Move characters and Projections to a separate file

OrbitDecomposition.jl

@@ -97,120 +97,14 @@ function matrix_repr(g::WreathProductElem, E, E_dict)
    return rep_matrix
 end
 
-function chars(G::PermutationGroup)
-   permtype_unsorted(σ::Nemo.perm) = [length(c) for c in cycles(σ)]
-   permtype(σ::Nemo.perm) = sort(permtype_unsorted(σ))
 
-   χ_id(σ::Nemo.perm) = 1
-
-   χ_sgn(σ::Nemo.perm) = (-1)^parity(σ)
-
-   function χ_reg(σ::Nemo.perm)
-      fixed_points = countnz([(x == y? 1 : 0) for (x,y) in enumerate(σ.d)])
-      return fixed_points - 1
-   end
-
-   χ_regsgn(σ::Nemo.perm) = (-1)^parity(σ)*χ_reg(σ)
-
-   function χ_regviaS3(σ::Nemo.perm)
-      @assert parent(σ).n == 4
-      t = permtype(σ)
-         if t == [1,1,1,1]
-            result = 2
-         elseif t == [2,2]
-            result = 2
-         elseif t == [1,3]
-            result = -1
-         else
-            result = 0
-         end
-      return result
-   end
-
-   chars = [χ_id, χ_sgn, χ_regviaS3, χ_reg, χ_regsgn]
-
-   if G.n == 1
-      return chars[1:1]
-   elseif G.n == 2
-      return chars[1:2]
-   elseif G.n == 3
-      return [chars[1:2]..., chars[4]]
-   elseif G.n == 4
-      return chars[1:5]
-   else
-      throw("Characters for $G unknown!")
-   end
 end
 
-function epsilon(i, g::DirectProducts.DirectProductGroupElem)
-    return reduce(*, 1, ((-1)^isone(g.elts[j]) for j in 1:i))
-end
-
-function central_projection(RG::GroupRing, char::Function, T::Type=Rational{Int})
-    result = RG(T)
-    for g in RG.basis
-        result[g] = char(g)
     end
-    return convert(T, char(RG.group())//Int(order(RG.group))*result)
 end
 
-function rankOne_projections(G::PermutationGroup, T::Type=Rational{Int})
-   RG = GroupRing(G)
-   projections = [central_projection(RG, χ, T) for χ in chars(G)]
 
-   if G.n == 1 || G.n == 2
-      return  projections
-   elseif G.n == 3
-      rankone_projs = [
-         projections[1],
-         projections[2],
-         1//2*(one(RG) - RG(RG.group([2,1,3])))*projections[3]
-         ]
-      return rankone_projs
-   elseif G.n == 4
-      rankone_projs = [
-         projections[1],
-         projections[2],
-         1//2*(one(RG) - RG(RG.group([2,1,3,4])))*projections[3],
-         1//2*(one(RG) - RG(RG.group([2,1,3,4])))*projections[4],
-         1//2*(one(RG) + RG(RG.group([2,1,3,4])))*projections[5]]
-      return rankone_projs
-   else
-      throw("Rank-one projections for $G unknown!")
    end
-
-end
-
-function rankOne_projections(BN::WreathProducts.WreathProduct, T::Type=Rational{Int})
-
-   N = BN.P.n
-    # projections as elements of the group rings RSₙ
-   SNprojs_nc = [rankOne_projections(PermutationGroup(i), T) for i in 1:N]
-
-   # embedding into group ring of BN
-   RBN = GroupRing(BN)
-   RFFFF_projs = [central_projection(GroupRing(BN.N), g->epsilon(i,g), T)
-        for i in 0:BN.P.n]
-   Qs = [RBN(q, g -> BN(g)) for q in RFFFF_projs]
-
-   function incl(k::Int, g::perm, WP::WreathProduct=BN)
-      @assert length(g.d) + k <= WP.P.n
-      arr = [1:k; g.d .+ k; (length(g.d)+k+1):WP.P.n]
-      return WP(WP.P(arr))
-   end
-
-    all_projs=[Qs[1]*RBN(p, g-> incl(0,g)) for p in SNprojs_nc[N]]
-
-   for i in 1:N-1
-        Sk_first = [RBN(p, g->incl(0,g)) for p in SNprojs_nc[i]]
-        Sk_last  = [RBN(p, g->incl(i,g)) for p in SNprojs_nc[N-i]]
-        append!(all_projs, [Qs[i+1]*p1*p2
-                for (p1,p2) in Base.product(Sk_first,Sk_last)])
-   end
-
-   append!(all_projs, [Qs[N+1]*RBN(p, g-> incl(0,g)) for p in SNprojs_nc[N]])
-
-   return all_projs
 end
 
 function Cstar_repr(x::GroupRingElem, matrix_reps)

