11a

196

(K11a

196

)

A knot diagram

Linearized knot diagam

7 1 10 8 9 2 3 11 6 4 5

Solving Sequence

4,8 5,11

9 6 1 10 3 2 7

, c

Ideals for irreducible components

of X

par

= h−1.56366 × 10

+ 2.00582 × 10

+ ··· + 7.42142 × 10

b − 9.93961 × 10

− 1.23252 × 10

+ 1.13313 × 10

+ ··· + 7.42142 × 10

a − 2.69156 × 10

, u

− u

+ ··· + 2u − 1i

= h−466470675905338u

− 397267180404293u

+ ··· + 6630830886537376b − 264157828925488,

26944089879716u

+ 14049375398024u

+ ··· + 121666621771328a − 16982188896888,

+ 3u

+ ··· − 4u + 8i

= hu

− 3u

− u

− 2u

− u

+ 3u

+ 4u

+ u

− u

+ 2b − 3,

− 2u

− 3u

− u

− 5u

+ u

+ 6u

+ u

+ 13u

+ 6u

− 7u

+ u

− 7u

− 8u

+ 2a + u − 1,

+ u

− 2u

− 4u

+ 2u

+ u

+ 4u

− 1i

= h5.79410 × 10

+ 1.97168 × 10

+ ··· + 1.42067 × 10

b − 3.77005 × 10

19264503378333u

+ 64217498098488u

+ ··· + 8090899806416a − 59730846409593,

+ 3u

+ ··· − 6u + 1i

= hb − 1, 59u

+ 76u

+ 242u

+ 190u

+ 67a + 487u + 146, u

+ u

+ 4u

+ 2u

+ 8u

+ 1i

= h−u

+ b, −u

+ a − 1, u

− u

+ 2u

− 2u

+ 2u

− 2u + 1i

= hb − 1, a − 2, u + 1i

* 7 irreducible components of dim

= 0, with total 103 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

= h−1.56×10

+2.01×10

+· · ·+7.42×10

b−9.94×10

, −1.23×

+1.13×10

+· · ·+7.42×10

a−2.69×10

, u

−u

+· · ·+2u−1i

(i) Arc colorings















1.66077u

− 1.52684u

+ ··· + 1.11901u + 3.62674

0.210696u

− 0.270275u

+ ··· + 2.39290u + 0.133931





0.312172u

+ 0.638396u

+ ··· − 1.77480u + 3.01621

0.581257u

− 0.629489u

+ ··· + 0.803940u + 1.08450





−1.18988u

+ 1.11302u

+ ··· − 4.45598u + 1.89491

−0.241743u

+ 0.0536668u

+ ··· − 0.670686u − 0.868814





1.66077u

− 1.52684u

+ ··· + 0.119008u + 3.62674

0.210696u

− 0.270275u

+ ··· + 2.39290u + 0.133931





1.45007u

− 1.25656u

+ ··· − 1.27390u + 3.49281

0.210696u

− 0.270275u

+ ··· + 2.39290u + 0.133931





1.19231u

− 0.633674u

+ ··· + 3.06255u + 2.18099

−0.107812u

+ 0.130431u

+ ··· − 0.365474u + 0.791952





1.19260u

− 0.799146u

+ ··· + 2.64209u − 0.651268

−0.0394366u

+ 0.164653u

+ ··· + 0.0481946u + 0.646177





−0.451600u

+ 0.986823u

+ ··· + 5.66786u − 0.00121263

0.328533u

− 0.284050u

+ ··· − 0.908870u + 0.936550





−0.451600u

+ 0.986823u

+ ··· + 5.66786u − 0.00121263

0.328533u

− 0.284050u

+ ··· − 0.908870u + 0.936550



(ii) Obstruction class = −1

(iii) Cusp Shapes =

24366089866600657610153

7421416129906443651586

−

13344042961471974440973

3710708064953221825793

+ ··· +

123365016888052989817509

7421416129906443651586

u +

5771013155102072120085

3710708064953221825793

in decimal forms when there is not enough margin.

