12a

0644

(K12a

0644

)

A knot diagram

Linearized knot diagam

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

Solving Sequence

4,12

11 5 10 3 9 1 2 8 6 7

, 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





+ 1

+ 2u





−u

− 2u

− u

−u

− 3u

− 2u

+ u





−u

− u

+ 1

+ 2u





+ 3u

+ u

− 2u

+ 1

−u

− 4u





+ 9u

+ ··· − 3u

+ 1

+ 10u

+ ··· − 10u

+ u





−u

− 5u

− 7u

+ 2u

− 3u

+ 1

+ 6u

+ 12u

+ 8u

+ u

+ 2u





−u

− 12u

+ ··· − 12u

+ 7u

+ 13u

+ ··· − u

+ u





−u

− 19u

+ ··· − 3u

+ 1

+ 20u

+ ··· + 6u

+ u



(ii) Obstruction class = −1

(iii) Cusp Shapes = −4u

+ 4u

+ ··· + 16u + 2

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

+ 15u

+ ··· + 4u + 1

, c

− u

+ ··· − 2u

+ 1

+ u

+ ··· + 202u + 65

, c

− u

+ ··· − 2u

+ 1

, c

+ 7u

+ ··· + 16u + 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ 53y

+ ··· + 28y + 1

, c

− 15y

+ ··· − 4y + 1

+ 25y

+ ··· + 239476y + 4225

, c

+ 53y

+ ··· − 4y + 1

, c

+ 57y

+ ··· + 220y + 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.020209 + 1.098890I

3.96215 + 3.06271I 0

u = 0.020209 − 1.098890I

3.96215 − 3.06271I 0

u = 0.686155 + 0.430676I

−0.39671 + 10.08050I 1.51974 − 8.22030I

u = 0.686155 − 0.430676I

−0.39671 − 10.08050I 1.51974 + 8.22030I

u = 0.665754 + 0.458645I

−7.13653 + 5.26062I −3.80676 − 6.87867I

u = 0.665754 − 0.458645I

−7.13653 − 5.26062I −3.80676 + 6.87867I

u = 0.641196 + 0.486930I

−7.24731 − 0.92940I −4.28257 + 0.58840I

u = 0.641196 − 0.486930I

−7.24731 + 0.92940I −4.28257 − 0.58840I

u = 0.611386 + 0.518123I

−0.73492 − 5.76075I 0.62706 + 2.25622I

u = 0.611386 − 0.518123I

−0.73492 + 5.76075I 0.62706 − 2.25622I

u = −0.678468 + 0.424262I

0.23798 − 3.99471I 2.63926 + 3.39930I

u = −0.678468 − 0.424262I

0.23798 + 3.99471I 2.63926 − 3.39930I

u = −0.599558 + 0.509189I

−0.103709 − 0.253528I 1.72073 + 2.79096I

u = −0.599558 − 0.509189I

−0.103709 + 0.253528I 1.72073 − 2.79096I

u = −0.637539 + 0.456579I

−4.01617 − 2.09773I 2.12497 + 3.25564I

u = −0.637539 − 0.456579I

−4.01617 + 2.09773I 2.12497 − 3.25564I

u = 0.060580 + 1.263240I

−2.45362 + 1.67355I 0

u = 0.060580 − 1.263240I

−2.45362 − 1.67355I 0

u = 0.219710 + 1.317140I

1.91877 + 2.82951I 0

u = 0.219710 − 1.317140I

1.91877 − 2.82951I 0

u = 0.141123 + 1.328370I

−3.43887 + 2.43530I 0

u = 0.141123 − 1.328370I

−3.43887 − 2.43530I 0

u = −0.225186 + 1.328010I

1.60628 − 8.97008I 0

u = −0.225186 − 1.328010I

1.60628 + 8.97008I 0

u = −0.632474 + 0.159551I

6.26180 − 5.86038I 7.46913 + 7.08001I

u = −0.632474 − 0.159551I

6.26180 + 5.86038I 7.46913 − 7.08001I

u = 0.629195 + 0.140167I

6.46439 − 0.24804I 8.24330 − 1.61547I

u = 0.629195 − 0.140167I

6.46439 + 0.24804I 8.24330 + 1.61547I

u = −0.178389 + 1.364910I

−5.35134 − 5.59825I 0

u = −0.178389 − 1.364910I

−5.35134 + 5.59825I 0

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.038003 + 0.620037I

4.15248 + 2.99392I 1.86170 − 2.59085I

u = −0.038003 − 0.620037I

4.15248 − 2.99392I 1.86170 + 2.59085I

u = −0.103732 + 1.385290I

−6.60466 − 0.87132I 0

u = −0.103732 − 1.385290I

−6.60466 + 0.87132I 0

u = −0.014943 + 1.409750I

−1.92248 + 2.81822I 0

u = −0.014943 − 1.409750I

−1.92248 − 2.81822I 0

u = −0.528451 + 0.222220I

−0.34320 − 3.02564I 1.79724 + 9.78051I

u = −0.528451 − 0.222220I

−0.34320 + 3.02564I 1.79724 − 9.78051I

u = −0.24877 + 1.47151I

−5.88112 − 7.38178I 0

u = −0.24877 − 1.47151I

−5.88112 + 7.38178I 0

u = −0.22908 + 1.47605I

−10.25770 − 5.26519I 0

u = −0.22908 − 1.47605I

−10.25770 + 5.26519I 0

u = 0.25090 + 1.47509I

−6.5513 + 13.5024I 0

u = 0.25090 − 1.47509I

−6.5513 − 13.5024I 0

u = −0.20488 + 1.48243I

−6.53709 − 3.16674I 0

u = −0.20488 − 1.48243I

−6.53709 + 3.16674I 0

u = 0.23824 + 1.48207I

−13.4144 + 8.5605I 0

u = 0.23824 − 1.48207I

−13.4144 − 8.5605I 0

u = 0.20573 + 1.48896I

−7.23525 − 2.80491I 0

u = 0.20573 − 1.48896I

−7.23525 + 2.80491I 0

u = 0.22358 + 1.48669I

−13.63780 + 2.21952I 0

u = 0.22358 − 1.48669I

−13.63780 − 2.21952I 0

u = 0.480726 + 0.076119I

0.967130 + 0.223343I 10.08613 − 1.09515I

u = 0.480726 − 0.076119I

0.967130 − 0.223343I 10.08613 + 1.09515I

u = −0.255017 + 0.348068I

−1.263520 + 0.558795I −4.83816 − 0.54247I

u = −0.255017 − 0.348068I

−1.263520 − 0.558795I −4.83816 + 0.54247I

II. u-Polynomials

Crossings u-Polynomials at each crossing

, c

+ 15u

+ ··· + 4u + 1

, c

− u

+ ··· − 2u

+ 1

+ u

+ ··· + 202u + 65

, c

− u

+ ··· − 2u

+ 1

, c

+ 7u

+ ··· + 16u + 1

III. Riley Polynomials

Crossings Riley Polynomials at each crossing

, c

+ 53y

+ ··· + 28y + 1

, c

− 15y

+ ··· − 4y + 1

+ 25y

+ ··· + 239476y + 4225

, c

+ 53y

+ ··· − 4y + 1

, c

+ 57y

+ ··· + 220y + 1