(K10a

)

A knot diagram

Linearized knot diagam

5 9 6 1 4 3 10 7 2 8

Solving Sequence

3,9

7,10

6 4 5 1 8

, c

Ideals for irreducible components

of X

par

= h−6.12530 × 10

+ 1.02963 × 10

+ ··· + 2.34036 × 10

b + 4.69152 × 10

− 1.57092 × 10

+ 3.30476 × 10

+ ··· + 9.36144 × 10

a + 1.45111 × 10

, u

− u

+ ··· + 12u + 8i

= ha, −v

+ b − 2v −1, v

+ 2v

+ v + 1i

* 2 irreducible components of dim

= 0, with total 36 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−6.13×10

+1.03×10

+· · ·+2.34×10

b+4.69×10

, −1.57×

+3.30×10

+· · ·+9.36×10

a+1.45×10

, u

−u

+· · ·+12u+8i

(i) Arc colorings











−u





0.167808u

− 0.353018u

+ ··· − 2.39523u − 1.55009

0.261725u

− 0.439945u

+ ··· + 2.01891u − 2.00462





−u

+ u





0.429532u

− 0.792963u

+ ··· − 0.376322u − 3.55471

0.261725u

− 0.439945u

+ ··· + 2.01891u − 2.00462





0.334706u

− 0.0742812u

+ ··· + 3.75000u + 2.50288

0.0757738u

− 0.0652588u

+ ··· − 4.16452u − 1.47047





0.0320196u

+ 0.277867u

+ ··· + 5.92497u + 1.20624

−0.211499u

+ 0.571258u

+ ··· + 6.09759u + 3.97229





−0.429532u

+ 0.792963u

+ ··· + 0.376322u + 3.55471

−0.0675857u

+ 0.312561u

+ ··· + 2.94382u + 0.902830





0.309620u

− 0.669262u

+ ··· − 2.20116u − 2.87870

0.249910u

− 0.483907u

+ ··· + 0.866167u − 2.07146



(ii) Obstruction class = −1

(iii) Cusp Shapes = −

60635423650415331489185849

46807175136350804609973980

108124405345856702791639919

46807175136350804609973980

··· +

483007911642190145433442939

23403587568175402304986990

u +

98098888352311967905148621

11701793784087701152493495

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

+ 2u

+ ··· + 3u + 1

, c

− u

+ ··· + 12u + 8

, c

+ 8u

+ ··· + 11u + 1

, c

− 4u

+ ··· − 16u

+ 1

+ 14u

+ ··· + 32u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

− 8y

+ ··· + 11y −1

, c

+ 21y

+ ··· − 304y −64

, c

+ 36y

+ ··· − 29y −1

, c

− 14y

+ ··· + 32y −1

+ 14y

+ ··· + 340y −1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.287842 + 0.978115I

a = 0.995506 − 0.250345I

b = −0.990032 + 0.166252I

−1.68836 − 2.02472I −12.19123 + 3.15987I

u = 0.287842 − 0.978115I

a = 0.995506 + 0.250345I

b = −0.990032 − 0.166252I

−1.68836 + 2.02472I −12.19123 − 3.15987I

u = −0.258728 + 1.015690I

a = 0.614647 + 0.062246I

b = −0.555531 + 0.902494I

1.90081 + 2.94788I −6.37142 − 4.00779I

u = −0.258728 − 1.015690I

a = 0.614647 − 0.062246I

b = −0.555531 − 0.902494I

1.90081 − 2.94788I −6.37142 + 4.00779I

u = 0.044652 + 1.064410I

a = 0.01862 − 1.72371I

b = −0.12788 − 1.49913I

3.40289 − 3.09457I −6.42907 + 2.76186I

u = 0.044652 − 1.064410I

a = 0.01862 + 1.72371I

b = −0.12788 + 1.49913I

3.40289 + 3.09457I −6.42907 − 2.76186I

u = 0.818675 + 0.392192I

a = 0.407864 − 1.122020I

b = −0.568824 + 0.589839I

−2.18443 + 2.93057I −13.2700 − 5.9877I

u = 0.818675 − 0.392192I

a = 0.407864 + 1.122020I

b = −0.568824 − 0.589839I

−2.18443 − 2.93057I −13.2700 + 5.9877I

u = −1.163260 + 0.173959I

a = −0.077899 − 0.940641I

b = −0.05060 + 1.49956I

5.10374 + 0.60080I −6.85884 + 0.13509I

u = −1.163260 − 0.173959I

a = −0.077899 + 0.940641I

b = −0.05060 − 1.49956I

5.10374 − 0.60080I −6.85884 − 0.13509I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.004841 + 1.181600I

