mirror of
https://github.com/kalmarek/Groups.jl.git
synced 2024-10-19 08:05:36 +02:00
225 lines
6.7 KiB
Julia
225 lines
6.7 KiB
Julia
import Base: ×
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export DirectProductGroup, DirectProductGroupElem
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###############################################################################
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#
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# DirectProductGroup / DirectProductGroupElem
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#
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###############################################################################
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doc"""
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DirectProductGroup(G::Group, n::Int) <: Group
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Implements `n`-fold direct product of `G`. The group operation is
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`*` distributed component-wise, with component-wise identity as neutral element.
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"""
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immutable DirectProductGroup{T<:Group} <: Group
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group::T
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n::Int
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end
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immutable DirectProductGroupElem{T<:GroupElem} <: GroupElem
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elts::Vector{T}
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end
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###############################################################################
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#
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# Type and parent object methods
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#
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###############################################################################
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elem_type{T<:Group}(G::DirectProductGroup{T}) =
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DirectProductGroupElem{elem_type(G.group)}
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parent_type{T<:GroupElem}(::Type{DirectProductGroupElem{T}}) =
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DirectProductGroup{parent_type(T)}
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parent(g::DirectProductGroupElem) =
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DirectProductGroup(parent(first(g.elts)), length(g.elts))
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###############################################################################
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#
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# AbstractVector interface
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#
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###############################################################################
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Base.size(g::DirectProductGroupElem) = size(g.elts)
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Base.linearindexing(::Type{DirectProductGroupElem}) = Base.LinearFast()
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Base.getindex(g::DirectProductGroupElem, i::Int) = g.elts[i]
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function Base.setindex!{T<:GroupElem}(g::DirectProductGroupElem{T}, v::T, i::Int)
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p.part[i] = v
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return p
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end
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###############################################################################
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#
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# DirectProductGroup / DirectProductGroupElem constructors
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#
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###############################################################################
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function ×(G::Group, H::Group)
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G == H || throw("Direct products are defined only for the same groups")
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return DirectProductGroup(G,2)
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end
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###############################################################################
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#
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# Parent object call overloads
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#
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###############################################################################
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doc"""
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(G::DirectProductGroup)(a::Vector, check::Bool=true)
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> Constructs element of the $n$-fold direct product group `G` by coercing each
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> element of vector `a` to `G.group`. If `check` flag is set to `false` no
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> checks on the correctness are performed.
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"""
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function (G::DirectProductGroup)(a::Vector, check::Bool=true)
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if check
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G.n == length(a) || throw("Can not coerce to DirectProductGroup: lengths differ")
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a = G.group.(a)
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end
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return DirectProductGroupElem(a)
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end
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(G::DirectProductGroup)() = DirectProductGroupElem([G.group() for _ in 1:G.n])
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(G::DirectProductGroup)(g::DirectProductGroupElem) = G(g.elts)
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(G::DirectProductGroup){T<:GroupElem, N}(a::Vararg{T, N}) = G([a...])
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###############################################################################
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#
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# Basic manipulation
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#
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###############################################################################
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function deepcopy_internal(g::DirectProductGroupElem, dict::ObjectIdDict)
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G = parent(g)
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return G(deepcopy(g.elts))
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end
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function hash(G::DirectProductGroup, h::UInt)
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return hash(G.group, hash(G.n, hash(DirectProductGroup,h)))
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end
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function hash(g::DirectProductGroupElem, h::UInt)
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return hash(g.elts, hash(parent(g), hash(DirectProductGroupElem, h)))
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end
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doc"""
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eye(G::DirectProductGroup)
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> Return the identity element for the given direct product of groups.
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"""
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eye(G::DirectProductGroup) = G()
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###############################################################################
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#
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# String I/O
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#
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###############################################################################
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function show(io::IO, G::DirectProductGroup)
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println(io, "Direct product of groups")
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join(io, G.factors, ", ", " and ")
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end
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function show(io::IO, g::DirectProductGroupElem)
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print(io, "("*join(g.elts,",")*")")
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end
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###############################################################################
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#
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# Comparison
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#
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###############################################################################
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function (==)(G::DirectProductGroup, H::DirectProductGroup)
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G.factors == H.factors || return false
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return true
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end
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doc"""
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==(g::DirectProductGroupElem, h::DirectProductGroupElem)
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> Return `true` if the given elements of direct products are equal, otherwise return `false`.
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"""
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function (==)(g::DirectProductGroupElem, h::DirectProductGroupElem)
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parent(g) == parent(h) || return false
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g.elts == h.elts || return false
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return true
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end
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###############################################################################
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#
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# Binary operators
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#
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###############################################################################
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function direct_mult(g::DirectProductGroupElem, h::DirectProductGroupElem)
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G = parent(g)
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# G == parent(h) || throw("Can't multiply elements from different groups: $G, $parent(h)")
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if isa(first(G.factors), Ring)
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return G(.+(g.elts,h.elts))
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else
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return G(.*(g.elts,h.elts))
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end
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end
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doc"""
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*(g::DirectProductGroupElem, h::DirectProductGroupElem)
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> Return the direct-product group operation of elements, i.e. component-wise
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> operation as defined by `operations` field of the parent object.
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"""
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(*)(g::DirectProductGroupElem, h::DirectProductGroupElem) = direct_mult(g,h)
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###############################################################################
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#
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# Inversion
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#
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###############################################################################
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doc"""
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inv(g::DirectProductGroupElem)
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> Return the inverse of the given element in the direct product group.
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"""
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# TODO: dirty hack around `+` operation
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function inv(g::DirectProductGroupElem)
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G = parent(g)
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if isa(first(G.factors), Ring)
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return DirectProductGroupElem([-a for a in g.elts])
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else
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return DirectProductGroupElem([inv(a) for a in g.elts])
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end
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end
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###############################################################################
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#
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# Misc
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#
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###############################################################################
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doc"""
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elements(G::DirectProductGroup)
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> Returns `Task` that produces all elements of group `G` (provided that factors
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> implement the elements function).
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"""
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# TODO: can Base.product handle generators?
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# now it returns nothing's so we have to collect ellements...
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function elements(G::DirectProductGroup)
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cartesian_prod = Base.product([collect(elements(H)) for H in G.factors]...)
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return (G(collect(elt)) for elt in cartesian_prod)
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end
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doc"""
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order(G::DirectProductGroup)
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> Returns the order (number of elements) in the group.
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"""
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order(G::DirectProductGroup) = prod([order(H) for H in G.factors])
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