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

+ 6u

+ ··· − 40u − 8

+ 14u

+ ··· + 32u − 64

, c

− 9u

+ ··· − u − 1

, c

− u

+ ··· + 2u − 1

− 9u

+ ··· + 2296u − 232

+ 22u

+ ··· − 7680u − 512

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ 14y

+ ··· + 32y −64

+ 2y

+ ··· + 39424y −4096

, c

− 18y

+ ··· − 7y −1

, c

− 5y

+ ··· + 16y −1

− 7y

+ ··· + 586144y −53824

− 4y

+ ··· + 1966080y −262144

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.898231 + 0.526385I

a = 0.209642 + 0.703154I

b = −0.122251 + 0.700628I

−1.84219 + 1.61763I −0.34752 − 1.90846I

u = −0.898231 − 0.526385I

a = 0.209642 − 0.703154I

b = −0.122251 − 0.700628I

−1.84219 − 1.61763I −0.34752 + 1.90846I

u = 1.012540 + 0.318884I

a = −0.308945 + 0.757476I

b = 0.238061 + 0.818947I

−5.36570 + 2.03204I −4.32275 − 2.13513I

u = 1.012540 − 0.318884I

a = −0.308945 − 0.757476I

b = 0.238061 − 0.818947I

−5.36570 − 2.03204I −4.32275 + 2.13513I

u = −0.276412 + 0.776716I

a = 0.023671 + 0.586360I

b = −0.037108 + 0.457608I

0.18488 + 1.81939I 2.29374 − 3.76762I

u = −0.276412 − 0.776716I

a = 0.023671 − 0.586360I

b = −0.037108 − 0.457608I

0.18488 − 1.81939I 2.29374 + 3.76762I

u = −0.795815 + 0.903407I

a = 0.26309 + 1.49507I

b = 1.305830 + 0.251781I

7.97470 + 2.85426I 8.94272 − 2.79876I

u = −0.795815 − 0.903407I

a = 0.26309 − 1.49507I

b = 1.305830 − 0.251781I

7.97470 − 2.85426I 8.94272 + 2.79876I

u = 1.074420 + 0.604846I

a = −0.257278 + 0.648739I

b = 0.028367 + 0.782017I

−4.76097 − 6.00409I −3.69772 + 5.84582I

u = 1.074420 − 0.604846I

a = −0.257278 − 0.648739I

b = 0.028367 − 0.782017I

−4.76097 + 6.00409I −3.69772 − 5.84582I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.208550 + 0.274221I

a = −1.302050 + 0.508274I

b = −0.932187 + 0.115358I

−2.56542 − 5.05729I 5.23613 + 5.90187I

u = 1.208550 − 0.274221I

a = −1.302050 − 0.508274I

b = −0.932187 − 0.115358I

−2.56542 + 5.05729I 5.23613 − 5.90187I

u = 0.878818 + 1.037850I

a = −0.167256 + 1.255180I

b = −1.359850 + 0.350164I

8.49644 − 8.55345I 9.20145 + 7.26296I

u = 0.878818 − 1.037850I

a = −0.167256 − 1.255180I

b = −1.359850 − 0.350164I

8.49644 + 8.55345I 9.20145 − 7.26296I

u = −0.421872 + 0.462971I

a = 2.45358 − 1.32260I

b = −1.027750 − 0.447368I

0.99303 + 9.06795I 3.46736 − 11.63407I

u = −0.421872 − 0.462971I

a = 2.45358 + 1.32260I

b = −1.027750 + 0.447368I

0.99303 − 9.06795I 3.46736 + 11.63407I

u = −0.591031 + 0.138214I

a = 0.54492 − 1.69705I

b = −0.688350 − 0.511205I

−2.72477 + 1.50676I −3.17250 − 4.01509I

u = −0.591031 − 0.138214I

a = 0.54492 + 1.69705I

b = −0.688350 + 0.511205I

−2.72477 − 1.50676I −3.17250 + 4.01509I

u = 0.338852 + 0.350615I

a = −3.02283 − 2.53673I

b = 0.966126 − 0.347074I

3.01066 − 3.39049I 3.02884 + 10.08685I

u = 0.338852 − 0.350615I

a = −3.02283 + 2.53673I

b = 0.966126 + 0.347074I

3.01066 + 3.39049I 3.02884 − 10.08685I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −1.13972 + 1.08957I

a = 0.255186 + 0.962671I

b = 1.279710 + 0.563405I

0.91508 + 8.68990I 2.54049 − 5.35859I

u = −1.13972 − 1.08957I

a = 0.255186 − 0.962671I

b = 1.279710 − 0.563405I

0.91508 − 8.68990I 2.54049 + 5.35859I

u = 1.07737 + 1.19752I

a = −0.142409 + 0.974746I

b = −1.39888 + 0.56362I

6.16613 − 11.88750I 7.81516 + 6.29925I

u = 1.07737 − 1.19752I

a = −0.142409 − 0.974746I

b = −1.39888 − 0.56362I

6.16613 + 11.88750I 7.81516 − 6.29925I

u = −1.12228 + 1.24272I

a = 0.128320 + 0.924082I

b = 1.41876 + 0.62158I

3.6775 + 17.2855I 4.85544 − 9.87335I

u = −1.12228 − 1.24272I

a = 0.128320 − 0.924082I

b = 1.41876 − 0.62158I

3.6775 − 17.2855I 4.85544 + 9.87335I

u = 0.309622

a = 3.64471

b = 0.659027

1.29009 9.31830

II.

