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d385992e92
@ -1,7 +1,7 @@
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name = "Groups"
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uuid = "5d8bd718-bd84-11e8-3b40-ad14f4a32557"
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authors = ["Marek Kaluba <kalmar@amu.edu.pl>"]
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version = "0.7.8"
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version = "0.7.7"
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[deps]
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GroupsCore = "d5909c97-4eac-4ecc-a3dc-fdd0858a4120"
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@ -17,7 +17,7 @@ StaticArrays = "90137ffa-7385-5640-81b9-e52037218182"
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GroupsCore = "0.4"
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KnuthBendix = "0.4"
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OrderedCollections = "1"
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PermutationGroups = "0.4"
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PermutationGroups = "0.3"
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StaticArrays = "1"
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julia = "1.6"
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@ -1,7 +1,5 @@
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import PermutationGroups:
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AbstractPermutationGroup,
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AbstractPermutation,
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degree
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AbstractPermutationGroup, AbstractPerm, degree, SymmetricGroup
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"""
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WreathProduct(G::Group, P::AbstractPermutationGroup) <: Group
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@ -29,7 +27,7 @@ end
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struct WreathProductElement{
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DPEl<:DirectPowerElement,
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PEl<:AbstractPermutation,
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PEl<:AbstractPerm,
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Wr<:WreathProduct,
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} <: GroupsCore.GroupElement
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n::DPEl
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@ -38,7 +36,7 @@ struct WreathProductElement{
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function WreathProductElement(
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n::DirectPowerElement,
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p::AbstractPermutation,
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p::AbstractPerm,
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W::WreathProduct,
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)
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return new{typeof(n),typeof(p),typeof(W)}(n, p, W)
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@ -55,19 +53,16 @@ function Base.iterate(G::WreathProduct)
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itr = Iterators.product(G.N, G.P)
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res = iterate(itr)
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@assert res !== nothing
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ab, st = res
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(a, b) = ab
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elt = WreathProductElement(a, b, G)
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return elt, (itr, st)
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elt = WreathProductElement(first(res)..., G)
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return elt, (iterator = itr, state = last(res))
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end
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function Base.iterate(G::WreathProduct, state)
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itr, st = state
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itr, st = state.iterator, state.state
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res = iterate(itr, st)
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res === nothing && return nothing
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(a::eltype(G.N), b::eltype(G.P)), st = res
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elt = WreathProductElement(a, b, G)
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return elt, (itr, st)
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elt = WreathProductElement(first(res)..., G)
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return elt, (iterator = itr, state = last(res))
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end
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function Base.IteratorSize(::Type{<:WreathProduct{DP,PGr}}) where {DP,PGr}
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@ -123,11 +118,8 @@ function Base.deepcopy_internal(g::WreathProductElement, stackdict::IdDict)
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)
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end
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function _act(p::AbstractPermutation, n::DirectPowerElement)
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return DirectPowerElement(
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ntuple(i -> n.elts[i^p], length(n.elts)),
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parent(n),
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)
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function _act(p::AbstractPerm, n::DirectPowerElement)
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return DirectPowerElement(n.elts^p, parent(n))
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end
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function Base.inv(g::WreathProductElement)
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@ -5,7 +5,7 @@
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@test contains(sprint(print, π₁Σ), "surface")
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Groups.PermRightAut(p::Perm) = Groups.PermRightAut([i^p for i in 1:2genus])
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Groups.PermRightAut(p::Perm) = Groups.PermRightAut(p.d)
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# Groups.PermLeftAut(p::Perm) = Groups.PermLeftAut(p.d)
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autπ₁Σ = let autπ₁Σ = AutomorphismGroup(π₁Σ)
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pauts = let p = perm"(1,3,5)(2,4,6)"
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@ -50,9 +50,8 @@
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@test π₁Σ.(word.(z)) == Groups.domain(first(S))
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d = Groups.domain(first(S))
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p = perm"(1,3,5)(2,4,6)"
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@test Groups.evaluate!(deepcopy(d), τ) ==
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ntuple(i -> d[i^inv(p)], length(d))
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@test Groups.evaluate!(deepcopy(d), τ^2) == ntuple(i -> d[i^p], length(d))
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@test Groups.evaluate!(deepcopy(d), τ) == d^inv(p)
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@test Groups.evaluate!(deepcopy(d), τ^2) == d^p
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E, sizes = Groups.wlmetric_ball(S, radius=3)
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@test sizes == [49, 1813, 62971]
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@ -1,10 +1,9 @@
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@testset "GroupConstructions" begin
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symmetric_group(n) = PermGroup(perm"(1,2)", Perm([2:n; 1]))
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@testset "DirectProduct" begin
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GH =
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let G = symmetric_group(3), H = symmetric_group(4)
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let G = PermutationGroups.SymmetricGroup(3),
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H = PermutationGroups.SymmetricGroup(4)
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Groups.Constructions.DirectProduct(G, H)
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end
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@ -18,7 +17,7 @@
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@testset "DirectPower" begin
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GGG = Groups.Constructions.DirectPower{3}(
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symmetric_group(3),
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PermutationGroups.SymmetricGroup(3),
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)
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test_Group_interface(GGG)
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test_GroupElement_interface(rand(GGG, 2)...)
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@ -29,7 +28,8 @@
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end
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@testset "WreathProduct" begin
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W =
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let G = symmetric_group(2), P = symmetric_group(4)
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let G = PermutationGroups.SymmetricGroup(2),
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P = PermutationGroups.SymmetricGroup(4)
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Groups.Constructions.WreathProduct(G, P)
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end
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