12a

0241

(K12a

0241

)

A knot diagram

Linearized knot diagam

3 6 7 10 2 1 4 12 11 5 9 8

Solving Sequence

5,11

10 4 9 12 8 1 7 3 2 6

, c

Ideals for irreducible components

of X

par

= hu

− u

+ ··· + 2u

− 1i

* 1 irreducible components of dim

= 0, with total 63 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















−u

+ u





−u

+ 1





− u

+ 1

−u





−u

+ u

− 2u

+ 1

+ u





− u

+ 3u

− 2u

+ 1

−u

− 2u





−u

+ u

− 4u

+ 3u

− 3u

+ 1

−u

+ 2u

− 4u

+ 6u

− 3u

+ 2u





− 2u

+ 8u

− 12u

+ 21u

− 22u

+ 20u

− 12u

+ 5u

− 2u

− 3u

+ ··· − 3u

+ u





− 5u

+ ··· − 4u

+ 1

− 6u

+ ··· − 10u

+ u





− 3u

+ ··· − 5u

+ 1

−u

+ 2u

+ ··· − 3u

+ 2u



(ii) Obstruction class = −1

(iii) Cusp Shapes = 4u

− 28u

+ ··· + 16u + 6

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

+ 29u

+ ··· + 4u + 1

, c

+ u

+ ··· + 2u − 1

, c

− u

+ ··· + 420u − 97

, c

− u

+ ··· + 2u

− 1

+ 3u

+ ··· + 34u − 5

, c

− 13u

+ ··· + 4u − 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

+ 11y

+ ··· + 16y −1

, c

− 29y

+ ··· + 4y −1

, c

− 37y

+ ··· − 58340y −9409

, c

− 13y

+ ··· + 4y −1

+ 7y

+ ··· − 164y −25

, c

+ 75y

+ ··· − 8y −1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.906180 + 0.422177I