= h−4.66×10

−3.97×10

+· · ·+6.63×10

b−2.64×10

, 2.69×

+1.40×10

+· · ·+1.22×10

a−1.70×10

, u

+3u

+· · ·−4u+8i

(i) Arc colorings















−0.221458u

− 0.115474u

+ ··· − 5.16359u + 0.139580

0.0703488u

+ 0.0599121u

+ ··· + 3.44503u + 0.0398378





−0.131260u

− 0.121483u

+ ··· − 3.05755u + 2.19329

−0.0922969u

+ 0.000104233u

+ ··· − 1.11867u − 0.780159





−0.108244u

+ 0.149259u

+ ··· + 1.62669u + 5.33342

0.00600815u

+ 0.116833u

+ ··· − 2.41450u − 0.278416





−0.277967u

− 0.143397u

+ ··· − 7.29884u + 1.02354

0.0235493u

+ 0.106410u

+ ··· + 3.78541u + 0.263215





−0.291807u

− 0.175386u

+ ··· − 8.60861u + 0.0997419

0.0703488u

+ 0.0599121u

+ ··· + 3.44503u + 0.0398378





0.187834u

+ 0.00949931u

+ ··· + 7.51428u − 1.76112

−0.0903139u

− 0.101796u

+ ··· + 0.0682743u + 0.252378





−0.0733779u

+ 0.0153619u

+ ··· + 9.34212u + 4.09583

0.123742u

− 0.0875102u

+ ··· − 0.0211572u − 1.70617





−0.340801u

− 0.152896u

+ ··· − 7.31312u + 2.28466

0.170602u

+ 0.00657076u

+ ··· + 1.79380u − 0.738436





−0.340801u

− 0.152896u

+ ··· − 7.31312u + 2.28466

0.170602u

+ 0.00657076u

+ ··· + 1.79380u − 0.738436



(ii) Obstruction class = −1

(iii) Cusp Shapes

867553217111521

1657707721634344

56390307623253

3315415443268688

+ ··· +

3770100918086014

207213465204293

u +

1919092137145043

207213465204293

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

+ u

+ u + 1)

+ 2u

+ 3u

+ u + 1)

, c

− 9u

+ ··· + 56u + 8

, c

+ 3u

+ ··· − 4u + 8

+ 3u

+ 4u

+ 3u + 2)

− u

+ 1)

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ 2y

+ 3y

+ y + 1)

+ 2y

+ 7y

+ 5y + 1)

, c

− 18y

+ ··· − 864y + 64

, c

+ 6y

+ ··· + 944y + 64

− y

+ 2y

+ 7y + 4)

− y

+ 2y −1)

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.077838 + 1.001210I

a = −0.058264 + 0.749436I

b = −1.40920 + 0.84871I

3.42323 − 7.64338I 9.24932 + 6.51087I

u = 0.077838 − 1.001210I

a = −0.058264 − 0.749436I

b = −1.40920 − 0.84871I

3.42323 + 7.64338I 9.24932 − 6.51087I

u = 0.554955 + 0.881319I

a = −0.156285 − 1.094010I

b = 0.443978 − 1.026930I

2.89077 − 4.22521I 8.26043 + 6.84681I

u = 0.554955 − 0.881319I

a = −0.156285 + 1.094010I

b = 0.443978 + 1.026930I

2.89077 + 4.22521I 8.26043 − 6.84681I

u = 0.214202 + 0.934183I

a = 0.962122 − 0.718649I

b = −0.207958 + 0.155122I

2.89077 + 1.43103I 8.26043 + 0.88791I

u = 0.214202 − 0.934183I

a = 0.962122 + 0.718649I

b = −0.207958 − 0.155122I

2.89077 − 1.43103I 8.26043 − 0.88791I

u = −0.810739 + 0.684928I

a = −0.178616 − 1.069640I

b = 0.034600 − 1.374090I

−0.71436 + 10.47150I 2.72006 − 9.49032I

u = −0.810739 − 0.684928I

a = −0.178616 + 1.069640I

b = 0.034600 + 1.374090I

−0.71436 − 10.47150I 2.72006 + 9.49032I

u = −1.023630 + 0.332750I

a = −0.989201 + 0.406110I

b = −0.441767 + 0.651030I

−0.71436 + 4.81525I 2.72006 − 3.53142I

u = −1.023630 − 0.332750I

a = −0.989201 − 0.406110I

b = −0.441767 − 0.651030I

−0.71436 − 4.81525I 2.72006 + 3.53142I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.299931 + 0.824118I