Projections.jl

@@ -0,0 +1,132 @@
+###############################################################################
+#
+#  Characters of PermutationGroup
+#
+###############################################################################
+
+function chars(G::PermutationGroup)
+   permtype_unsorted(σ::Nemo.perm) = [length(c) for c in cycles(σ)]
+   permtype(σ::Nemo.perm) = sort(permtype_unsorted(σ))
+
+   χ_id(σ::Nemo.perm) = 1
+
+   χ_sgn(σ::Nemo.perm) = (-1)^parity(σ)
+
+   function χ_reg(σ::Nemo.perm)
+      fixed_points = countnz([(x == y? 1 : 0) for (x,y) in enumerate(σ.d)])
+      return fixed_points - 1
+   end
+
+   χ_regsgn(σ::Nemo.perm) = (-1)^parity(σ)*χ_reg(σ)
+
+   function χ_regviaS3(σ::Nemo.perm)
+      @assert parent(σ).n == 4
+      t = permtype(σ)
+         if t == [1,1,1,1]
+            result = 2
+         elseif t == [2,2]
+            result = 2
+         elseif t == [1,3]
+            result = -1
+         else
+            result = 0
+         end
+      return result
+   end
+
+   chars = [χ_id, χ_sgn, χ_regviaS3, χ_reg, χ_regsgn]
+
+   if G.n == 1
+      return chars[1:1]
+   elseif G.n == 2
+      return chars[1:2]
+   elseif G.n == 3
+      return [chars[1:2]..., chars[4]]
+   elseif G.n == 4
+      return chars[1:5]
+   else
+      throw("Characters for $G unknown!")
+   end
+end
+
+###############################################################################
+#
+#  Character of DirectProducts
+#
+###############################################################################
+
+function epsilon(i, g::DirectProducts.DirectProductGroupElem)
+    return reduce(*, 1, ((-1)^isone(g.elts[j]) for j in 1:i))
+end
+
+###############################################################################
+#
+#  Projections
+#
+###############################################################################
+
+function central_projection(RG::GroupRing, char::Function, T::Type=Rational{Int})
+    result = RG(T)
+    for g in RG.basis
+        result[g] = char(g)
+    end
+    return convert(T, char(RG.group())//Int(order(RG.group))*result)
+end
+
+function rankOne_projections(G::PermutationGroup, T::Type=Rational{Int})
+   RG = GroupRing(G)
+   projections = [central_projection(RG, χ, T) for χ in chars(G)]
+
+   if G.n == 1 || G.n == 2
+      return  projections
+   elseif G.n == 3
+      rankone_projs = [
+         projections[1],
+         projections[2],
+         1//2*(one(RG) - RG(RG.group([2,1,3])))*projections[3]
+         ]
+      return rankone_projs
+   elseif G.n == 4
+      rankone_projs = [
+         projections[1],
+         projections[2],
+         1//2*(one(RG) - RG(RG.group([2,1,3,4])))*projections[3],
+         1//2*(one(RG) - RG(RG.group([2,1,3,4])))*projections[4],
+         1//2*(one(RG) + RG(RG.group([2,1,3,4])))*projections[5]]
+      return rankone_projs
+   else
+      throw("Rank-one projections for $G unknown!")
+   end
+end
+
+function rankOne_projections(BN::WreathProducts.WreathProduct, T::Type=Rational{Int})
+
+   N = BN.P.n
+    # projections as elements of the group rings RSₙ
+   SNprojs_nc = [rankOne_projections(PermutationGroup(i), T) for i in 1:N]
+
+   # embedding into group ring of BN
+   RBN = GroupRing(BN)
+   RFFFF_projs = [central_projection(GroupRing(BN.N), g->epsilon(i,g), T)
+        for i in 0:BN.P.n]
+   Qs = [RBN(q, g -> BN(g)) for q in RFFFF_projs]
+
+   function incl(k::Int, g::perm, WP::WreathProduct=BN)
+      @assert length(g.d) + k <= WP.P.n
+      arr = [1:k; g.d .+ k; (length(g.d)+k+1):WP.P.n]
+      return WP(WP.P(arr))
+   end
+
+    all_projs=[Qs[1]*RBN(p, g-> incl(0,g)) for p in SNprojs_nc[N]]
+
+   for i in 1:N-1
+        Sk_first = [RBN(p, g->incl(0,g)) for p in SNprojs_nc[i]]
+        Sk_last  = [RBN(p, g->incl(i,g)) for p in SNprojs_nc[N-i]]
+        append!(all_projs, [Qs[i+1]*p1*p2
+                for (p1,p2) in Base.product(Sk_first,Sk_last)])
+   end
+
+   append!(all_projs, [Qs[N+1]*RBN(p, g-> incl(0,g)) for p in SNprojs_nc[N]])
+
+   return all_projs
+end