12n

0599

(K12n

0599

)

A knot diagram

Linearized knot diagam

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

Solving Sequence

4,8 9,12

1 3 11 7 5 2 6 10

, c

Ideals for irreducible components

of X

par

= h2.08585 × 10

+ 7.14533 × 10

+ ··· + 2.87929 × 10

b + 1.73918 × 10

5.30575 × 10

+ 1.71743 × 10

+ ··· + 1.43964 × 10

a − 9.16089 × 10

, u

+ 3u

+ ··· + 64u + 32i

= h4075773832297u

− 2172521972436u

+ ··· + 11315912876891b − 9436584195071,

12204692706877u

− 2379455879777u

+ ··· + 11315912876891a − 25876335477767,

− 5u

− 10u

− 23u

− 49u

− 54u

− 6u

− 42u

− 27u

− 4u

+ 12u

+ 20u

+ 11u

+ 2u + 1i

* 2 irreducible components of dim

= 0, with total 57 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

h2.09×10

+7.15×10

+· · ·+2.88×10

b+1.74×10

, 5.31×10

1.72 × 10

+ · · · + 1.44 × 10

a − 9.16 × 10

, u

+ 3u

+ · · · + 64u + 32i

(i) Arc colorings











−u





−0.000368546u

− 0.0119295u

+ ··· + 10.1776u + 0.636330

−0.00724434u

− 0.0248163u

+ ··· + 5.49278u − 0.604030





0.00215244u

+ 0.000734500u

+ ··· + 3.98031u + 0.893995

−0.00639184u

− 0.0228879u

+ ··· + 5.89992u − 0.440795





0.00520650u

+ 0.0133533u

+ ··· + 5.05203u + 1.97585

0.0108948u

+ 0.0265127u

+ ··· + 3.13035u + 0.813921





0.00687579u

+ 0.0128868u

+ ··· + 4.68483u + 1.24036

−0.00724434u

− 0.0248163u

+ ··· + 5.49278u − 0.604030





−0.0284111u

− 0.0802538u

+ ··· + 5.73043u + 0.660082

0.00297602u

+ 0.0148436u

+ ··· − 6.80600u + 0.842424





0.00358475u

+ 0.0184991u

+ ··· − 1.07592u + 1.21549

0.0129804u

+ 0.0337132u

+ ··· + 2.17091u + 1.68243





0.0241930u

+ 0.0654847u

+ ··· + 11.3542u + 2.32053

−0.00534000u

− 0.0268669u

+ ··· + 8.37009u − 1.59602





−0.0377424u

− 0.120931u

+ ··· + 1.19694u − 1.53872

−0.0110412u

− 0.0237259u

+ ··· − 0.776747u − 1.63777





0.0131333u

+ 0.0397783u

+ ··· + 8.14332u + 1.94601

−0.00917113u

− 0.0293322u

+ ··· + 2.00016u − 1.60632



(ii) Obstruction class = −1

(iii) Cusp Shapes = −0.0471714u

− 0.112106u

+ ··· − 28.6268u − 3.86134

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

+ 64u

+ ··· − 161335u + 1849

, c

+ 2u

+ ··· − 601u + 43

− 6u

+ ··· + 16u − 1

+ 12u

+ ··· + 3596u + 676

, c

− u

+ ··· − 190u − 43

, c

− 3u

+ ··· − 11u − 1

− 3u

+ ··· − 64u + 32

− u

+ ··· − 2006840u + 356879

− 29u

+ ··· − 342u − 76

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

− 192y

+ ··· − 7743629545y + 3418801

, c

− 64y

+ ··· + 161335y + 1849

+ 6y

+ ··· − 180y + 1

+ 2y

+ ··· − 1564952y + 456976

, c

+ 3y

+ ··· − 31284y + 1849

, c

− 37y

+ ··· − 245y + 1

+ y

+ ··· − 27136y + 1024

− 109y

+ ··· − 1736409911214y + 127362620641

− 58y

+ ··· + 99636y + 5776

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.648045 + 0.762828I

a = −0.199463 − 1.026950I

b = 0.000607 − 0.888637I

−2.26225 + 2.79311I −8.37862 − 3.97835I

u = 0.648045 − 0.762828I

a = −0.199463 + 1.026950I

b = 0.000607 + 0.888637I

−2.26225 − 2.79311I −8.37862 + 3.97835I

u = 0.462736 + 0.870276I

a = 1.082390 + 0.631958I

b = 1.380710 − 0.068283I

7.99084 − 2.22911I 4.00956 + 3.14309I

u = 0.462736 − 0.870276I

