304 − 0.47973I

−14.0479 − 3.0438I 0

u = 1.82600 − 0.05971I

a = −0.823032 + 0.428595I

b = −2.11304 + 0.47973I

−14.0479 + 3.0438I 0

u = −2.00544

a = 0.242799

b = 1.02879

−7.47069 0

II. I

h−u

−2u

+· · ·+b+1, −2u

−2u

+· · ·+a+5, u

+3u

+· · ·−10u

−1i

(i) Arc colorings















+ 2u

+ ··· − u − 5

+ 2u

+ ··· − u − 1





+ 9u

+ ··· − 16u − 3

10u

+ 17u

+ ··· + 5u − 7





+ 7u

+ ··· + 11u + 1

11u

+ 17u

+ ··· + 7u − 8









+ 10u

+ ··· − 44u

− 8

+ 10u

+ ··· − 43u

− 4





− 9u

+ ··· − u

− 4

+ 10u

+ ··· − 43u

− 4





−u

+ 1

−u





−u

− u

+ ··· − 3u + 4

−11u

− 16u

+ ··· − 3u + 7





13u

+ 22u

+ ··· + 2u − 6

15u

+ 25u

+ ··· + 9u − 11



(ii) Obstruction class = 1

(iii) Cusp Shapes = 26u

+ 43u

− 216u

− 339u

+ 679u

+ 927u

− 1096u

−

1104u

+ 928u

+ 563u

− 215u

− 149u

− 204u

+ 32u − 15

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

− 8u

+ ··· + 175u − 43

− 3u

+ ··· + 2u

− 1

, c

+ 3u

+ ··· − 10u

− 1

− u

+ ··· − u

− 1

+ u

+ ··· + u + 1

− 3u

+ ··· + 10u

+ 1

− 4u

+ ··· + u + 1

− u

+ ··· + 27u − 13

+ u

+ ··· − 7u

− 1

+ 4u

+ ··· + u − 1

− 2u

+ ··· + u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

+ 2y

+ ··· − 15815y −1849

− 3y

+ ··· + 4y −1

, c

− 21y

+ ··· − 20y −1

+ 3y

+ ··· − 2y −1

+ 2y

+ ··· − 3y −1

, c

+ 10y

+ ··· − 3y −1

+ 5y

+ ··· + 131y −169

+ 15y

+ ··· − 14y −1

+ 4y

+ ··· − 37y −1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.860177 + 0.509187I

a = −1.021030 + 0.032473I

b = −0.879433 + 0.229899I

−2.90182 − 2.03075I −10.03062 + 3.32590I

u = 0.860177 − 0.509187I

a = −1.021030 − 0.032473I

b = −0.879433 − 0.229899I

−2.90182 + 2.03075I −10.03062 − 3.32590I

u = 1.320510 + 0.166851I

a = −0.090859 + 0.980403I

b = −0.175878 + 0.242981I

−0.02472 + 2.27007I −5.66786 − 3.21825I

u = 1.320510 − 0.166851I

a = −0.090859 − 0.980403I

b = −0.175878 − 0.242981I

−0.02472 − 2.27007I −5.66786 + 3.21825I

u = −1.347170 + 0.162955I

a = −0.160946 + 0.533747I

b = −0.22492 − 1.70994I

−3.25137 + 6.18801I −3.54918 − 9.67050I

u = −1.347170 − 0.162955I

a = −0.160946 − 0.533747I

b = −0.22492 + 1.70994I

−3.25137 − 6.18801I −3.54918 + 9.67050I

u = −1.42579 + 0.12850I

a = 0.070901 − 0.902606I

b = 0.289612 − 1.144560I

−0.93716 + 5.50758I −6.26875 − 6.01276I

u = −1.42579 − 0.12850I

a = 0.070901 + 0.902606I

b = 0.289612 + 1.144560I

−0.93716 − 5.50758I −6.26875 + 6.01276I

u = −0.206520 + 0.508428I

a = 0.860914 − 0.633967I

b = −0.115881 − 1.290910I

0.74360 − 3.97923I −4.72626 + 2.68613I

u = −0.206520 − 0.508428I

a = 0.860914 + 0.633967I

b = −0.115881 + 1.290910I

0.74360 + 3.97923I −4.72626 − 2.68613I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.071627 + 0.286359I

a = −4.47522 − 0.75940I

b = −0.277531 − 0.478076I

4.21917 − 3.97249I 6.01465 + 6.05055I

u = 0.071627 − 0.286359I

a = −4.47522 + 0.75940I

b = −0.277531 + 0.478076I

4.21917 + 3.97249I 6.01465 − 6.05055I

u = −1.72665 + 0.09660I

a = 0.721441 − 0.590290I

b = 2.34637 − 0.60996I

−12.29270 + 4.25654I −10.89997 − 2.52513I

u = −1.72665 − 0.09660I

a = 0.721441 + 0.590290I

b = 2.34637 + 0.60996I

−12.29270 − 4.25654I −10.89997 + 2.52513I

u = 1.90762

a = 0.189589

b = 1.07533

−7.29848 9.25600

III. I

= hb

+ b − a, a

+ a + 1, u − 1i

(i) Arc colorings



















a + 1

−ba + 1





−b

ba + a









−b + 2a





−b + a





−1





a + 1

−ba − a





a + 1

−ba + 1



(ii) Obstruction class = 1

(iii) Cusp Shapes = 3ba − a − 9

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

− u + 1)

