11a

(K11a

)

A knot diagram

Linearized knot diagam

6 1 10 8 2 3 5 11 4 9 7

Solving Sequence

1,6

2 3 7 5 8 4 11 9 10

, c

Ideals for irreducible components

of X

par

= hu

− u

+ ··· + u

+ 1i

* 1 irreducible components of dim

= 0, with total 60 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

+ · · · + u

+ 1i

(i) Arc colorings











−u





+ 1

−u





−u

− 2u

− u

+ u





−u

+ u





−u

− 2u

− 3u

− 2u

− u

+ 3u

+ 4u

+ 3u

+ u





−u

− 4u

− 9u

− 12u

− 11u

− 6u

− 2u

− u

+ 5u

+ 12u

+ 17u

+ 15u

+ 9u

+ 4u

+ 2u

+ u





+ 3u

+ 4u

+ 3u

+ u

+ 1

−u

− 2u

− 3u

− 2u

− u





−u

− 8u

+ ··· − 4u

− 2u

+ 7u

+ ··· + 2u

+ u





+ 13u

+ ··· + 3u

+ 1

−u

− 12u

+ ··· − 5u

− 2u





+ 13u

+ ··· + 3u

+ 1

−u

− 12u

+ ··· − 5u

− 2u



(ii) Obstruction class = −1

(iii) Cusp Shapes = −4u

+ 4u

+ ··· − 4u + 2

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

− u

+ ··· + u

+ 1

+ 29u

+ ··· + 2u + 1

, c

− u

+ ··· + u

+ 1

, c

+ 5u

+ ··· + 122u + 13

+ u

+ ··· − 118u + 37

, c

+ 21u

+ ··· + 2u + 1

− 5u

+ ··· − 12u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ 29y

+ ··· + 2y + 1

+ 5y

+ ··· + 14y + 1

, c

+ 21y

+ ··· + 2y + 1

, c

+ 41y

+ ··· + 4330y + 169

− 19y

+ ··· + 12050y + 1369

, c

+ 37y

+ ··· + 22y + 1

+ y

+ ··· + 38y + 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.544109 + 0.871535I

