45 lines
1.4 KiB
Julia
45 lines
1.4 KiB
Julia
## Particular definitions for actions on Sp(n,ℤ)
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function _conj(
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s::MatrixGroups.ElementarySymplectic{N,T},
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σ::PermutationGroups.AbstractPerm,
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) where {N,T}
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@assert iseven(N)
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@assert PermutationGroups.degree(σ) == N ÷ 2 "Got degree = $(PermutationGroups.degree(σ)); N = $N"
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n = N ÷ 2
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@assert 1 ≤ s.i ≤ N
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@assert 1 ≤ s.j ≤ N
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if s.symbol == :A
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@assert 1 ≤ s.i ≤ n
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@assert 1 ≤ s.j ≤ n
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i = s.i^inv(σ)
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j = s.j^inv(σ)
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else
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@assert s.symbol == :B
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@assert xor(s.i > n, s.j > n)
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if s.i > n
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i = (s.i - n)^inv(σ) + n
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j = s.j^inv(σ)
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elseif s.j > n
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i = s.i^inv(σ)
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j = (s.j - n)^inv(σ) + n
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end
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end
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return MatrixGroups.ElementarySymplectic{N}(s.symbol, i, j, s.val)
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end
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function _conj(
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s::MatrixGroups.ElementarySymplectic{N,T},
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x::Groups.Constructions.DirectPowerElement,
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) where {N,T}
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@assert Groups.order(Int, parent(x).group) == 2
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@assert iseven(N)
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n = N ÷ 2
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i, j = ifelse(s.i <= n, s.i, s.i - n), ifelse(s.j <= n, s.j, s.j - n)
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just_one_flips = xor(isone(x.elts[i]), isone(x.elts[j]))
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return ifelse(just_one_flips, inv(s), s)
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end
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action_by_conjugation(sln::Groups.MatrixGroups.SymplecticGroup, Σ::Groups.Group) =
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AlphabetPermutation(alphabet(sln), Σ, _conj)
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