a = 1.082390 − 0.631958I

b = 1.380710 + 0.068283I

7.99084 + 2.22911I 4.00956 − 3.14309I

u = −0.371673 + 0.796152I

a = 0.020113 + 0.557804I

b = −0.222389 + 0.704830I

−0.17172 − 1.89179I −2.28677 + 1.75619I

u = −0.371673 − 0.796152I

a = 0.020113 − 0.557804I

b = −0.222389 − 0.704830I

−0.17172 + 1.89179I −2.28677 − 1.75619I

u = −0.314772 + 0.773309I

a = −0.38000 + 1.41391I

b = 1.093270 + 0.667135I

−10.09930 − 2.74341I −5.66707 + 2.17488I

u = −0.314772 − 0.773309I

a = −0.38000 − 1.41391I

b = 1.093270 − 0.667135I

−10.09930 + 2.74341I −5.66707 − 2.17488I

u = −1.000680 + 0.665007I

a = −0.077148 + 0.584959I

b = −1.209930 + 0.230150I

2.61996 − 1.17635I −6 − 1.021926 + 0.10I

u = −1.000680 − 0.665007I

a = −0.077148 − 0.584959I

b = −1.209930 − 0.230150I

2.61996 + 1.17635I −6 − 1.021926 + 0.10I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.629318 + 0.386672I

a = −1.66190 − 0.25886I

b = 1.123620 − 0.203923I

−0.311934 − 0.851962I −4.13073 + 4.38646I

u = −0.629318 − 0.386672I

a = −1.66190 + 0.25886I

b = 1.123620 + 0.203923I

−0.311934 + 0.851962I −4.13073 − 4.38646I

u = −0.205200 + 1.287660I

a = 0.412852 − 0.718154I

b = 0.200970 − 0.672153I

−2.91171 − 2.40047I −9.33804 + 3.58482I

u = −0.205200 − 1.287660I

a = 0.412852 + 0.718154I

b = 0.200970 + 0.672153I

−2.91171 + 2.40047I −9.33804 − 3.58482I

u = −0.317104 + 1.341020I

a = −0.596540 + 0.932678I

b = 0.024355 + 0.846164I

−12.43750 + 0.62091I 0

u = −0.317104 − 1.341020I

a = −0.596540 − 0.932678I

b = 0.024355 − 0.846164I

−12.43750 − 0.62091I 0

u = −0.443573 + 0.327558I

a = 0.77751 − 1.87015I

b = −0.326610 + 0.038977I

2.48884 − 1.59471I 3.72664 + 4.36571I

u = −0.443573 − 0.327558I

a = 0.77751 + 1.87015I

b = −0.326610 − 0.038977I

2.48884 + 1.59471I 3.72664 − 4.36571I

u = −0.049515 + 0.529296I

a = 2.04051 + 2.26722I

b = −1.299150 + 0.384278I

−8.30711 − 5.04057I −3.92081 + 3.17900I

u = −0.049515 − 0.529296I

a = 2.04051 − 2.26722I

b = −1.299150 − 0.384278I

−8.30711 + 5.04057I −3.92081 − 3.17900I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.23414 + 0.89196I

a = −0.182278 + 0.535254I

b = 1.38820 + 0.29236I

4.93779 + 5.55158I 0

u = 1.23414 − 0.89196I

a = −0.182278 − 0.535254I

b = 1.38820 − 0.29236I

4.93779 − 5.55158I 0

u = 0.74924 + 1.34147I

a = 0.230039 + 0.931808I

b = 0.230395 + 0.978898I

−12.6753 + 8.4287I 0

u = 0.74924 − 1.34147I

a = 0.230039 − 0.931808I

b = 0.230395 − 0.978898I

−12.6753 − 8.4287I 0

u = 0.384683 + 0.031619I

a = 1.34403 + 0.53921I

b = −1.109290 + 0.500907I

1.63611 − 2.57651I −5.00070 + 6.84199I

u = 0.384683 − 0.031619I

a = 1.34403 − 0.53921I

b = −1.109290 − 0.500907I

1.63611 + 2.57651I −5.00070 − 6.84199I

u = −1.28548 + 1.06224I

a = 0.087304 − 0.822069I

b = 1.298780 − 0.402243I

1.80773 − 7.39822I 0

u = −1.28548 − 1.06224I

a = 0.087304 + 0.822069I

b = 1.298780 + 0.402243I

1.80773 + 7.39822I 0

u = 0.81695 + 1.45625I

a = −0.614121 − 0.644235I

b = −1.177860 − 0.025942I

5.03473 + 1.74643I 0

u = 0.81695 − 1.45625I

a = −0.614121 + 0.644235I

b = −1.177860 + 0.025942I

5.03473 − 1.74643I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.270533 + 0.172470I