a = −0.455949 − 1.230640I

b = 1.091230 − 0.434477I

2.89077 − 1.43103I 8.26043 − 0.88791I

u = 0.299931 − 0.824118I

a = −0.455949 + 1.230640I

b = 1.091230 + 0.434477I

2.89077 + 1.43103I 8.26043 + 0.88791I

u = −0.233421 + 0.551322I

a = 0.491584 + 1.161090I

b = 1.68223 + 0.39397I

7.02835 + 1.39709I 14.7897 − 3.8674I

u = −0.233421 − 0.551322I

a = 0.491584 − 1.161090I

b = 1.68223 − 0.39397I

7.02835 − 1.39709I 14.7897 + 3.8674I

u = 0.208549 + 0.403398I

a = 2.34438 − 0.96312I

b = −1.141110 + 0.176547I

−0.71436 − 4.81525I 2.72006 + 3.53142I

u = 0.208549 − 0.403398I

a = 2.34438 + 0.96312I

b = −1.141110 − 0.176547I

−0.71436 + 4.81525I 2.72006 − 3.53142I

u = −0.69942 + 1.38686I

a = 0.173806 − 0.720332I

b = −1.091770 − 0.185403I

2.89077 + 4.22521I 8.26043 − 6.84681I

u = −0.69942 − 1.38686I

a = 0.173806 + 0.720332I

b = −1.091770 + 0.185403I

2.89077 − 4.22521I 8.26043 + 6.84681I

u = 1.50603 + 0.81015I

a = −0.388743 + 0.209121I

b = −1.370290 − 0.060244I

7.02835 + 1.39709I 14.7897 − 3.8674I

u = 1.50603 − 0.81015I

a = −0.388743 − 0.209121I

b = −1.370290 + 0.060244I

7.02835 − 1.39709I 14.7897 + 3.8674I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 1.25615 + 1.37119I

a = 0.023380 − 0.618493I

b = 1.312800 − 0.417455I

−0.71436 − 10.47150I 2.72006 + 9.49032I

u = 1.25615 − 1.37119I

a = 0.023380 + 0.618493I

b = 1.312800 + 0.417455I

−0.71436 + 10.47150I 2.72006 − 9.49032I

u = −1.35044 + 1.60451I

a = 0.231785 + 0.275391I

b = 1.097260 − 0.209996I

3.42323 − 7.64338I 9.24932 + 6.51087I

u = −1.35044 − 1.60451I

a = 0.231785 − 0.275391I

b = 1.097260 + 0.209996I

3.42323 + 7.64338I 9.24932 − 6.51087I

III.

= hu

−3u

+· · ·+2b−3, −2u

−3u

+· · ·+2a−1, u

+· · ·+4u

−1i

(i) Arc colorings















+ ··· −

u +

−

+ ··· +





+ ··· +

u +

+ u

− 2u

− 4u

+ 2u

+ u

+ 4u

+ u





+ u

+ ··· + 4u +

+ 2u

+ ··· + 2u −





+ ··· +

u +

−

+ ··· +





+ ··· −

u − 1

−

+ ··· +





+ ··· +

u −

−

+ ··· −

u +





−u

+ ··· +

u −

−

− u

+ ··· − 2u +





−u

+ ··· +

u +

+ 2u

+ ··· + u − 1





−u

+ ··· +

u +

+ 2u

+ ··· + u − 1



(ii) Obstruction class = 1

(iii) Cusp Shapes

= −

−u

−2u

−8u

+6u

−

−10u

+4u

−

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

+ 4u

+ 8u

− u

+ 8u

− 3u

+ 4u

− 5u

− 3u

− 1

+ 8u

+ ··· − 6u − 1

, c

+ u

+ ··· − u − 1

, c

+ u

− 2u

− 4u

+ 2u

+ u

+ 4u

− 1

, c

− u

+ ··· − u + 1

+ 4u

+ 8u

+ u

+ 8u

+ 3u

+ 4u

+ 5u

+ 3u

+ 1

− 4u

+ ··· + 2u + 1

+ 7u

+ ··· − 4u

+ 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ 8y

+ ··· − 6y −1

+ 16y

+ ··· − 2y −1

, c

− 15y

+ ··· + 13y −1

, c

+ 2y

+ ··· + 8y

− 1

− 8y

+ ··· − 10y −1

− 7y

+ ··· + 8y −1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.185034 + 0.977053I

