11a

208

(K11a

208

)

A knot diagram

Linearized knot diagam

7 1 11 10 9 2 6 3 4 5 8

Solving Sequence

2,7

1 3 6 8 9 5 11 4 10

, c

Ideals for irreducible components

of X

par

= hu

+ u

+ ··· + 2u − 1i

* 1 irreducible components of dim

= 0, with total 52 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

= hu

+ u

+ · · · + 2u − 1i

(i) Arc colorings















+ 1





−u





−u

+ u





+ 2u

+ 3u

+ 2u

+ u

+ 2u

+ u





−u

− 4u

+ ··· − 2u

− u

−u

− 3u

+ ··· − 2u

+ u





−u

− u

+ 1

+ 2u





+ 3u

+ 7u

+ 10u

+ 7u

+ u

− 2u

− 3u

− u

+ 1

−u

− 4u

− 10u

− 18u

− 23u

− 24u

− 18u

− 10u

− 3u





+ 8u

+ ··· + u

+ 2u

−u

− 9u

+ ··· + u

+ u





+ 8u

+ ··· + u

+ 2u

−u

− 9u

+ ··· + u

+ u



(ii) Obstruction class = −1

(iii) Cusp Shapes = 4u

+ 4u

+ ··· + 4u

+ 14

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

+ u

+ ··· + 2u − 1

, c

+ 17u

+ ··· − 6u + 1

, c

+ 3u

+ ··· + 37u + 16

, c

− u

+ ··· + 3u

− 1

+ u

+ ··· − 28u − 40

− 5u

+ ··· + 96u − 16

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ 17y

+ ··· − 6y + 1

, c

+ 37y

+ ··· − 54y + 1

, c

+ 33y

+ ··· − 2425y + 256

, c

− 43y

+ ··· − 6y + 1

− 7y

+ ··· − 38704y + 1600

+ 5y

+ ··· + 5856y + 256

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.768826 + 0.671773I

2.57641 + 0.11774I 9.48504 + 0.88977I

u = −0.768826 − 0.671773I

2.57641 − 0.11774I 9.48504 − 0.88977I

u = 0.797976 + 0.676802I

−0.37697 − 4.15655I 6.46155 + 2.97848I

u = 0.797976 − 0.676802I

−0.37697 + 4.15655I 6.46155 − 2.97848I

u = −0.189335 + 0.934390I

3.08561 − 2.46256I 8.42989 + 4.48427I

u = −0.189335 − 0.934390I

3.08561 + 2.46256I 8.42989 − 4.48427I

u = −0.749484 + 0.734944I

3.28879 + 0.58865I 11.43703 − 2.08567I

u = −0.749484 − 0.734944I

3.28879 − 0.58865I 11.43703 + 2.08567I

u = 0.085244 + 1.047640I

−3.32915 − 0.06069I 1.99003 − 0.27621I

u = 0.085244 − 1.047640I

−3.32915 + 0.06069I 1.99003 + 0.27621I

u = −0.113059 + 1.052610I

−6.59928 − 4.05816I −1.05392 + 4.39886I

u = −0.113059 − 1.052610I

−6.59928 + 4.05816I −1.05392 − 4.39886I

u = 0.063300 + 0.938721I

−2.09979 + 1.29128I 2.50126 − 5.46837I

u = 0.063300 − 0.938721I

−2.09979 − 1.29128I 2.50126 + 5.46837I

u = −0.812741 + 0.682085I

4.28204 + 8.22013I 11.15083 − 4.69120I

u = −0.812741 − 0.682085I

4.28204 − 8.22013I 11.15083 + 4.69120I

u = 0.132755 + 1.056620I

−2.13743 + 8.17751I 3.80777 − 6.73213I

u = 0.132755 − 1.056620I

−2.13743 − 8.17751I 3.80777 + 6.73213I

u = 0.506635 + 0.944324I

