from sage.categories.magmatic_algebras import MagmaticAlgebras
from sage.combinat.free_module import CombinatorialFreeModule
from sage.matrix.constructor import matrix
+from sage.matrix.matrix_space import MatrixSpace
from sage.misc.cachefunc import cached_method
from sage.misc.prandom import choice
from sage.misc.table import table
-from sage.modules.free_module import VectorSpace
+from sage.modules.free_module import FreeModule, VectorSpace
from sage.rings.integer_ring import ZZ
-from sage.rings.number_field.number_field import QuadraticField
+from sage.rings.number_field.number_field import NumberField
from sage.rings.polynomial.polynomial_ring_constructor import PolynomialRing
from sage.rings.rational_field import QQ
+from sage.rings.real_lazy import CLF, RLF
from sage.structure.element import is_Matrix
from mjo.eja.eja_element import FiniteDimensionalEuclideanJordanAlgebraElement
return self.zero()
natural_basis = self.natural_basis()
- if elt not in natural_basis[0].matrix_space():
+ basis_space = natural_basis[0].matrix_space()
+ if elt not in basis_space:
raise ValueError("not a naturally-represented algebra element")
- # Thanks for nothing! Matrix spaces aren't vector
- # spaces in Sage, so we have to figure out its
- # natural-basis coordinates ourselves.
- V = VectorSpace(elt.base_ring(), elt.nrows()*elt.ncols())
+ # Thanks for nothing! Matrix spaces aren't vector spaces in
+ # Sage, so we have to figure out its natural-basis coordinates
+ # ourselves. We use the basis space's ring instead of the
+ # element's ring because the basis space might be an algebraic
+ # closure whereas the base ring of the 3-by-3 identity matrix
+ # could be QQ instead of QQbar.
+ V = VectorSpace(basis_space.base_ring(), elt.nrows()*elt.ncols())
W = V.span_of_basis( _mat2vec(s) for s in natural_basis )
coords = W.coordinate_vector(_mat2vec(elt))
return self.from_vector(coords)
Ensure that it says what we think it says::
sage: JordanSpinEJA(2, field=QQ)
- Euclidean Jordan algebra of degree 2 over Rational Field
+ Euclidean Jordan algebra of dimension 2 over Rational Field
sage: JordanSpinEJA(3, field=RDF)
- Euclidean Jordan algebra of degree 3 over Real Double Field
+ Euclidean Jordan algebra of dimension 3 over Real Double Field
"""
- # TODO: change this to say "dimension" and fix all the tests.
- fmt = "Euclidean Jordan algebra of degree {} over {}"
+ fmt = "Euclidean Jordan algebra of dimension {} over {}"
return fmt.format(self.dimension(), self.base_ring())
def product_on_basis(self, i, j):
determinant).
"""
z = self._a_regular_element()
- V = self.vector_space()
- V1 = V.span_of_basis( (z**k).to_vector() for k in range(self.rank()) )
+ # Don't use the parent vector space directly here in case this
+ # happens to be a subalgebra. In that case, we would be e.g.
+ # two-dimensional but span_of_basis() would expect three
+ # coordinates.
+ V = VectorSpace(self.base_ring(), self.vector_space().dimension())
+ basis = [ (z**k).to_vector() for k in range(self.rank()) ]
+ V1 = V.span_of_basis( basis )
b = (V1.basis() + V1.complement().basis())
return V.span_of_basis(b)
r = self.rank()
n = self.dimension()
- # Construct a new algebra over a multivariate polynomial ring...
+ # Turn my vector space into a module so that "vectors" can
+ # have multivatiate polynomial entries.
names = tuple('X' + str(i) for i in range(1,n+1))
R = PolynomialRing(self.base_ring(), names)
- # Hack around the fact that our multiplication table is in terms of
- # algebra elements but the constructor wants it in terms of vectors.
