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Groups.jl/src/automorphism_groups.jl

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using Permutations
import Base: convert
export AutSymbol, AutWord, rmul_AutSymbol, lmul_AutSymbol, flip_AutSymbol, symmetric_AutSymbol
immutable AutSymbol <: GSymbol
gen::String
pow::Int
ex::Expr
func::Function
end
function (f::AutSymbol){T}(v::Vector{GWord{T}})
if f.pow == 0
return v
else
return f.func(v)
# else
# throw(ArgumentError("Check that Symbol $f is properly defined!\n $(dump(f))"))
end
end
(==)(s::AutSymbol, t::AutSymbol) = s.gen == t.gen && s.pow == t.pow
hash(s::AutSymbol, h::UInt) = hash(s.gen, hash(s.pow, hash(:AutSymbol, h)))
IdSymbol(::Type{AutSymbol}) = AutSymbol("(id)", 0, :(id()), id)
function change_pow(s::AutSymbol, n::Int)
if n == 0
return one(s)
end
symbol = s.ex.args[1]
if symbol ==
return flip_AutSymbol(s.ex.args[2], pow=n)
elseif symbol == :σ
return symmetric_AutSymbol(s.ex.args[2], pow=n)
elseif symbol == :ϱ
return rmul_AutSymbol(s.ex.args[2], s.ex.args[3], pow=n)
elseif symbol ==
return lmul_AutSymbol(s.ex.args[2], s.ex.args[3], pow=n)
elseif symbol == :id
return s
else
warn("Changing an unknown type of symbol! $s")
return AutSymbol(s.gen, n, s.ex, s.func)
end
end
inv(f::AutSymbol) = change_pow(f, -f.pow)
function id()
return v -> v
end
function ϱ(i,j, pow=1)
# @assert i ≠ j
return v -> [(k==i ? v[i]*v[j]^pow : v[k]) for k in eachindex(v)]
end
function λ(i,j, pow=1)
# @assert i ≠ j
return v -> [(k==i ? v[j]^pow*v[i] : v[k]) for k in eachindex(v)]
end
function σ(perm, pow=1)
# @assert sort(perm) == collect(1:length(perm))
if pow == 1
return v -> [v[perm[k]] for k in eachindex(v)]
else
p = Permutations.Permutation(perm)
perm = array(p^pow)
return v -> [v[perm[k]] for k in eachindex(v)]
end
end
ɛ(i, pow=1) = v -> [(k==i ? v[k]^(-1*(pow % 2)) : v[k]) for k in eachindex(v)]
function rmul_AutSymbol(i,j; pow::Int=1)
gen = string('ϱ',Char(8320+i), Char(8320+j)...)
return AutSymbol(gen, pow, :(ϱ($i,$j, $pow)), ϱ(i,j, pow))
end
function lmul_AutSymbol(i,j; pow::Int=1)
gen = string('λ',Char(8320+i), Char(8320+j)...)
return AutSymbol(gen, pow, :(λ($i,$j, $pow)), λ(i,j, pow))
end
function flip_AutSymbol(j; pow::Int=1)
gen = string('ɛ', Char(8320 + j))
return AutSymbol(gen, (2+pow%2)%2, :(ɛ($j, $pow)), ɛ(j,pow))
end
function symmetric_AutSymbol(perm::Vector{Int}; pow::Int=1)
perm = Permutation(perm)
ord = order(perm)
pow = pow % ord
perm = perm^pow
p = array(perm)
if p == collect(1:length(p))
return one(AutSymbol)
else
gen = string('σ', [Char(8320 + i) for i in p]...)
return AutSymbol(gen, 1, :(σ($p, 1)), σ(p, 1))
end
end
function getperm(s::AutSymbol)
if s.ex.args[1] == :σ
return s.ex.args[2]
else
throw(ArgumentError("$s is not a permutation automorphism!"))
end
end
typealias AutWord GWord{AutSymbol}
function (F::AutWord)(v)
for f in F.symbols
v = f(v)
end
return v
end
convert(::Type{AutWord}, s::AutSymbol) = GWord(s)
function simplify_perms!(W::AutWord)
reduced = true
for i in 1:length(W.symbols) - 1
current = W.symbols[i]
if current.ex.args[1] == :σ
if current.pow != 1
current = symmetric_AutSymbol(perm(current), pow=current.pow)
end
next_s = W.symbols[i+1]
if next_s.ex.args[1] == :σ
reduced = false
if next_s.pow != 1
next_s = symmetric_AutSymbol(perm(next_s), pow=next_s.pow)
end
p1 = Permutation(getperm(current))
p2 = Permutation(getperm(next_s))
W.symbols[i] = one(AutSymbol)
W.symbols[i+1] = symmetric_AutSymbol(array(p1*p2))
end
end
end
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deleteat!(W.symbols, find(x -> x.pow == 0, W.symbols))
return reduced
end
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function reduce!(W::AutWord)
if length(W) < 2
deleteat!(W.symbols, find(x -> x.pow == 0, W.symbols))
else
reduced = false
while !reduced
reduced = simplify_perms!(W)
reduced = join_free_symbols!(W)
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deleteat!(W.symbols, find(x -> x.pow == 0, W.symbols))
end
end
W.modified = false
W.savedhash = hash(W.symbols,hash(typeof(W)))
return W
end