−0.02731 − 2.14885I 5.90152 + 0.32388I

u = 0.506635 − 0.944324I

−0.02731 + 2.14885I 5.90152 − 0.32388I

u = 0.731364 + 0.804742I

1.86476 + 2.42134I 7.78972 − 4.58127I

u = 0.731364 − 0.804742I

1.86476 − 2.42134I 7.78972 + 4.58127I

u = 0.797362 + 0.743175I

9.36019 − 1.41507I 15.5003 + 0.7140I

u = 0.797362 − 0.743175I

9.36019 + 1.41507I 15.5003 − 0.7140I

u = −0.542555 + 0.954190I

−4.16270 − 1.90381I 1.38256 + 2.60810I

u = −0.542555 − 0.954190I

−4.16270 + 1.90381I 1.38256 − 2.60810I

u = −0.772975 + 0.816132I

6.58267 − 5.63550I 13.2814 + 5.3850I

u = −0.772975 − 0.816132I

6.58267 + 5.63550I 13.2814 − 5.3850I

u = 0.573285 + 0.968251I

−0.49912 + 5.98276I 5.45137 − 6.27101I

u = 0.573285 − 0.968251I

−0.49912 − 5.98276I 5.45137 + 6.27101I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.697455 + 0.924225I

1.49374 + 3.03580I 6.84419 + 0.I

u = 0.697455 − 0.924225I

1.49374 − 3.03580I 6.84419 + 0.I

u = −0.741062 + 0.918318I

6.26590 − 0.08152I 12.71506 + 0.I

u = −0.741062 − 0.918318I

6.26590 + 0.08152I 12.71506 + 0.I

u = −0.704555 + 0.970451I

2.57341 − 6.12702I 9.43955 + 7.72623I

u = −0.704555 − 0.970451I

2.57341 + 6.12702I 9.43955 − 7.72623I

u = 0.733151 + 0.979368I

8.63821 + 7.17962I 13.94643 + 0.I

u = 0.733151 − 0.979368I

8.63821 − 7.17962I 13.94643 + 0.I

u = −0.699306 + 1.006300I

1.57520 − 5.69142I 0

u = −0.699306 − 1.006300I

1.57520 + 5.69142I 0

u = 0.711550 + 1.013250I

−1.39365 + 9.84829I 0

u = 0.711550 − 1.013250I

−1.39365 − 9.84829I 0

u = −0.719515 + 1.016110I

3.2680 − 13.9792I 0

u = −0.719515 − 1.016110I

3.2680 + 13.9792I 0

u = 0.548113 + 0.343853I

0.91864 − 1.70258I 9.13001 + 0.33121I

u = 0.548113 − 0.343853I

0.91864 + 1.70258I 9.13001 − 0.33121I

u = 0.612012 + 0.204828I

1.88978 + 5.96132I 11.11302 − 5.64995I

u = 0.612012 − 0.204828I

1.88978 − 5.96132I 11.11302 + 5.64995I

u = −0.575732 + 0.249215I

−2.51014 − 2.07572I 5.84325 + 3.66425I

u = −0.575732 − 0.249215I

−2.51014 + 2.07572I 5.84325 − 3.66425I

u = −0.564176

5.97021 16.1930

u = 0.362065

0.641117 15.5690

II. u-Polynomials

Crossings u-Polynomials at each crossing

, c

+ u

+ ··· + 2u − 1

, c

+ 17u

+ ··· − 6u + 1

, c

+ 3u

+ ··· + 37u + 16

, c

− u

+ ··· + 3u

− 1

+ u

+ ··· − 28u − 40

− 5u

+ ··· + 96u − 16

III. Riley Polynomials

Crossings Riley Polynomials at each crossing

, c

+ 17y

+ ··· − 6y + 1

, c

+ 37y

+ ··· − 54y + 1

, c

+ 33y

+ ··· − 2425y + 256

, c

− 43y

+ ··· − 6y + 1

− 7y

+ ··· − 38704y + 1600

+ 5y

+ ··· + 5856y + 256