− 2u

+ 2u

− u + 1

, c

(u − 1)

, c

− u

+ u + 1

(u + 1)

, c

+ u + 1)

+ 2u

+ 3u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ y + 1)

+ 2y

+ 3y + 1

, c

(y −1)

, c

− 3y

+ 5y

− 3y + 1

+ 4y

+ 6y

− 5y + 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.00000

a = −0.500000 + 0.866025I

b = 0.070696 + 0.758745I

−1.64493 + 2.02988I −10.57732 − 1.82047I

u = 1.00000

a = −0.500000 + 0.866025I

b = −1.070700 − 0.758745I

−1.64493 + 2.02988I −4.92268 − 2.50966I

u = 1.00000

a = −0.500000 − 0.866025I

b = 0.070696 − 0.758745I

−1.64493 − 2.02988I −10.57732 + 1.82047I

u = 1.00000

a = −0.500000 − 0.866025I

b = −1.070700 + 0.758745I

−1.64493 − 2.02988I −4.92268 + 2.50966I

IV. u-Polynomials

Crossings u-Polynomials at each crossing

((u

− u + 1)

)(u

− 8u

+ ··· + 175u − 43)

· (u

+ 7u

+ ··· − 107283u + 5687)

− 2u

+ 2u

− u + 1)(u

− 3u

+ ··· + 2u

− 1)

· (u

− 2u

+ ··· + 11u + 1)

, c

((u − 1)

)(u

+ 3u

+ ··· − 10u

− 1)(u

+ 2u

+ ··· + 10u − 21)

− u

+ u + 1)(u

− u

+ ··· − u

− 1)

· (u

+ u

+ ··· − 11533u − 4223)

− u

+ u + 1)(u

+ u

+ ··· + u + 1)

· (u

+ 2u

+ ··· − 28u + 47)

((u + 1)

)(u

− 3u

+ ··· + 10u

+ 1)(u

+ 2u

+ ··· + 10u − 21)

((u

− u + 1)

)(u

− 4u

+ ··· + u + 1)(u

+ 3u

+ ··· − 23u − 7)

− u

+ ··· + 27u − 13)(u

− 5u

+ ··· + 136u − 48)

((u

+ u + 1)

)(u

+ u

+ ··· − 7u

− 1)

· (u

+ 17u

+ ··· + 586u − 227)

((u

+ u + 1)

)(u

+ 4u

+ ··· + u − 1)(u

+ 3u

+ ··· − 23u − 7)

+ 2u

+ 3u + 1)(u

− 2u

+ ··· + u + 1)

· (u

+ u

+ ··· − 5060u − 2767)

V. Riley Polynomials

Crossings Riley Polynomials at each crossing

((y

+ y + 1)

)(y

+ 2y

+ ··· − 15815y −1849)

· (y

− 99y

+ ··· + 1442878657y −32341969)

+ 2y

+ 3y + 1)(y

− 3y

+ ··· + 4y −1)

· (y

+ 2y

+ ··· + 75y −1)

, c

((y −1)

)(y

− 21y

+ ··· − 20y −1)

· (y

− 76y

+ ··· + 6862y −441)

− 3y

+ 5y

− 3y + 1)(y

+ 3y

+ ··· − 2y −1)

· (y

+ 29y

+ ··· − 23722333y −17833729)

− 3y

+ 5y

− 3y + 1)(y

+ 2y

+ ··· − 3y −1)

· (y

− 12y

+ ··· + 71378y −2209)

, c

((y

+ y + 1)

)(y

+ 10y

+ ··· − 3y −1)

· (y

+ 5y

+ ··· + 2125y −49)

+ 5y

+ ··· + 131y −169)(y

− 10y

+ ··· + 63808y −2304)

((y

+ y + 1)

)(y

+ 15y

+ ··· − 14y −1)

· (y

+ 34y

+ ··· − 605918y −51529)

+ 4y

+ 6y

− 5y + 1)(y

+ 4y

+ ··· − 37y −1)

· (y

− 107y

+ ··· − 5436606y −7656289)