12a

0740

(K12a

0740

)

A knot diagram

Linearized knot diagam

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

Solving Sequence

6,12

5 11 4 1 10 7 8 9 3 2

, c

Ideals for irreducible components

of X

par

= hu

+ u

+ ··· − 2u − 1i

* 1 irreducible components of dim

= 0, with total 56 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





−u

+ 1

− 2u





−u

+ 2u

− u

− 3u

+ 2u

+ u





−u

+ 2u

−u

+ u





− 3u

+ 2u

+ 1

− 2u

+ u





−u

+ 7u

− 20u

+ 27u

− 11u

− 13u

+ 16u

− 6u

+ u

+ 1

− 8u

+ 26u

− 40u

+ 19u

+ 24u

− 30u

+ 2u

+ 5u

+ 2u





−u

+ 4u

− 5u

+ 3u

−u

+ 3u

− 3u

+ u





− 9u

+ ··· − 4u

+ 1

− 8u

+ ··· − 4u

− 3u





−u

+ 20u

+ ··· + 11u

− 2u

−u

+ 19u

+ ··· + 5u

+ u



(ii) Obstruction class = −1

(iii) Cusp Shapes = −4u

+ 80u

+ ··· − 12u − 10

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

+ 29u

+ ··· − 10u

+ 1

, c

− u

+ ··· − 2u

− 1

, c

+ u

+ ··· + 80u − 53

, c

+ u

+ ··· − 2u − 1

, c

− 3u

+ ··· − 4u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

− 3y

+ ··· − 20y + 1

, c

+ 29y

+ ··· − 10y

+ 1

, c

− 35y

+ ··· − 20180y + 2809

, c

− 43y

+ ··· + 30y

+ 1

, c

+ 65y

+ ··· + 20y + 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.966138 + 0.146675I

−4.03618 + 3.76547I −9.86305 − 3.31528I

u = 0.966138 − 0.146675I

−4.03618 − 3.76547I −9.86305 + 3.31528I

u = −0.005719 + 0.906711I

11.65310 + 2.42579I −0.94991 − 3.21386I

u = −0.005719 − 0.906711I

11.65310 − 2.42579I −0.94991 + 3.21386I

u = 0.036344 + 0.901122I

6.27142 − 9.00482I −5.29022 + 5.83508I

u = 0.036344 − 0.901122I

6.27142 + 9.00482I −5.29022 − 5.83508I

u = −1.090050 + 0.140449I

−1.55041 + 0.38680I −5.72495 + 0.I

u = −1.090050 − 0.140449I

−1.55041 − 0.38680I −5.72495 + 0.I

u = −0.028384 + 0.898900I

8.99836 + 4.05002I −2.11311 − 2.32433I

u = −0.028384 − 0.898900I

8.99836 − 4.05002I −2.11311 + 2.32433I

u = 0.028330 + 0.883702I

4.64419 − 0.64348I −7.26111 − 0.24240I

u = 0.028330 − 0.883702I

4.64419 + 0.64348I −7.26111 + 0.24240I

u = −1.167310 + 0.233432I

−0.432854 + 1.119920I 0

u = −1.167310 − 0.233432I

−0.432854 − 1.119920I 0

u = 1.244770 + 0.102397I

−4.72176 − 2.16923I 0

u = 1.244770 − 0.102397I

−4.72176 + 2.16923I 0

u = 1.225110 + 0.251359I

−0.95561 − 5.19909I 0

u = 1.225110 − 0.251359I

−0.95561 + 5.19909I 0

u = 1.30697

−6.22222 0

u = 1.294490 + 0.219824I

−3.63173 − 5.28884I 0

u = 1.294490 − 0.219824I

−3.63173 + 5.28884I 0

u = −1.306120 + 0.197397I

−7.41440 + 1.49252I 0

u = −1.306120 − 0.197397I

−7.41440 − 1.49252I 0

u = 1.253840 + 0.421699I

0.85056 − 4.02651I 0

u = 1.253840 − 0.421699I

0.85056 + 4.02651I 0

u = −1.324320 + 0.015856I

−9.57385 + 4.23364I 0

u = −1.324320 − 0.015856I

−9.57385 − 4.23364I 0

u = 1.250890 + 0.441220I

2.51555 + 4.21199I 0

u = 1.250890 − 0.441220I

2.51555 − 4.21199I 0

u = −1.310570 + 0.227530I

−6.63163 + 9.90909I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −1.310570 − 0.227530I

−6.63163 − 9.90909I 0

u = −1.257710 + 0.436717I

5.19296 + 0.72097I 0

u = −1.257710 − 0.436717I

5.19296 − 0.72097I 0

u = −1.279070 + 0.437088I

7.70069 + 2.37410I 0

u = −1.279070 − 0.437088I

7.70069 − 2.37410I 0

u = 0.199264 + 0.611623I

−1.94679 − 6.93022I −6.93561 + 8.02369I

u = 0.199264 − 0.611623I

−1.94679 + 6.93022I −6.93561 − 8.02369I

u = 1.288170 + 0.434128I

7.63163 − 7.21669I 0

u = 1.288170 − 0.434128I

7.63163 + 7.21669I 0

u = −1.300160 + 0.412494I

0.50431 + 5.28588I 0

u = −1.300160 − 0.412494I

0.50431 − 5.28588I 0

u = 1.303070 + 0.422656I

4.84936 − 8.77757I 0

u = 1.303070 − 0.422656I

4.84936 + 8.77757I 0

u = −0.042518 + 0.626099I

2.87687 + 2.02638I −0.63182 − 4.64721I

u = −0.042518 − 0.626099I

2.87687 − 2.02638I −0.63182 + 4.64721I

u = −1.308980 + 0.422388I

2.07579 + 13.73950I 0

u = −1.308980 − 0.422388I

2.07579 − 13.73950I 0

u = −0.166435 + 0.582590I

0.87541 + 2.42282I −3.19232 − 4.86886I

u = −0.166435 − 0.582590I

0.87541 − 2.42282I −3.19232 + 4.86886I

u = 0.581831 + 0.132630I

−4.09488 − 3.93251I −12.13433 + 4.90398I

u = 0.581831 − 0.132630I

−4.09488 + 3.93251I −12.13433 − 4.90398I

u = 0.224976 + 0.537140I

−2.70624 + 1.11644I −8.57012 + 1.60454I

u = 0.224976 − 0.537140I

−2.70624 − 1.11644I −8.57012 − 1.60454I

u = −0.459240

−1.08734 −10.0590

u = −0.233743 + 0.256345I

−0.484744 + 0.884850I −8.86461 − 7.46301I

u = −0.233743 − 0.256345I

−0.484744 − 0.884850I −8.86461 + 7.46301I

II. u-Polynomials

Crossings u-Polynomials at each crossing

+ 29u

+ ··· − 10u

+ 1

, c

− u

+ ··· − 2u

− 1

, c

+ u

+ ··· + 80u − 53

, c

+ u

+ ··· − 2u − 1

, c

− 3u

+ ··· − 4u + 1

III. Riley Polynomials

Crossings Riley Polynomials at each crossing

− 3y

+ ··· − 20y + 1

, c

+ 29y

+ ··· − 10y

+ 1

, c

− 35y

+ ··· − 20180y + 2809

, c

− 43y

+ ··· + 30y

+ 1

, c

+ 65y

+ ··· + 20y + 1