a = 0.901834 − 0.120626I

b = −0.971462 − 0.539948I

1.66412 + 7.79387I 4.71821 − 7.48440I

u = 0.185034 − 0.977053I

a = 0.901834 + 0.120626I

b = −0.971462 + 0.539948I

1.66412 − 7.79387I 4.71821 + 7.48440I

u = 1.059920 + 0.125997I

a = −0.505429 + 0.152100I

b = −1.66034 − 0.09253I

5.03009 − 3.03027I −0.29865 + 6.15454I

u = 1.059920 − 0.125997I

a = −0.505429 − 0.152100I

b = −1.66034 + 0.09253I

5.03009 + 3.03027I −0.29865 − 6.15454I

u = −1.017990 + 0.343618I

a = −1.24822 − 0.67823I

b = −0.602647 − 0.093142I

−3.33930 + 4.72492I −3.76065 − 3.56168I

u = −1.017990 − 0.343618I

a = −1.24822 + 0.67823I

b = −0.602647 + 0.093142I

−3.33930 − 4.72492I −3.76065 + 3.56168I

u = −0.877006 + 0.163803I

a = 0.740351 + 0.352474I

b = 1.52784 − 0.11487I

6.32524 − 0.81175I 6.18881 − 3.33873I

u = −0.877006 − 0.163803I

a = 0.740351 − 0.352474I

b = 1.52784 + 0.11487I

6.32524 + 0.81175I 6.18881 + 3.33873I

u = −0.034209 + 0.765835I

a = −1.59402 − 0.49939I

b = 0.941073 − 0.390006I

3.58065 − 2.83345I 10.68843 + 2.87579I

u = −0.034209 − 0.765835I

a = −1.59402 + 0.49939I

b = 0.941073 + 0.390006I

3.58065 + 2.83345I 10.68843 − 2.87579I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.162111 + 1.223850I

a = 0.441400 − 0.577132I

b = −0.716431 − 0.549731I

−0.031900 + 0.989940I 0.43333 − 2.78857I

u = −0.162111 − 1.223850I

a = 0.441400 + 0.577132I

b = −0.716431 + 0.549731I

−0.031900 − 0.989940I 0.43333 + 2.78857I

u = 0.493147 + 1.132940I

a = −0.152438 − 0.861689I

b = 0.628299 − 0.406815I

1.26100 − 3.34950I 3.87772 + 4.04913I

u = 0.493147 − 1.132940I

a = −0.152438 + 0.861689I

b = 0.628299 + 0.406815I

1.26100 + 3.34950I 3.87772 − 4.04913I

u = 0.706418

a = 2.83303

b = 0.707336

0.629027 −6.69440

IV.

= h5.79 × 10

+ 1.97 × 10

+ · · · + 1.42 × 10

b − 3.77 × 10

, 1.93 ×

+6.42×10

+· · ·+8.09×10

a−5.97×10

, u

+3u

+· · ·−6u+1i

(i) Arc colorings















−2.38101u

− 7.93700u

+ ··· − 16.0638u + 7.38247

−0.407843u

− 1.38785u

+ ··· − 3.78446u + 0.0265372





−3.15250u

− 10.3010u

+ ··· − 32.7601u + 11.4367

0.503685u

+ 1.63902u

+ ··· + 4.73930u − 0.983119





−1.98429u

− 6.73679u

+ ··· − 12.6550u + 5.30508

0.0494630u

+ 0.168935u

+ ··· + 0.574708u − 1.77150





−2.20112u

− 7.24702u

+ ··· − 14.6622u + 8.14991

−0.371131u

− 1.31484u

+ ··· − 3.06241u − 0.123786





−1.97317u

− 6.54915u

+ ··· − 12.2793u + 7.35594

−0.407843u

− 1.38785u

+ ··· − 3.78446u + 0.0265372





0.146254u

+ 0.641487u

+ ··· − 7.52556u − 0.845528

0.836864u

+ 2.81155u

+ ··· + 6.03475u − 0.313883





−u

− 3u

+ ··· − 15u + 6

0.375295u

+ 1.14401u

+ ··· + 6.69523u − 0.288437





−1.35971u

− 4.26371u

+ ··· − 17.1675u + 3.44827

−0.195361u

− 0.483364u

+ ··· − 8.48872u + 3.10314





−1.35971u

− 4.26371u

+ ··· − 17.1675u + 3.44827

−0.195361u

− 0.483364u

+ ··· − 8.48872u + 3.10314



(ii) Obstruction class = −1

(iii) Cusp Shapes =

7079914424451449855

1775837212186070572

23544509299143752001

1775837212186070572

+ ··· +

49265834911585654277

1775837212186070572

u −

1824252325882161130

443959303046517643

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

− u

+ 2u

− 2u

+ 2u

− 2u + 1)

+ 3u

+ 4u

+ 2u

+ 1)

, c

+ 4u

+ ··· + 106u + 59

, c

+ 3u

+ ··· − 6u + 1

, c

− u

+ 1)

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ 3y

+ 4y

+ 2y

+ 1)

− y

+ 4y

− 2y

+ 8y

+ 1)