0.80579 + 3.33102I 2.01338 − 1.91534I

u = −0.544109 − 0.871535I

0.80579 − 3.33102I 2.01338 + 1.91534I

u = 0.525209 + 0.910684I

1.69680 + 2.03222I 3.90722 − 3.29370I

u = 0.525209 − 0.910684I

1.69680 − 2.03222I 3.90722 + 3.29370I

u = −0.622652 + 0.677380I

1.38479 − 7.95567I 3.11940 + 8.08739I

u = −0.622652 − 0.677380I

1.38479 + 7.95567I 3.11940 − 8.08739I

u = −0.552672 + 0.728082I

−3.08637 − 2.17441I −2.78142 + 3.98454I

u = −0.552672 − 0.728082I

−3.08637 + 2.17441I −2.78142 − 3.98454I

u = −0.074861 + 0.899343I

0.55103 + 2.51832I −0.80649 − 3.33072I

u = −0.074861 − 0.899343I

0.55103 − 2.51832I −0.80649 + 3.33072I

u = 0.610444 + 0.652587I

2.44765 + 2.49685I 5.32046 − 3.18664I

u = 0.610444 − 0.652587I

2.44765 − 2.49685I 5.32046 + 3.18664I

u = −0.381105 + 1.041640I

−3.34743 − 1.08708I −6.46120 + 0.I

u = −0.381105 − 1.041640I

−3.34743 + 1.08708I −6.46120 + 0.I

u = 0.484539 + 1.021160I

−0.56534 + 3.02304I 0

u = 0.484539 − 1.021160I

−0.56534 − 3.02304I 0

u = −0.260652 + 1.137700I

−3.60470 + 1.42729I 0

u = −0.260652 − 1.137700I

−3.60470 − 1.42729I 0

u = −0.313837 + 1.128650I

−4.20665 − 1.05171I 0

u = −0.313837 − 1.128650I

−4.20665 + 1.05171I 0

u = 0.769876 + 0.302697I

−0.43983 − 9.87486I 1.61763 + 6.92341I

u = 0.769876 − 0.302697I

−0.43983 + 9.87486I 1.61763 − 6.92341I

u = 0.257348 + 1.151700I

−4.93303 − 6.89109I 0

u = 0.257348 − 1.151700I

−4.93303 + 6.89109I 0

u = 0.666201 + 0.472083I

5.00152 + 1.75323I 7.65668 − 2.62236I

u = 0.666201 − 0.472083I

5.00152 − 1.75323I 7.65668 + 2.62236I

u = −0.755668 + 0.307937I

0.80884 + 4.33115I 3.69848 − 2.33072I

u = −0.755668 − 0.307937I

0.80884 − 4.33115I 3.69848 + 2.33072I

u = 0.560154 + 1.046520I

3.31782 + 3.01457I 0

u = 0.560154 − 1.046520I

3.31782 − 3.01457I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.679575 + 0.445417I

4.87624 + 3.78274I 7.16156 − 3.71379I

u = −0.679575 − 0.445417I

4.87624 − 3.78274I 7.16156 + 3.71379I

u = 0.288034 + 1.152760I

−9.39383 − 0.41865I 0

u = 0.288034 − 1.152760I

−9.39383 + 0.41865I 0

u = −0.487828 + 1.088330I

−2.57613 − 5.90818I 0

u = −0.487828 − 1.088330I

−2.57613 + 5.90818I 0

u = 0.321894 + 1.149490I

−5.68245 + 6.13484I 0

u = 0.321894 − 1.149490I

−5.68245 − 6.13484I 0

u = −0.562904 + 1.061080I

3.07462 − 8.59241I 0

u = −0.562904 − 1.061080I

3.07462 + 8.59241I 0

u = 0.751525 + 0.268257I

−5.11292 − 3.55390I −3.52030 + 2.87156I

u = 0.751525 − 0.268257I

−5.11292 + 3.55390I −3.52030 − 2.87156I

u = −0.533131 + 1.124390I

−2.71521 − 6.69056I 0

u = −0.533131 − 1.124390I

−2.71521 + 6.69056I 0

u = 0.719744 + 0.218682I

−1.68268 + 2.83631I −0.28832 − 2.76871I

u = 0.719744 − 0.218682I

−1.68268 − 2.83631I −0.28832 + 2.76871I

u = 0.523358 + 1.138230I

−4.31649 + 1.84933I 0

u = 0.523358 − 1.138230I

−4.31649 − 1.84933I 0

u = 0.493299 + 0.552242I

0.862519 + 1.026220I 5.84285 − 4.48468I

u = 0.493299 − 0.552242I

0.862519 − 1.026220I 5.84285 + 4.48468I

u = −0.689013 + 0.265335I

−0.26353 + 1.99974I 2.67797 − 3.08609I

u = −0.689013 − 0.265335I

−0.26353 − 1.99974I 2.67797 + 3.08609I

u = −0.558377 + 1.131910I

−1.60310 − 9.28831I 0

u = −0.558377 − 1.131910I

−1.60310 + 9.28831I 0

u = 0.545235 + 1.140190I

−7.65214 + 8.43403I 0

u = 0.545235 − 1.140190I

−7.65214 − 8.43403I 0

u = 0.560770 + 1.137600I

−2.8910 + 14.8744I 0

u = 0.560770 − 1.137600I

−2.8910 − 14.8744I 0

u = −0.561245 + 0.222030I

−0.23326 + 1.74631I 0.21628 − 4.30130I

u = −0.561245 − 0.222030I

−0.23326 − 1.74631I 0.21628 + 4.30130I

II. u-Polynomials

Crossings u-Polynomials at each crossing

, c

− u

+ ··· + u

+ 1

+ 29u

+ ··· + 2u + 1

, c

− u

+ ··· + u

+ 1

, c

+ 5u

+ ··· + 122u + 13

+ u

+ ··· − 118u + 37

, c

+ 21u

+ ··· + 2u + 1

− 5u

+ ··· − 12u + 1

III. Riley Polynomials

Crossings Riley Polynomials at each crossing

, c

+ 29y

+ ··· + 2y + 1

+ 5y

+ ··· + 14y + 1

, c

+ 21y

+ ··· + 2y + 1

, c

+ 41y

+ ··· + 4330y + 169

− 19y

+ ··· + 12050y + 1369

, c

+ 37y

+ ··· + 22y + 1

+ y

+ ··· + 38y + 1