mirror of
https://github.com/kalmarek/Groups.jl.git
synced 2024-12-01 01:25:27 +01:00
187 lines
5.7 KiB
Julia
187 lines
5.7 KiB
Julia
@testset "Automorphisms" begin
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@testset "Transvections" begin
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@test Groups.Transvection(:ϱ, 1, 2) isa Groups.GSymbol
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@test Groups.Transvection(:ϱ, 1, 2) isa Groups.Transvection
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@test Groups.Transvection(:λ, 1, 2) isa Groups.GSymbol
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@test Groups.Transvection(:λ, 1, 2) isa Groups.Transvection
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t = Groups.Transvection(:ϱ, 1, 2)
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@test inv(t) isa Groups.GSymbol
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@test inv(t) isa Groups.Transvection
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@test t != inv(t)
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s = Groups.Transvection(:ϱ, 1, 2)
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@test t == s
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@test hash(t) == hash(s)
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s_ = Groups.Transvection(:ϱ, 1, 3)
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@test s_ != s
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@test hash(s_) != hash(s)
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@test Groups.gersten_alphabet(3) isa Alphabet
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A = Groups.gersten_alphabet(3)
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@test length(A) == 12
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@test sprint(show, Groups.ϱ(1, 2)) == "ϱ₁.₂"
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@test sprint(show, Groups.λ(3, 2)) == "λ₃.₂"
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end
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A4 = Alphabet(
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[:a, :A, :b, :B, :c, :C, :d, :D],
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[2, 1, 4, 3, 6, 5, 8, 7]
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)
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A5 = Alphabet(
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[:a, :A, :b, :B, :c, :C, :d, :D, :e, :E],
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[2, 1, 4, 3, 6, 5, 8, 7, 10, 9]
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)
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F4 = FreeGroup([:a, :b, :c, :d], A4)
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a, b, c, d = gens(F4)
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D = ntuple(i -> gens(F4, i), 4)
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@testset "Transvection action correctness" begin
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i, j = 1, 2
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r = Groups.Transvection(:ϱ, i, j)
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l = Groups.Transvection(:λ, i, j)
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(t::Groups.Transvection)(v::Tuple) = Groups.evaluate!(v, t)
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@test r(deepcopy(D)) == (a * b, b, c, d)
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@test inv(r)(deepcopy(D)) == (a * b^-1, b, c, d)
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@test l(deepcopy(D)) == (b * a, b, c, d)
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@test inv(l)(deepcopy(D)) == (b^-1 * a, b, c, d)
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i, j = 3, 1
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r = Groups.Transvection(:ϱ, i, j)
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l = Groups.Transvection(:λ, i, j)
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@test r(deepcopy(D)) == (a, b, c * a, d)
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@test inv(r)(deepcopy(D)) == (a, b, c * a^-1, d)
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@test l(deepcopy(D)) == (a, b, a * c, d)
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@test inv(l)(deepcopy(D)) == (a, b, a^-1 * c, d)
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i, j = 4, 3
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r = Groups.Transvection(:ϱ, i, j)
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l = Groups.Transvection(:λ, i, j)
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@test r(deepcopy(D)) == (a, b, c, d * c)
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@test inv(r)(deepcopy(D)) == (a, b, c, d * c^-1)
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@test l(deepcopy(D)) == (a, b, c, c * d)
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@test inv(l)(deepcopy(D)) == (a, b, c, c^-1 * d)
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i, j = 2, 4
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r = Groups.Transvection(:ϱ, i, j)
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l = Groups.Transvection(:λ, i, j)
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@test r(deepcopy(D)) == (a, b * d, c, d)
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@test inv(r)(deepcopy(D)) == (a, b * d^-1, c, d)
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@test l(deepcopy(D)) == (a, d * b, c, d)
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@test inv(l)(deepcopy(D)) == (a, d^-1 * b, c, d)
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end
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A = SpecialAutomorphismGroup(F4, max_rules=1000)
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@testset "AutomorphismGroup constructors" begin
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@test A isa Groups.AbstractFPGroup
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@test A isa AutomorphismGroup
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@test alphabet(A) isa Alphabet
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@test Groups.relations(A) isa Vector{<:Pair}
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@test sprint(show, A) == "automorphism group of free group on 4 generators"
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end
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@testset "Automorphisms: hash and evaluate" begin
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@test Groups.domain(gens(A, 1)) == D
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g, h = gens(A, 1), gens(A, 8) # (ϱ₁.₂, ϱ₃.₂)
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@test evaluate(g * h) == evaluate(h * g)
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@test (g * h).savedhash == zero(UInt)
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@test contains(sprint(show, typeof(g)), "Automorphism{FreeGroup{Symbol")
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a = g * h
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b = h * g
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@test hash(a) != zero(UInt)
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@test hash(a) == hash(b)
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@test a.savedhash == b.savedhash
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@test length(unique([a, b])) == 1
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@test length(unique([g * h, h * g])) == 1
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# Not so simple arithmetic: applying starting on the left:
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# ϱ₁₂*ϱ₂₁⁻¹*λ₁₂*ε₂ == σ₂₁₃₄
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g = gens(A, 1)
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x1, x2, x3, x4 = Groups.domain(g)
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@test evaluate(g) == (x1 * x2, x2, x3, x4)
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g = g * inv(gens(A, 4)) # ϱ₂₁
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@test evaluate(g) == (x1 * x2, x1^-1, x3, x4)
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g = g * gens(A, 13)
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@test evaluate(g) == (x2, x1^-1, x3, x4)
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end
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@testset "Automorphisms: SAut(F₄)" begin
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N = 4
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G = SpecialAutomorphismGroup(FreeGroup(N))
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S = gens(G)
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@test S isa Vector{<:FPGroupElement{<:AutomorphismGroup{<:FreeGroup}}}
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@test length(S) == 2 * N * (N - 1)
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@test length(unique(S)) == length(S)
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S_sym = [S; inv.(S)]
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@test length(S_sym) == length(unique(S_sym))
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pushfirst!(S_sym, one(G))
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B_2 = [i * j for (i, j) in Base.product(S_sym, S_sym)]
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@test length(B_2) == 2401
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@test length(unique(B_2)) == 1777
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@test all(g -> isone(inv(g) * g), B_2)
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@test all(g -> isone(g * inv(g)), B_2)
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end
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@testset "Forward evaluate" begin
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N = 3
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F = FreeGroup(N)
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G = SpecialAutomorphismGroup(F)
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a = gens(G, 1) # ϱ₁₂
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f = gens(F)
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@test a(f[1]) == f[1] * f[2]
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@test all(a(f[i]) == f[i] for i in 2:length(f))
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S = let s = gens(G)
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[s; inv.(s)]
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end
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@test all(
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map(first(Groups.wlmetric_ball(S, radius=2))) do g
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lm = Groups.LettersMap(g)
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img = evaluate(g)
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fimg = [F(lm[first(word(s))]) for s in gens(F)]
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succeeded = all(img .== fimg)
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@assert succeeded "forward evaluation of $(word(g)) failed: \n img=$img\n fimg=$(tuple(fimg...))"
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succeeded
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end
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)
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end
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Logging.with_logger(Logging.NullLogger()) do
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@testset "GroupsCore conformance" begin
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test_Group_interface(A)
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g = A(rand(1:length(alphabet(A)), 10))
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h = A(rand(1:length(alphabet(A)), 10))
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test_GroupElement_interface(g, h)
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end
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end
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end
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