- vmt = [ tuple(map(lambda x: x.to_vector(), ls))
- for ls in self._multiplication_table ]
- J = FiniteDimensionalEuclideanJordanAlgebra(R, tuple(vmt), r)
- idmat = matrix.identity(J.base_ring(), n)
+ # Using change_ring() on the parent's vector space doesn't work
+ # here because, in a subalgebra, that vector space has a basis
+ # and change_ring() tries to bring the basis along with it. And
+ # that doesn't work unless the new ring is a PID, which it usually
+ # won't be.
+ V = FreeModule(R,n)
+
+ # Now let x = (X1,X2,...,Xn) be the vector whose entries are
+ # indeterminates...
+ x = V(names)
+
+ # And figure out the "left multiplication by x" matrix in
+ # that setting.
+ lmbx_cols = []
+ monomial_matrices = [ self.monomial(i).operator().matrix()
+ for i in range(n) ] # don't recompute these!
+ for k in range(n):
+ ek = self.monomial(k).to_vector()
+ lmbx_cols.append(
+ sum( x[i]*(monomial_matrices[i]*ek)
+ for i in range(n) ) )
+ Lx = matrix.column(R, lmbx_cols)
+
+ # Now we can compute powers of x "symbolically"
+ x_powers = [self.one().to_vector(), x]
+ for d in range(2, r+1):
+ x_powers.append( Lx*(x_powers[-1]) )
+
+ idmat = matrix.identity(R, n)
W = self._charpoly_basis_space()
W = W.change_ring(R.fraction_field())
# We want the middle equivalent thing in our matrix, but use
# the first equivalent thing instead so that we can pass in
# standard coordinates.
- x = J.from_vector(W(R.gens()))
-
- # Handle the zeroth power separately, because computing
- # the unit element in J is mathematically suspect.
- x0 = W.coordinate_vector(self.one().to_vector())
- l1 = [ x0.column() ]
- l1 += [ W.coordinate_vector((x**k).to_vector()).column()
- for k in range(1,r) ]
- l2 = [idmat.column(k-1).column() for k in range(r+1, n+1)]
- A_of_x = matrix.block(R, 1, n, (l1 + l2))
- xr = W.coordinate_vector((x**r).to_vector())
- return (A_of_x, x, xr, A_of_x.det())
+ x_powers = [ W.coordinate_vector(xp) for xp in x_powers ]
+ l2 = [idmat.column(k-1) for k in range(r+1, n+1)]
+ A_of_x = matrix.column(R, n, (x_powers[:r] + l2))
+ return (A_of_x, x, x_powers[r], A_of_x.det())
@cached_method
return x.trace_inner_product(y)
+ def is_trivial(self):
+ """
+ Return whether or not this algebra is trivial.
+
+ A trivial algebra contains only the zero element.
+
+ SETUP::
+
+ sage: from mjo.eja.eja_algebra import ComplexHermitianEJA
+
+ EXAMPLES::
+
+ sage: J = ComplexHermitianEJA(3)
+ sage: J.is_trivial()
+ False
+ sage: A = J.zero().subalgebra_generated_by()
+ sage: A.is_trivial()
+ True
+
+ """
+ return self.dimension() == 0
+
+
def multiplication_table(self):
"""
Return a visual representation of this algebra's multiplication
Finite family {0: e0, 1: e1, 2: e2}
sage: J.natural_basis()
(
- [1 0] [0 1] [0 0]
- [0 0], [1 0], [0 1]
+ [1 0] [ 0 1/2*sqrt2] [0 0]
+ [0 0], [1/2*sqrt2 0], [0 1]
)
::
"""
if self._natural_basis is None:
- return tuple( b.to_vector().column() for b in self.basis() )
+ M = self.natural_basis_space()
+ return tuple( M(b.to_vector()) for b in self.basis() )
else:
return self._natural_basis
+ def natural_basis_space(self):
+ """
+ Return the matrix space in which this algebra's natural basis
+ elements live.