1.99168 + 1.38995I 8.07559 + 0.94279I

u = −0.906180 − 0.422177I

1.99168 − 1.38995I 8.07559 − 0.94279I

u = 0.784033 + 0.600648I

−4.27567 + 5.81688I −0.70813 − 8.29875I

u = 0.784033 − 0.600648I

−4.27567 − 5.81688I −0.70813 + 8.29875I

u = 0.909103 + 0.447406I

3.51366 + 3.59358I 10.41272 − 6.28502I

u = 0.909103 − 0.447406I

3.51366 − 3.59358I 10.41272 + 6.28502I

u = −0.886115 + 0.506891I

−1.82319 − 4.09825I 2.15651 + 6.10462I

u = −0.886115 − 0.506891I

−1.82319 + 4.09825I 2.15651 − 6.10462I

u = 0.922893 + 0.488111I

2.97083 + 6.11707I 9.16199 − 6.56976I

u = 0.922893 − 0.488111I

2.97083 − 6.11707I 9.16199 + 6.56976I

u = −0.930909 + 0.500771I

0.97651 − 11.21790I 6.00000 + 10.77314I

u = −0.930909 − 0.500771I

0.97651 + 11.21790I 6.00000 − 10.77314I

u = 0.693202 + 0.621062I

−4.56079 − 1.25575I −2.19329 + 0.63310I

u = 0.693202 − 0.621062I

−4.56079 + 1.25575I −2.19329 − 0.63310I

u = 0.928590 + 0.045314I

4.01932 + 6.32514I 11.57164 − 5.86598I

u = 0.928590 − 0.045314I

4.01932 − 6.32514I 11.57164 + 5.86598I

u = −0.922742 + 0.024554I

5.80192 − 1.27063I 14.7143 + 0.7560I

u = −0.922742 − 0.024554I

5.80192 + 1.27063I 14.7143 − 0.7560I

u = −0.733886 + 0.550039I

−1.66010 − 2.08982I 2.72200 + 4.60622I

u = −0.733886 − 0.550039I

−1.66010 + 2.08982I 2.72200 − 4.60622I

u = −0.778547 + 0.292819I

0.09263 − 3.54491I 8.23338 + 8.37976I

u = −0.778547 − 0.292819I

0.09263 + 3.54491I 8.23338 − 8.37976I

u = 0.817837

1.00618 9.44630

u = −0.524223 + 0.608616I

−2.97072 − 0.11505I −1.75022 + 0.66782I

u = −0.524223 − 0.608616I

−2.97072 + 0.11505I −1.75022 − 0.66782I

u = −0.453370 + 0.659277I

−0.53569 + 6.90071I 1.90400 − 5.03856I

u = −0.453370 − 0.659277I

−0.53569 − 6.90071I 1.90400 + 5.03856I

u = 0.438773 + 0.630314I

1.46155 − 1.93140I 5.21037 + 0.69413I

u = 0.438773 − 0.630314I

1.46155 + 1.93140I 5.21037 − 0.69413I

u = 0.884768 + 0.873290I

−6.09691 + 4.77546I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.884768 − 0.873290I

−6.09691 − 4.77546I 0

u = −0.881328 + 0.885625I

−4.93494 + 0.19327I 0

u = −0.881328 − 0.885625I

−4.93494 − 0.19327I 0

u = −0.881069 + 0.903523I

−6.02303 + 2.71306I 0

u = −0.881069 − 0.903523I

−6.02303 − 2.71306I 0

u = 0.880732 + 0.909053I

−8.19478 − 7.84444I 0

u = 0.880732 − 0.909053I

−8.19478 + 7.84444I 0

u = 0.892755 + 0.903388I

−10.84960 − 0.25881I 0

u = 0.892755 − 0.903388I

−10.84960 + 0.25881I 0

u = 0.945495 + 0.850520I

−5.90653 + 1.61727I 0

u = 0.945495 − 0.850520I

−5.90653 − 1.61727I 0

u = −0.954008 + 0.855513I

−4.70515 − 6.63865I 0

u = −0.954008 − 0.855513I

−4.70515 + 6.63865I 0

u = 0.927641 + 0.889208I

−10.23000 + 3.28333I 0

u = 0.927641 − 0.889208I

−10.23000 − 3.28333I 0

u = −0.924436 + 0.899708I

−13.41990 + 0.59197I 0

u = −0.924436 − 0.899708I

−13.41990 − 0.59197I 0

u = 0.702440 + 0.074381I

0.950672 + 0.027060I 11.34231 − 0.59705I

u = 0.702440 − 0.074381I

0.950672 − 0.027060I 11.34231 + 0.59705I

u = −0.937504 + 0.893407I

−13.3778 − 7.2055I 0

u = −0.937504 − 0.893407I

−13.3778 + 7.2055I 0

u = −0.965088 + 0.864759I

−5.75398 − 9.24348I 0

u = −0.965088 − 0.864759I

−5.75398 + 9.24348I 0

u = 0.958623 + 0.872225I

−10.63780 + 6.81425I 0

u = 0.958623 − 0.872225I

−10.63780 − 6.81425I 0

u = 0.968793 + 0.867363I

−7.9118 + 14.4004I 0

u = 0.968793 − 0.867363I

−7.9118 − 14.4004I 0

u = 0.350486 + 0.566383I

1.88232 + 0.20853I 5.90645 − 0.29596I

u = 0.350486 − 0.566383I

1.88232 − 0.20853I 5.90645 + 0.29596I

u = −0.285841 + 0.571386I

0.19917 − 5.00950I 2.45073 + 5.54298I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.285841 − 0.571386I

0.19917 + 5.00950I 2.45073 − 5.54298I

u = −0.132000 + 0.431030I

−1.65849 + 1.14871I −1.62308 − 0.85275I

u = −0.132000 − 0.431030I

−1.65849 − 1.14871I −1.62308 + 0.85275I

II. u-Polynomials

Crossings u-Polynomials at each crossing

+ 29u

+ ··· + 4u + 1

, c

+ u

+ ··· + 2u − 1

, c

− u

+ ··· + 420u − 97

, c

− u

+ ··· + 2u

− 1

+ 3u

+ ··· + 34u − 5

, c

− 13u

+ ··· + 4u − 1

III. Riley Polynomials

Crossings Riley Polynomials at each crossing

+ 11y

+ ··· + 16y −1

, c

− 29y

+ ··· + 4y −1

, c

− 37y

+ ··· − 58340y −9409

, c

− 13y

+ ··· + 4y −1

+ 7y

+ ··· − 164y −25

, c

+ 75y

+ ··· − 8y −1