a = −1.27279 + 1.50644I

b = −1.50571 + 0.35734I

2.32167 − 2.06853I 2.16490 − 4.78895I

u = −0.270533 − 0.172470I

a = −1.27279 − 1.50644I

b = −1.50571 − 0.35734I

2.32167 + 2.06853I 2.16490 + 4.78895I

u = 0.253217

a = 2.52423

b = 0.315009

−0.948564 −10.7560

u = −1.33409 + 1.57582I

a = −0.115373 + 0.761660I

b = −1.43288 + 0.41746I

−7.4115 − 13.4268I 0

u = −1.33409 − 1.57582I

a = −0.115373 − 0.761660I

b = −1.43288 − 0.41746I

−7.4115 + 13.4268I 0

u = 1.13096 + 1.81862I

a = −0.140526 − 0.505969I

b = −1.38971 − 0.26319I

2.17544 + 5.80065I 0

u = 1.13096 − 1.81862I

a = −0.140526 + 0.505969I

b = −1.38971 + 0.26319I

2.17544 − 5.80065I 0

u = −2.19471

a = 0.570796

b = −1.33714

−3.13160 0

u = 0.90971 + 2.03841I

a = 0.349021 + 0.532377I

b = 1.261520 + 0.388603I

−8.60268 + 3.81146I 0

u = 0.90971 − 2.03841I

a = 0.349021 − 0.532377I

b = 1.261520 − 0.388603I

−8.60268 − 3.81146I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 2.24585

a = −0.323672

b = 0.0679481

−7.70072 0

u = −3.53341

a = 0.0214051

b = 1.29639

−3.75495 0

II.

= h4.08 × 10

− 2.17 × 10

+ · · · + 1.13 × 10

b − 9.44 × 10

, 1.22 ×

−2.38×10

+· · ·+1.13×10

a−2.59×10

, u

−5u

+· · ·+2u+1i

(i) Arc colorings











−u





−1.07854u

+ 0.210275u

+ ··· − 6.56711u + 2.28672

−0.360181u

+ 0.191988u

+ ··· + 0.0721482u + 0.833922





−0.806967u

+ 0.0658041u

+ ··· − 7.29725u + 1.66307

−0.308908u

+ 0.126579u

+ ··· + 0.0547816u + 0.689450





0.426151u

+ 0.510477u

+ ··· + 15.5167u + 6.16385

0.467779u

+ 0.114972u

+ ··· + 7.73906u + 1.62977





−0.718362u

+ 0.0182870u

+ ··· − 6.63926u + 1.45280

−0.360181u

+ 0.191988u

+ ··· + 0.0721482u + 0.833922





−1.47573u

+ 0.316511u

+ ··· − 8.51856u + 2.54844

−0.154046u

+ 0.151268u

+ ··· + 0.936513u + 1.93108





0.420096u

+ 0.903948u

+ ··· + 23.2129u + 9.22115

0.610929u

+ 0.339885u

+ ··· + 12.1399u + 2.27431





−1.10086u

+ 0.660424u

+ ··· + 4.24610u + 8.58306

−0.103998u

+ 0.391996u

+ ··· + 7.60146u + 2.75811





0.394864u

− 0.515063u

+ ··· − 7.27332u − 5.30627

−0.411913u

− 0.0161825u

+ ··· − 6.23025u − 2.14792





3.56778u

− 0.0378933u

+ ··· + 31.8302u − 0.00774955

0.910294u

− 0.145683u

+ ··· + 4.90300u − 2.39025



(ii) Obstruction class = 1

(iii) Cusp Shapes

9101535523664

11315912876891

−

12950974574918

11315912876891

+ ··· −

21645969002451

11315912876891

u +

1008303706222

11315912876891

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

− 15u

+ ··· + 7u − 1

− 3u

+ ··· + 3u − 1

+ 5u

+ ··· + 2u + 1

+ u

+ ··· − 4u − 1

+ 6u

+ ··· − 2u − 1

+ 3u

+ ··· + 3u + 1

− 8u

+ ··· − u + 1

− 5u

+ ··· + 2u + 1

− 14u

+ ··· − 4u + 1

+ 6u

+ ··· − 2u + 1

− 8u

+ ··· − u − 1

− u

+ ··· − 3u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

− 51y

+ ··· − 5y −1

, c

− 15y

+ ··· + 7y −1

+ 7y

+ ··· − 6y −1

− 13y

+ ··· − 24y −1

, c

+ 12y

+ ··· + 2y −1

, c

− 16y

+ ··· − 5y −1

− 10y

+ ··· − 18y −1

− 28y

+ ··· − 16y −1

− 13y

+ ··· + 19y −1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.596659 + 0.827825I