+ """
+ if self._natural_basis is None or len(self._natural_basis) == 0:
+ return MatrixSpace(self.base_ring(), self.dimension(), 1)
+ else:
+ return self._natural_basis[0].matrix_space()
+
+
@cached_method
def one(self):
"""
return self.linear_combination(zip(self.gens(), coeffs))
+ def random_element(self):
+ # Temporary workaround for https://trac.sagemath.org/ticket/28327
+ if self.is_trivial():
+ return self.zero()
+ else:
+ s = super(FiniteDimensionalEuclideanJordanAlgebra, self)
+ return s.random_element()
+
+
def rank(self):
"""
Return the rank of this EJA.
sage: J = RealSymmetricEJA(2)
sage: J.vector_space()
- Vector space of dimension 3 over Rational Field
+ Vector space of dimension 3 over...
"""
return self.zero().to_vector().parent().ambient_vector_space()
sage: e2*e2
e2
+ TESTS:
+
+ We can change the generator prefix::
+
+ sage: RealCartesianProductEJA(3, prefix='r').gens()
+ (r0, r1, r2)
+
+ Our inner product satisfies the Jordan axiom::
+
+ sage: set_random_seed()
+ sage: n = ZZ.random_element(1,5)
+ sage: J = RealCartesianProductEJA(n)
+ sage: x = J.random_element()
+ sage: y = J.random_element()
+ sage: z = J.random_element()
+ sage: (x*y).inner_product(z) == y.inner_product(x*z)
+ True
+
"""
- def __init__(self, n, field=QQ):
+ def __init__(self, n, field=QQ, **kwargs):
V = VectorSpace(field, n)
mult_table = [ [ V.gen(i)*(i == j) for j in range(n) ]
for i in range(n) ]
fdeja = super(RealCartesianProductEJA, self)
- return fdeja.__init__(field, mult_table, rank=n)
+ return fdeja.__init__(field, mult_table, rank=n, **kwargs)
def inner_product(self, x, y):
return _usual_ip(x,y)
TESTS::
sage: random_eja()
- Euclidean Jordan algebra of degree...
+ Euclidean Jordan algebra of dimension...
"""
-def _real_symmetric_basis(n, field=QQ):
+def _real_symmetric_basis(n, field):
"""
Return a basis for the space of real symmetric n-by-n matrices.
+
+ SETUP::
+
+ sage: from mjo.eja.eja_algebra import _real_symmetric_basis
+
+ TESTS::
+
+ sage: set_random_seed()
+ sage: n = ZZ.random_element(1,5)
+ sage: B = _real_symmetric_basis(n, QQbar)
+ sage: all( M.is_symmetric() for M in B)
+ True
+
"""
# The basis of symmetric matrices, as matrices, in their R^(n-by-n)
# coordinates.
if i == j:
Sij = Eij
else:
- # Beware, orthogonal but not normalized!
Sij = Eij + Eij.transpose()
+ # Now normalize it.
+ Sij = Sij / _real_symmetric_matrix_ip(Sij,Sij).sqrt()
S.append(Sij)
return tuple(S)
-def _complex_hermitian_basis(n, field=QQ):
+def _complex_hermitian_basis(n, field):
"""
Returns a basis for the space of complex Hermitian n-by-n matrices.
+ Why do we embed these? Basically, because all of numerical linear
+ algebra assumes that you're working with vectors consisting of `n`
+ entries from a field and scalars from the same field. There's no way
+ to tell SageMath that (for example) the vectors contain complex
+ numbers, while the scalar field is real.
