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PropertyT.jl/test/Chevalley.jl

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countmap(v) = countmap(identity, v)
function countmap(f, v)
counts = Dict{eltype(f(first(v))),Int}()
for x in v
fx = f(x)
counts[fx] = get!(counts, fx, 0) + 1
end
return counts
end
@testset "classify_root_system" begin
α = PropertyT.Roots.Root([1, -1, 0])
β = PropertyT.Roots.Root([0, 1, -1])
γ = PropertyT.Roots.Root([2, 0, 0])
@test PropertyT.Roots.classify_root_system(α, β, (false, false)) == :A₂
@test PropertyT.Roots.classify_root_system(α, γ, (false, true)) == :C₂
@test PropertyT.Roots.classify_root_system(β, γ, (false, true)) ==
Symbol("A₁×C₁")
end
@testset "Exceptional root systems" begin
@testset "F4" begin
F4 = let Σ = PermutationGroups.PermGroup(perm"(1,2,3,4)", perm"(1,2)")
long = let x = (1, 1, 0, 0) .// 1
PropertyT.Roots.Root.(
union(
(x^g for g in Σ),
((x .* (-1, 1, 1, 1))^g for g in Σ),
((-1 .* x)^g for g in Σ),
),
)
end
short = let x = (1, 0, 0, 0) .// 1
PropertyT.Roots.Root.(
union((x^g for g in Σ), ((-1 .* x)^g for g in Σ))
)
end
signs = collect(Iterators.product(fill([-1, +1], 4)...))
halfs = let x = (1, 1, 1, 1) .// 2
PropertyT.Roots.Root.(union(x .* sgn for sgn in signs))
end
union(long, short, halfs)
end
@test length(F4) == 48
a = F4[1]
@test isapprox(PropertyT.Roots.₂length(a), sqrt(2))
b = F4[6]
@test isapprox(PropertyT.Roots.₂length(b), sqrt(2))
c = a + b
@test isapprox(PropertyT.Roots.₂length(c), 2.0)
@test PropertyT.Roots.classify_root_system(b, c, (false, true)) == :C₂
long = F4[findfirst(r -> PropertyT.Roots.₂length(r) == sqrt(2), F4)]
short = F4[findfirst(r -> PropertyT.Roots.₂length(r) == 1.0, F4)]
subtypes = Set([:C₂, :A₂, Symbol("A₁×C₁")])
let Ω = F4, α = long
counts = countmap([
PropertyT.Roots.classify_sub_root_system(Ω, α, γ) for
γ in Ω if !PropertyT.Roots.isproportional(α, γ)
])
@test Set(keys(counts)) == subtypes
d, r = divrem(counts[:C₂], 6)
@test r == 0 && d == 3
d, r = divrem(counts[:A₂], 4)
@test r == 0 && d == 4
end
let Ω = F4, α = short
counts = countmap([
PropertyT.Roots.classify_sub_root_system(Ω, α, γ) for
γ in Ω if !PropertyT.Roots.isproportional(α, γ)
])
@test Set(keys(counts)) == subtypes
d, r = divrem(counts[:C₂], 6)
@test r == 0 && d == 3
d, r = divrem(counts[:A₂], 4)
@test r == 0 && d == 4
end
end
@testset "E6-7-8 exceptional root systems" begin
E8 =
let Σ = PermutationGroups.PermGroup(
perm"(1,2,3,4,5,6,7,8)",
perm"(1,2)",
)
long = let x = (1, 1, 0, 0, 0, 0, 0, 0) .// 1
PropertyT.Roots.Root.(
union(
(x^g for g in Σ),
((x .* (-1, 1, 1, 1, 1, 1, 1, 1))^g for g in Σ),
((-1 .* x)^g for g in Σ),
),
)
end
signs = collect(
p for p in Iterators.product(fill([-1, +1], 8)...) if
iseven(count(==(-1), p))
)
halfs = let x = (1, 1, 1, 1, 1, 1, 1, 1) .// 2
rts = unique(PropertyT.Roots.Root(x .* sgn) for sgn in signs)
end
union(long, halfs)
end
subtypes = Set([:A₂, Symbol("A₁×A₁")])
@testset "E8" begin
@test length(E8) == 240
@test all(r -> PropertyT.Roots.₂length(r) sqrt(2), E8)
let Ω = E8, α = first(Ω)
counts = countmap([
PropertyT.Roots.classify_sub_root_system(Ω, α, γ) for
γ in Ω if !PropertyT.Roots.isproportional(α, γ)
])
@test Set(keys(counts)) == subtypes
d, r = divrem(counts[:A₂], 4)
@test r == 0 && d == 28
end
end
@testset "E7" begin
E7 = filter(r -> iszero(sum(r.coord)), E8)
@test length(E7) == 126
let Ω = E7, α = first(Ω)
counts = countmap([
PropertyT.Roots.classify_sub_root_system(Ω, α, γ) for
γ in Ω if !PropertyT.Roots.isproportional(α, γ)
])
@test Set(keys(counts)) == subtypes
d, r = divrem(counts[:A₂], 4)
@test r == 0 && d == 16
end
end
@testset "E6" begin
E6 = filter(
r -> r.coord[end] == r.coord[end-1] == r.coord[end-2],
E8,
)
@test length(E6) == 72
let Ω = E6, α = first(Ω)
counts = countmap([
PropertyT.Roots.classify_sub_root_system(Ω, α, γ) for
γ in Ω if !PropertyT.Roots.isproportional(α, γ)
])
@test Set(keys(counts)) == subtypes
d, r = divrem(counts[:A₂], 4)
@info d, r
@test r == 0 && d == 10
end
end
end
end