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)
9
42
(K9n
4
)
A knot diagram
1
Linearized knot diagam
3 5 6 8 2 9 5 6 7
Solving Sequence
2,6
5 3
1,9
8 4 7
c
5
c
2
c
1
c
8
c
4
c
7
c
3
, c
6
, c
9
Ideals for irreducible components
2
of X
par
I
u
1
= hu
4
+ u
3
+ u
2
+ b + 1, u
4
+ u
3
+ u
2
+ a − u + 1, u
5
+ 2u
4
+ 2u
3
+ u + 1i
I
u
2
= hb + 1, a − u + 1, u
2
− u + 1i
* 2 irreducible components of dim
C
= 0, with total 7 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