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)
3
1
(K3a
1
)
A knot diagram
1
Linearized knot diagam
3 1 2
Solving Sequence
1,2
3
c
3
c
1
, c
2
Ideals for irreducible components
2
of X
par
I
u
1
= hu + 1i
* 1 irreducible components of dim
C
= 0, with total 1 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