a = −0.834891 − 0.002237I

b = 0.261591 + 0.605055I

3.34637 + 1.37148I −3.58776 − 2.92200I

u = 0.004841 − 1.181600I

a = −0.834891 + 0.002237I

b = 0.261591 − 0.605055I

3.34637 − 1.37148I −3.58776 + 2.92200I

u = 1.169540 + 0.246902I

a = 0.090452 − 0.991567I

b = −0.17482 + 1.55316I

4.94269 + 5.66526I −7.31949 − 5.14166I

u = 1.169540 − 0.246902I

a = 0.090452 + 0.991567I

b = −0.17482 − 1.55316I

4.94269 − 5.66526I −7.31949 + 5.14166I

u = −0.360189 + 1.214590I

a = −1.071120 − 0.076444I

b = 0.414527 − 0.386927I

2.58252 + 3.89244I −4.89744 − 3.42674I

u = −0.360189 − 1.214590I

a = −1.071120 + 0.076444I

b = 0.414527 + 0.386927I

2.58252 − 3.89244I −4.89744 + 3.42674I

u = 0.513708 + 1.159100I

a = 1.164090 − 0.112067I

b = −0.819767 − 0.833430I

0.26767 − 7.94172I −10.29455 + 8.51301I

u = 0.513708 − 1.159100I

a = 1.164090 + 0.112067I

b = −0.819767 + 0.833430I

0.26767 + 7.94172I −10.29455 − 8.51301I

u = 0.354082 + 0.631353I

a = 0.44471 − 1.78764I

b = −0.534495 − 0.382584I

−2.82990 − 0.89439I −12.3753 + 7.1209I

u = 0.354082 − 0.631353I

a = 0.44471 + 1.78764I

b = −0.534495 + 0.382584I

−2.82990 + 0.89439I −12.3753 − 7.1209I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.659340 + 0.056414I

a = −0.636628 − 0.442458I

b = −0.073834 + 0.218596I

−0.946260 − 0.088153I −9.34082 − 0.77609I

u = −0.659340 − 0.056414I

a = −0.636628 + 0.442458I

b = −0.073834 − 0.218596I

−0.946260 + 0.088153I −9.34082 + 0.77609I

u = 0.000493 + 0.636688I

a = 0.198636 − 0.514130I

b = −0.289339 + 1.220180I

2.22875 + 2.67528I −2.73278 − 2.26366I

u = 0.000493 − 0.636688I

a = 0.198636 + 0.514130I

b = −0.289339 − 1.220180I

2.22875 − 2.67528I −2.73278 + 2.26366I

u = −0.40839 + 1.41713I

a = 0.780933 + 0.268916I

b = −0.19663 + 1.64569I

10.43260 + 6.00927I −4.11461 − 3.31809I

u = −0.40839 − 1.41713I

a = 0.780933 − 0.268916I

b = −0.19663 − 1.64569I

10.43260 − 6.00927I −4.11461 + 3.31809I

u = 0.34967 + 1.43738I

a = −0.805445 + 0.250021I

b = 0.04143 + 1.56263I

10.72190 + 0.46043I −3.63720 − 1.59605I

u = 0.34967 − 1.43738I

a = −0.805445 − 0.250021I

b = 0.04143 − 1.56263I

10.72190 − 0.46043I −3.63720 + 1.59605I

u = 0.64547 + 1.35144I

a = 1.222060 − 0.008698I

b = −0.27678 − 1.65105I

8.4689 − 12.1855I −6.56707 + 7.63472I

u = 0.64547 − 1.35144I

a = 1.222060 + 0.008698I

b = −0.27678 + 1.65105I

8.4689 + 12.1855I −6.56707 − 7.63472I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.60403 + 1.37429I

a = −1.203410 + 0.000498I

b = 0.11865 − 1.50838I

8.95423 + 5.75725I −5.65390 − 2.88970I

u = −0.60403 − 1.37429I

a = −1.203410 − 0.000498I

b = 0.11865 + 1.50838I

8.95423 − 5.75725I −5.65390 + 2.88970I

u = −0.470095

a = −0.116243

b = −0.355337

−0.842528 −11.7170

II. I

= ha, −v

+ b − 2v − 1, v

+ 2v

+ v + 1i

(i) Arc colorings















+ 2v + 1









+ 2v + 1





+ v

+ v − 1





+ v

−v − 1





−v

− 2v − 1





+ 2v + 1



(ii) Obstruction class = 1

(iii) Cusp Shapes = 2v

+ 5v − 11

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

+ u

− 1

, c

− u

+ 2u − 1

− u

+ 1

, c

+ u

+ 2u + 1

(u − 1)

, c

(u + 1)

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

− y

+ 2y − 1

, c

+ 3y

+ 2y − 1

, c

(y − 1)

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

v = −0.122561 + 0.744862I

a = 0

b = 0.215080 + 1.307140I

1.37919 − 2.82812I −12.69240 + 3.35914I

v = −0.122561 − 0.744862I

a = 0

b = 0.215080 − 1.307140I

1.37919 + 2.82812I −12.69240 − 3.35914I

v = −1.75488

a = 0

b = 0.569840

−2.75839 −13.6150

III. u-Polynomials

Crossings u-Polynomials at each crossing

+ u

− 1)(u

+ 2u

+ ··· + 3u + 1)

, c

− u

+ ··· + 12u + 8)

− u

+ 2u − 1)(u

+ 8u

+ ··· + 11u + 1)

− u

+ 1)(u

+ 2u

+ ··· + 3u + 1)

, c

+ u

+ 2u + 1)(u

+ 8u

+ ··· + 11u + 1)

((u − 1)

)(u

− 4u

+ ··· − 16u

+ 1)

((u + 1)

)(u

+ 14u

+ ··· + 32u + 1)

((u + 1)

)(u

− 4u

+ ··· − 16u

+ 1)

IV. Riley Polynomials

Crossings Riley Polynomials at each crossing

, c

− y

+ 2y − 1)(y

− 8y

+ ··· + 11y − 1)

, c

+ 21y

+ ··· − 304y − 64)

, c

+ 3y

+ 2y − 1)(y

+ 36y

+ ··· − 29y − 1)

, c

((y − 1)

)(y

− 14y

+ ··· + 32y − 1)

((y − 1)

)(y

+ 14y

+ ··· + 340y − 1)