, c

− 20y

+ ··· − 32240y + 3481

, c

− y

+ ··· − 6y + 1

, c

− y

+ 2y −1)

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.723079 + 0.704365I

a = 0.107758 − 1.135100I

b = 0.041447 − 1.243490I

1.64493 − 5.65624I 6.00000 + 5.95889I

u = 0.723079 − 0.704365I

a = 0.107758 + 1.135100I

b = 0.041447 + 1.243490I

1.64493 + 5.65624I 6.00000 − 5.95889I

u = −0.315281 + 0.984494I

a = 0.427343 − 1.028110I

b = −1.107680 − 0.653656I

1.64493 + 5.65624I 6.00000 − 5.95889I

u = −0.315281 − 0.984494I

a = 0.427343 + 1.028110I

b = −1.107680 + 0.653656I

1.64493 − 5.65624I 6.00000 + 5.95889I

u = −1.013310 + 0.252112I

a = −0.643211 − 0.895112I

b = −0.786818 − 0.569360I

−2.49265 + 2.82812I −0.52927 − 2.97945I

u = −1.013310 − 0.252112I

a = −0.643211 + 0.895112I

b = −0.786818 + 0.569360I

−2.49265 − 2.82812I −0.52927 + 2.97945I

u = −0.159442 + 0.926668I

a = 0.136132 + 0.791192I

b = 1.43944 + 0.70156I

5.78252 + 2.82812I 12.52927 − 2.97945I

u = −0.159442 − 0.926668I

a = 0.136132 − 0.791192I

b = 1.43944 − 0.70156I

5.78252 − 2.82812I 12.52927 + 2.97945I

u = −0.691733 + 0.527113I

a = −0.283373 − 1.292740I

b = 0.222973 − 1.116570I

−2.49265 + 2.82812I −0.52927 − 2.97945I

u = −0.691733 − 0.527113I

a = −0.283373 + 1.292740I

b = 0.222973 + 1.116570I

−2.49265 − 2.82812I −0.52927 + 2.97945I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.097732 + 1.282650I

