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Author SHA1 Message Date
Aaron Fenyes
717e5a6200 Extend Gram matrix automatically
The signature of the Minkowski form on the subspace spanned by the Gram
matrix should tell us what the big Gram matrix has to look like
2024-02-21 03:00:06 -05:00
Aaron Fenyes
16826cf07c Try out the Gram matrix approach 2024-02-20 22:35:24 -05:00
2 changed files with 104 additions and 0 deletions

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using LinearAlgebra
using AbstractAlgebra
function printgood(msg)
printstyled("", color = :green)
println(" ", msg)
end
function printbad(msg)
printstyled("", color = :red)
println(" ", msg)
end
F, gens = rational_function_field(Generic.Rationals{BigInt}(), ["a₁", "a₂", "b₁", "b₂", "c₁", "c₂"])
a = gens[1:2]
b = gens[3:4]
c = gens[5:6]
# three mutually tangent spheres which are all perpendicular to the x, y plane
gram = [
-1 1 1;
1 -1 1;
1 1 -1
]
eig = eigen(gram)
n_pos = count(eig.values .> 0.5)
n_neg = count(eig.values .< -0.5)
if n_pos + n_neg == size(gram, 1)
printgood("Non-degenerate subspace")
else
printbad("Degenerate subspace")
end
sig_rem = Int64[ones(2-n_pos); -ones(3-n_neg)]
unk = hcat(a, b, c)
M = matrix_space(F, 5, 5)
big_gram = M(F.([
diagm(sig_rem) unk;
transpose(unk) gram
]))
r, p, L, U = lu(big_gram)
if isone(p)
printgood("Found a solution")
else
printbad("Didn't find a solution")
end
solution = transpose(L)
mform = U * inv(solution)
vals = [0, 0, 0, 1, 0, -3//4]
solution_ex = [evaluate(entry, vals) for entry in solution]
mform_ex = [evaluate(entry, vals) for entry in mform]
std_basis = [
0 0 0 1 1;
0 0 0 1 -1;
1 0 0 0 0;
0 1 0 0 0;
0 0 1 0 0
]
std_solution = M(F.(std_basis)) * solution
std_solution_ex = std_basis * solution_ex
println("Minkowski form:")
display(mform_ex)
big_gram_recovered = transpose(solution_ex) * mform_ex * solution_ex
valid = all(iszero.(
[evaluate(entry, vals) for entry in big_gram] - big_gram_recovered
))
if valid
printgood("Recovered Gram matrix:")
else
printbad("Didn't recover Gram matrix. Instead, got:")
end
display(big_gram_recovered)

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F = QQ['a', 'b', 'c'].fraction_field()
a, b, c = F.gens()
# three mutually tangent spheres which are all perpendicular to the x, y plane
gram = matrix([
[-1, 0, 0, 0, 0],
[0, -1, a, b, c],
[0, a, -1, 1, 1],
[0, b, 1, -1, 1],
[0, c, 1, 1, -1]
])
P, L, U = gram.LU()
solution = (P * L).transpose()
mform = U * L.transpose().inverse()
concrete = solution.subs({a: 0, b: 1, c: -3/4})
std_basis = matrix([
[0, 0, 0, 1, 1],
[0, 0, 0, 1, -1],
[1, 0, 0, 0, 0],
[0, 1, 0, 0, 0],
[0, 0, 1, 0, 0]
])
std_solution = std_basis * solution
std_concrete = std_basis * concrete