X-Git-Url: http://gitweb.michael.orlitzky.com/?a=blobdiff_plain;f=mjo%2Feja%2Feja_algebra.py;h=5deb5c9488431b56678b7b2346eba5681955f92d;hb=e3430c0ab1408e6523303d28944338253d005b61;hp=83ec50e5a215417811fe09d72c61251081772160;hpb=e4d568e25c62d79a2dbe34b81ee4dc21edf09316;p=sage.d.git diff --git a/mjo/eja/eja_algebra.py b/mjo/eja/eja_algebra.py index 83ec50e..5deb5c9 100644 --- a/mjo/eja/eja_algebra.py +++ b/mjo/eja/eja_algebra.py @@ -1721,9 +1721,10 @@ class ComplexMatrixEJA(MatrixEJA): blocks = [] for z in M.list(): - a = z.list()[0] # real part, I guess - b = z.list()[1] # imag part, I guess - blocks.append(matrix(field, 2, [[a,b],[-b,a]])) + a = z.real() + b = z.imag() + blocks.append(matrix(field, 2, [ [ a, b], + [-b, a] ])) return matrix.block(field, n, blocks) @@ -1877,7 +1878,6 @@ class ComplexHermitianEJA(ConcreteEJA, ComplexMatrixEJA): sage: set_random_seed() sage: n = ZZ.random_element(1,5) - sage: field = QuadraticField(2, 'sqrt2') sage: B = ComplexHermitianEJA._denormalized_basis(n) sage: all( M.is_symmetric() for M in B) True @@ -1895,18 +1895,27 @@ class ComplexHermitianEJA(ConcreteEJA, ComplexMatrixEJA): # * The diagonal will (as a result) be real. # S = [] + Eij = matrix.zero(F,n) for i in range(n): for j in range(i+1): - Eij = matrix(F, n, lambda k,l: k==i and l==j) + # "build" E_ij + Eij[i,j] = 1 if i == j: Sij = cls.real_embed(Eij) S.append(Sij) else: # The second one has a minus because it's conjugated. - Sij_real = cls.real_embed(Eij + Eij.transpose()) + Eij[j,i] = 1 # Eij = Eij + Eij.transpose() + Sij_real = cls.real_embed(Eij) S.append(Sij_real) - Sij_imag = cls.real_embed(I*Eij - I*Eij.transpose()) + # Eij = I*Eij - I*Eij.transpose() + Eij[i,j] = I + Eij[j,i] = -I + Sij_imag = cls.real_embed(Eij) S.append(Sij_imag) + Eij[j,i] = 0 + # "erase" E_ij + Eij[i,j] = 0 # Since we embedded these, we can drop back to the "field" that we # started with instead of the complex extension "F". @@ -2162,23 +2171,39 @@ class QuaternionHermitianEJA(ConcreteEJA, QuaternionMatrixEJA): # * The diagonal will (as a result) be real. # S = [] + Eij = matrix.zero(Q,n) for i in range(n): for j in range(i+1): - Eij = matrix(Q, n, lambda k,l: k==i and l==j) + # "build" E_ij + Eij[i,j] = 1 if i == j: Sij = cls.real_embed(Eij) S.append(Sij) else: # The second, third, and fourth ones have a minus # because they're conjugated. - Sij_real = cls.real_embed(Eij + Eij.transpose()) + # Eij = Eij + Eij.transpose() + Eij[j,i] = 1 + Sij_real = cls.real_embed(Eij) S.append(Sij_real) - Sij_I = cls.real_embed(I*Eij - I*Eij.transpose()) + # Eij = I*(Eij - Eij.transpose()) + Eij[i,j] = I + Eij[j,i] = -I + Sij_I = cls.real_embed(Eij) S.append(Sij_I) - Sij_J = cls.real_embed(J*Eij - J*Eij.transpose()) + # Eij = J*(Eij - Eij.transpose()) + Eij[i,j] = J + Eij[j,i] = -J + Sij_J = cls.real_embed(Eij) S.append(Sij_J) - Sij_K = cls.real_embed(K*Eij - K*Eij.transpose()) + # Eij = K*(Eij - Eij.transpose()) + Eij[i,j] = K + Eij[j,i] = -K + Sij_K = cls.real_embed(Eij) S.append(Sij_K) + Eij[j,i] = 0 + # "erase" E_ij + Eij[i,j] = 0 # Since we embedded these, we can drop back to the "field" that we # started with instead of the quaternion algebra "Q".