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)
11n
73
(K11n
73
)
A knot diagram
1
Linearized knot diagam
4 1 8 2 11 9 4 10 7 5 10
Solving Sequence
2,4
5
1,8
3
7,10
9 11 6
c
4
c
1
c
3
c
7
c
9
c
11
c
5
c
2
, c
6
, c
8
, c
10
Ideals for irreducible components
2
of X
par
I
u
1
= h−u
5
+ 3u
4
− 6u
3
+ 6u
2
+ 4d − u − 1, −u
5
+ 3u
4
− 6u
3
+ 6u
2
+ 4c − 5u − 1, u
4
− 2u
3
+ 2u
2
+ 2b − 1,
u
6
− 3u
5
+ 6u
4
− 5u
3
+ 2u
2
+ 2a + 6u + 3, u
7
− 3u
6
+ 5u
5
− 3u
4
− u
3
+ 7u
2
+ 3u − 1i
I
u
2
= hu
3
+ 4d − u + 2, −u
3
+ 2u
2
+ 4c − 3u − 4, −u
3
+ 4b + u + 2, −5u
3
+ 4u
2
+ 8a − 7u − 14,
u
4
− 2u
3
+ 3u
2
+ 4u − 4i
I
u
3
= hd, c + 1, b, a + 1, u + 1i
I
u
4
= hd + 1, c + 1, b, a − 1, u + 1i
I
u
5
= hd − c − 1, ca + a + 1, b, u + 1i
I
v
1
= hc, d + 1, b, a − 1, v − 1i
* 5 irreducible components of dim
C
= 0, with total 14 representations.
* 1 irreducible components of dim
C
= 1
1
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).
2
All coefficients of polynomials are rational numbers. But the coefficients are sometimes approximated
in decimal forms when there is not enough margin.
1