a = −0.045120 − 0.883234I

b = −0.238789 − 0.780455I

−0.66784 + 2.86329I −4.86388 − 6.69106I

u = 0.596659 − 0.827825I

a = −0.045120 + 0.883234I

b = −0.238789 + 0.780455I

−0.66784 − 2.86329I −4.86388 + 6.69106I

u = 0.755283

a = 1.45281

b = −1.12652

0.321895 0.516880

u = −0.184311 + 0.678178I

a = 1.60231 − 0.96713I

b = −0.042454 − 0.389554I

1.84141 − 1.47317I −9.34491 + 1.31525I

u = −0.184311 − 0.678178I

a = 1.60231 + 0.96713I

b = −0.042454 + 0.389554I

1.84141 + 1.47317I −9.34491 − 1.31525I

u = −0.604205 + 0.216942I

a = −0.229198 + 0.703203I

b = −1.41923 + 0.52118I

2.36544 − 2.52653I 5.67594 + 10.87302I

u = −0.604205 − 0.216942I

a = −0.229198 − 0.703203I

b = −1.41923 − 0.52118I

2.36544 + 2.52653I 5.67594 − 10.87302I

u = 0.004697 + 0.321783I

a = 4.20961 − 1.65523I

b = 1.356600 + 0.159175I

6.44360 + 0.56743I −0.903335 − 0.669018I

u = 0.004697 − 0.321783I

a = 4.20961 + 1.65523I

b = 1.356600 − 0.159175I

6.44360 − 0.56743I −0.903335 + 0.669018I

u = −1.32947 + 1.11212I

a = −0.095911 − 0.699773I

b = 1.38775 − 0.28744I

4.46896 − 6.63905I −0.81267 + 7.15016I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −1.32947 − 1.11212I

a = −0.095911 + 0.699773I

b = 1.38775 + 0.28744I

4.46896 + 6.63905I −0.81267 − 7.15016I

u = 0.37677 + 1.72909I

a = −0.714436 − 0.247634I

b = −1.335870 − 0.137594I

6.08786 + 3.33489I 0.87409 − 4.16417I

u = 0.37677 − 1.72909I

a = −0.714436 + 0.247634I

b = −1.335870 + 0.137594I

6.08786 − 3.33489I 0.87409 + 4.16417I

u = −1.88197

a = 0.330680

b = 0.443370

−7.37862 3.59810

u = 3.40639

a = −0.237996

b = 1.26711

−4.41331 −11.3650

III. u-Polynomials

Crossings u-Polynomials at each crossing

− 15u

+ ··· + 7u − 1)(u

+ 64u

+ ··· − 161335u + 1849)

− 3u

+ ··· + 3u − 1)(u

+ 2u

+ ··· − 601u + 43)

+ 5u

+ ··· + 2u + 1)(u

− 6u

+ ··· + 16u − 1)

+ u

+ ··· − 4u − 1)(u

+ 12u

+ ··· + 3596u + 676)

+ 6u

+ ··· − 2u − 1)(u

− u

+ ··· − 190u − 43)

+ 3u

+ ··· + 3u + 1)(u

+ 2u

+ ··· − 601u + 43)

− 8u

+ ··· − u + 1)(u

− 3u

+ ··· − 11u − 1)

− 5u

+ ··· + 2u + 1)(u

− 3u

+ ··· − 64u + 32)

− 14u

+ ··· − 4u + 1)(u

− u

+ ··· − 2006840u + 356879)

+ 6u

+ ··· − 2u + 1)(u

− u

+ ··· − 190u − 43)

− 8u

+ ··· − u − 1)(u

− 3u

+ ··· − 11u − 1)

− u

+ ··· − 3u + 1)(u

− 29u

+ ··· − 342u − 76)

IV. Riley Polynomials

Crossings Riley Polynomials at each crossing

− 51y

+ ··· − 5y −1)

· (y

− 192y

+ ··· − 7743629545y + 3418801)

, c

− 15y

+ ··· + 7y −1)(y

− 64y

+ ··· + 161335y + 1849)

+ 7y

+ ··· − 6y −1)(y

+ 6y

+ ··· − 180y + 1)

− 13y

+ ··· − 24y −1)(y

+ 2y

+ ··· − 1564952y + 456976)

, c

+ 12y

+ ··· + 2y −1)(y

+ 3y

+ ··· − 31284y + 1849)

, c

− 16y

+ ··· − 5y −1)(y

− 37y

+ ··· − 245y + 1)

− 10y

+ ··· − 18y −1)(y

+ y

+ ··· − 27136y + 1024)

− 28y

+ ··· − 16y −1)

· (y

− 109y

+ ··· − 1736409911214y + 127362620641)

− 13y

+ ··· + 19y −1)(y

− 58y

+ ··· + 99636y + 5776)