|
tetrahedron.sing |
Solves the case of n=3 with 4 spheres at the corners of a
tetrahedron. |
|
AffineInd.maple |
This file creates a Singular file to compute the
Groebner basis for the example of Section 3 where
we have one of the 3 factors of the ideal.
This was crucial for the proof of Theorem 5. |
|
AffineInd-Ideals |
Output of the Singular code from AffineInd.maple |
|
Dependent.maple |
This is the maple file accompanying the proof in
Section 4. It runs the computation of the proof, and prints out
commentary.
Here is its output |
|
GenQuad4.maple |
This maple file creates a Singular file to compute the ideal
of lines in 4-space tangent to 6 general quadrics.
Here is the Singular code it creates.
Here is the output of that code. |
| | |
|
Figure1.maple |
Draws Figure 1, the 12 lines tangent to
spheres at vertices of a regular tetrahedron.
The ideal as computed in
tetrahedron.sing has three
components, and we color the components with different
colors.
Figure1.html |
|
Figure2.maple |
Draws the skeleton of Figure 2, the discriminant
locus of Theorem 4 in the paper.
Figure2.html |