a = −0.629193 − 0.636142I

b = 0.554361 + 0.213748I

1.64493 − 5.65624I 6.00000 + 5.95889I

u = −0.097732 − 1.282650I

a = −0.629193 + 0.636142I

b = 0.554361 − 0.213748I

1.64493 + 5.65624I 6.00000 − 5.95889I

u = 1.22255 + 1.06383I

a = 0.106727 − 0.702138I

b = 1.173390 − 0.504296I

−2.49265 − 2.82812I −0.52927 + 2.97945I

u = 1.22255 − 1.06383I

a = 0.106727 + 0.702138I

b = 1.173390 + 0.504296I

−2.49265 + 2.82812I −0.52927 − 2.97945I

u = 0.122779 + 0.275025I

a = −1.02171 + 2.28864I

b = −1.87511 + 0.22835I

5.78252 + 2.82812I 12.52927 − 2.97945I

u = 0.122779 − 0.275025I

a = −1.02171 − 2.28864I

b = −1.87511 − 0.22835I

5.78252 − 2.82812I 12.52927 + 2.97945I

u = 0.290085 + 0.035799I

a = 2.66725 − 2.89690I

b = −0.732109 − 0.436774I

−2.49265 − 2.82812I −0.52927 + 2.97945I

u = 0.290085 − 0.035799I

a = 2.66725 + 2.89690I

b = −0.732109 + 0.436774I

−2.49265 + 2.82812I −0.52927 − 2.97945I

u = −1.11766 + 1.32293I

a = 0.001573 − 0.664583I

b = −1.243000 − 0.376081I

1.64493 + 5.65624I 6.00000 − 5.95889I

u = −1.11766 − 1.32293I

a = 0.001573 + 0.664583I

b = −1.243000 + 0.376081I

1.64493 − 5.65624I 6.00000 + 5.95889I

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −1.78242 + 0.43596I

a = 0.399606 + 0.097740I

b = 1.46829 − 0.05407I

5.78252 + 2.82812I 12.52927 − 2.97945I

u = −1.78242 − 0.43596I

a = 0.399606 − 0.097740I

b = 1.46829 + 0.05407I

5.78252 − 2.82812I 12.52927 + 2.97945I

u = 1.31909 + 1.40108I

a = −0.268903 + 0.285617I

b = −1.155190 − 0.130975I

5.78252 + 2.82812I 12.52927 − 2.97945I

u = 1.31909 − 1.40108I

a = −0.268903 − 0.285617I

b = −1.155190 + 0.130975I

5.78252 − 2.82812I 12.52927 + 2.97945I

V. I

= hb − 1, 59u

+ 76u

+ · · · + 67a + 146, u

+ u

+ 4u

+ 2u

+ 8u

+ 1i

(i) Arc colorings















−0.880597u

− 1.13433u

+ ··· − 7.26866u − 2.17910





−0.149254u

− 0.582090u

+ ··· − 2.16418u − 3.77612

−0.253731u

− 0.0895522u

+ ··· − 1.17910u + 0.880597





−0.597015u

− 0.328358u

+ ··· − 3.65672u + 2.89552

0.179104u

+ 0.298507u

+ ··· + 1.59701u − 0.268657





−0.716418u

− 1.19403u

+ ··· − 6.38806u − 2.92537

−0.149254u

+ 0.417910u

+ ··· − 0.164179u + 1.22388





−0.880597u

− 1.13433u

+ ··· − 7.26866u − 3.17910





−0.880597u

− 1.13433u

+ ··· − 7.26866u − 2.17910





−u

− u

− 4u

− 2u

− 8u

−0.0746269u

+ 0.208955u

+ ··· + 1.41791u + 0.611940





−0.149254u

− 0.582090u

+ ··· − 2.16418u − 3.77612

−0.253731u

− 0.0895522u

+ ··· − 1.17910u + 0.880597





−0.149254u

− 0.582090u

+ ··· − 2.16418u − 3.77612

−0.253731u

− 0.0895522u

+ ··· − 1.17910u + 0.880597



(ii) Obstruction class = −1

(iii) Cusp Shapes = 6

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

− u

+ 2u

− 2u

+ 2u

− 2u + 1

, c

+ 3u

+ 4u

+ 2u

+ 1

, c

(u − 1)

+ u

+ 4u

+ 2u

+ 8u

+ 1

, c

− u

+ 1)

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ 3y

+ 4y

+ 2y

+ 1

, c

− y

+ 4y

− 2y

+ 8y

+ 1

, c

(y −1)

+ 7y

+ 28y

+ 62y

+ 72y

+ 16y + 1

, c

− y

+ 2y −1)

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = 0.42975 + 1.50598I

a = −0.303615 − 0.669275I

b = 1.00000

1.64493 6.00000

u = 0.42975 − 1.50598I

a = −0.303615 + 0.669275I

b = 1.00000

1.64493 6.00000

u = 0.017526 + 0.363437I

a = −1.92858 − 2.50729I

b = 1.00000

1.64493 6.00000

u = 0.017526 − 0.363437I

a = −1.92858 + 2.50729I

b = 1.00000

1.64493 6.00000

u = −0.94728 + 1.47725I

a = 0.232199 + 0.362106I

b = 1.00000

1.64493 6.00000

u = −0.94728 − 1.47725I

a = 0.232199 − 0.362106I

b = 1.00000

1.64493 6.00000

VI. I

= h−u

+ b, −u

+ a − 1, u

− u

+ 2u

− 2u

+ 2u

− 2u + 1i

(i) Arc colorings















+ 1





+ 2u

+ u





−u

− 2u

− u + 1

−u

− u

+ u

− u





+ u

+ 1

− 2u

+ 2u

− u

+ 2u − 1









+ 1





−u

+ u

− 2u

+ 2u

− 2u + 2

− 2u

+ 2u

− 3u

+ 3u − 1





+ 2u

+ u

2u − 1





+ 2u

+ u

2u − 1



(ii) Obstruction class = −1

(iii) Cusp Shapes = 6

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

− u

+ 2u

− 2u

+ 2u

− 2u + 1

, c

+ 3u

+ 4u

+ 2u

+ 1

, c

(u − 1)

, c

− u

+ 1)

+ u

+ 4u

+ 2u

+ 8u

+ 1

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

+ 3y

+ 4y

+ 2y

+ 1

, c

− y

+ 4y

− 2y

+ 8y

+ 1

, c

(y −1)

, c

− y

+ 2y −1)

