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)
9
48
(K9n
6
)
A knot diagram
1
Linearized knot diagam
5 7 9 2 4 3 6 4 3
Solving Sequence
3,9 4,7
2 6 5 1 8
c
3
c
2
c
6
c
5
c
1
c
8
c
4
, c
7
, c
9
Ideals for irreducible components
2
of X
par
I
u
1
= hb − u, −u
2
+ a, u
3
− u
2
+ u + 1i
I
u
2
= hb − u, −u
3
+ a + 1, u
4
+ u
3
+ u
2
+ 1i
I
u
3
= hu
2
+ b + u, u
3
+ 2u
2
+ a + 2u, u
4
+ u
3
+ u
2
+ 1i
I
u
4
= h−u
3
+ u
2
+ b − u + 1, −u
3
+ 2a + u − 1, u
4
− 2u
3
+ 3u
2
− 3u + 2i
I
u
5
= hb + u, a + 2u + 1, u
2
+ 1i
* 5 irreducible components of dim
C
= 0, with total 17 representations.
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