+ 7y

+ 28y

+ 62y

+ 72y

+ 16y + 1

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −0.498832 + 1.001300I

a = 0.246226 − 0.998963I

b = −0.753774 − 0.998963I

1.64493 6.00000

u = −0.498832 − 1.001300I

a = 0.246226 + 0.998963I

b = −0.753774 + 0.998963I

1.64493 6.00000

u = 0.284920 + 1.115140I

a = −0.162359 + 0.635452I

b = −1.162360 + 0.635452I

1.64493 6.00000

u = 0.284920 − 1.115140I

a = −0.162359 − 0.635452I

b = −1.162360 − 0.635452I

1.64493 6.00000

u = 0.713912 + 0.305839I

a = 1.41613 + 0.43668I

b = 0.416133 + 0.436684I

1.64493 6.00000

u = 0.713912 − 0.305839I

a = 1.41613 − 0.43668I

b = 0.416133 − 0.436684I

1.64493 6.00000

VII. I

= hb − 1, a − 2, u + 1i

(i) Arc colorings







−1













−4

−3





















−1





−4

−3





−4

−3



(ii) Obstruction class = −1

(iii) Cusp Shapes = 6

(iv) u-Polynomials at the component

Crossings u-Polynomials at each crossing

, c

u + 1

, c

u − 1

, c

u + 2

(v) Riley Polynomials at the component

Crossings Riley Polynomials at each crossing

, c

y −1

, c

y −4

(vi) Complex Volumes and Cusp Shapes

Solutions to I

√

−1(vol +

√

−1CS) Cusp shape

u = −1.00000

a = 2.00000

b = 1.00000

1.64493 6.00000

VIII. u-Polynomials

Crossings u-Polynomials at each crossing

(u + 1)(u

+ u

+ u + 1)

− u

+ 2u

− 2u

+ 2u

− 2u + 1)

· (u

+ 4u

+ 8u

− u

+ 8u

− 3u

+ 4u

− 5u

− 3u

− 1)

· (u

+ 6u

+ ··· − 40u − 8)

(u − 1)(u

+ 2u

+ 3u

+ u + 1)

+ 3u

+ 4u

+ 2u

+ 1)

· (u

+ 8u

+ ··· − 6u − 1)(u

+ 14u

+ ··· + 32u − 64)

, c

((u − 1)

)(u

+ 3u

+ ··· + 2u

+ 1)(u

+ u

+ ··· − u − 1)

· (u

− 9u

+ ··· + 56u + 8)(u

+ 4u

+ ··· + 106u + 59)

· (u

− 9u

+ ··· − u − 1)

, c

(u + 1)(u

− u

+ ··· − 2u + 1)(u

+ u

+ ··· + 8u

+ 1)

· (u

+ u

− 2u

− 4u

+ 2u

+ u

+ 4u

− 1)

· (u

+ 3u

+ ··· − 4u + 8)(u

+ 3u

+ ··· − 6u + 1)

· (u

− u

+ ··· + 2u − 1)

, c

((u − 1)

)(u

+ 3u

+ ··· + 2u

+ 1)(u

− u

+ ··· − u + 1)

· (u

− 9u

+ ··· + 56u + 8)(u

+ 4u

+ ··· + 106u + 59)

· (u

− 9u

+ ··· − u − 1)

(u + 1)(u

+ u

+ u + 1)

− u

+ 2u

− 2u

+ 2u

− 2u + 1)

· (u

+ 4u

+ 8u

+ u

+ 8u

+ 3u

+ 4u

+ 5u

+ 3u

+ 1)

· (u

+ 6u

+ ··· − 40u − 8)

(u + 2)(u

− u

+ 1)

+ 3u

+ 4u

+ 3u + 2)

· (u

− 4u

+ ··· + 2u + 1)(u

− 9u

+ ··· + 2296u − 232)

(u + 2)(u

− u

+ 1)

+ 7u

+ ··· − 4u

+ 1)

· (u

+ 22u

+ ··· − 7680u − 512)

IX. Riley Polynomials

Crossings Riley Polynomials at each crossing

, c

(y −1)(y

+ 2y

+ 3y

+ y + 1)

+ 3y

+ 4y

+ 2y

+ 1)

· (y

+ 8y

+ ··· − 6y −1)(y

+ 14y

+ ··· + 32y −64)

(y −1)(y

+ 2y

+ 7y

+ 5y + 1)

− y

+ 4y

− 2y

+ 8y

+ 1)

· (y

+ 16y

+ ··· − 2y −1)(y

+ 2y

+ ··· + 39424y −4096)

, c

((y −1)

)(y

− y

+ ··· + 8y

+ 1)(y

− 15y

+ ··· + 13y −1)

· (y

− 20y

+ ··· − 32240y + 3481)(y

− 18y

+ ··· − 864y + 64)

· (y

− 18y

+ ··· − 7y −1)

, c

(y −1)(y

+ 3y

+ 4y

+ 2y

+ 1)

· (y

+ 7y

+ ··· + 16y + 1)(y

+ 2y

+ ··· + 8y

− 1)

· (y

− y

+ ··· − 6y + 1)(y

+ 6y

+ ··· + 944y + 64)

· (y

− 5y

+ ··· + 16y −1)

(y −4)(y

− y

+ 2y −1)

− y

+ 2y

+ 7y + 4)

· (y

− 8y

+ ··· − 10y −1)(y

− 7y

+ ··· + 586144y −53824)

(y −4)(y

− y

+ 2y −1)

− 7y

+ ··· + 8y −1)

· (y

− 4y

+ ··· + 1966080y −262144)