+
SETUP::
sage: from mjo.eja.eja_algebra import _complex_hermitian_basis
sage: set_random_seed()
sage: n = ZZ.random_element(1,5)
- sage: all( M.is_symmetric() for M in _complex_hermitian_basis(n) )
+ sage: R = PolynomialRing(QQ, 'z')
+ sage: z = R.gen()
+ sage: field = NumberField(z**2 - 2, 'sqrt2', embedding=RLF(2).sqrt())
+ sage: B = _complex_hermitian_basis(n, field)
+ sage: all( M.is_symmetric() for M in B)
True
"""
- F = QuadraticField(-1, 'I')
+ R = PolynomialRing(field, 'z')
+ z = R.gen()
+ F = NumberField(z**2 + 1, 'I', embedding=CLF(-1).sqrt())
I = F.gen()
# This is like the symmetric case, but we need to be careful:
S = []
for i in xrange(n):
for j in xrange(i+1):
- Eij = matrix(field, n, lambda k,l: k==i and l==j)
+ Eij = matrix(F, n, lambda k,l: k==i and l==j)
if i == j:
Sij = _embed_complex_matrix(Eij)
S.append(Sij)
S.append(Sij_real)
Sij_imag = _embed_complex_matrix(I*Eij - I*Eij.transpose())
S.append(Sij_imag)
- return tuple(S)
+ # Normalize these with our inner product before handing them back.
+ # And since we embedded them, we can drop back to the "field" that
+ # we started with instead of the complex extension "F".
+ return tuple( (s / _complex_hermitian_matrix_ip(s,s).sqrt()).change_ring(field)
+ for s in S )
-def _quaternion_hermitian_basis(n, field=QQ):
+
+
+def _quaternion_hermitian_basis(n, field):
"""
Returns a basis for the space of quaternion Hermitian n-by-n matrices.
+ Why do we embed these? Basically, because all of numerical linear
+ algebra assumes that you're working with vectors consisting of `n`
+ entries from a field and scalars from the same field. There's no way
+ to tell SageMath that (for example) the vectors contain complex
+ numbers, while the scalar field is real.
+
SETUP::
sage: from mjo.eja.eja_algebra import _quaternion_hermitian_basis
sage: set_random_seed()
sage: n = ZZ.random_element(1,5)
- sage: all( M.is_symmetric() for M in _quaternion_hermitian_basis(n) )
+ sage: B = _quaternion_hermitian_basis(n, QQ)
+ sage: all( M.is_symmetric() for M in B )
True
"""
EXAMPLES::
- sage: F = QuadraticField(-1,'i')
+ sage: R = PolynomialRing(QQ, 'z')
+ sage: z = R.gen()
+ sage: F = NumberField(z**2 + 1, 'i', embedding=CLF(-1).sqrt())
sage: x1 = F(4 - 2*i)
sage: x2 = F(1 + 2*i)
sage: x3 = F(-i)
sage: set_random_seed()
sage: n = ZZ.random_element(5)
- sage: F = QuadraticField(-1, 'i')
+ sage: R = PolynomialRing(QQ, 'z')
+ sage: z = R.gen()
+ sage: F = NumberField(z**2 + 1, 'i', embedding=CLF(-1).sqrt())
sage: X = random_matrix(F, n)
sage: Y = random_matrix(F, n)
sage: actual = _embed_complex_matrix(X) * _embed_complex_matrix(Y)
field = M.base_ring()
blocks = []
for z in M.list():
- a = z.real()
- b = z.imag()
+ a = z.vector()[0] # real part, I guess
+ b = z.vector()[1] # imag part, I guess
blocks.append(matrix(field, 2, [[a,b],[-b,a]]))
# We can drop the imaginaries here.
Unembedding is the inverse of embedding::
sage: set_random_seed()
- sage: F = QuadraticField(-1, 'i')
+ sage: R = PolynomialRing(QQ, 'z')
+ sage: z = R.gen()
+ sage: F = NumberField(z**2 + 1, 'i', embedding=CLF(-1).sqrt())
sage: M = random_matrix(F, 3)
sage: _unembed_complex_matrix(_embed_complex_matrix(M)) == M
True
if not n.mod(2).is_zero():
raise ValueError("the matrix 'M' must be a complex embedding")
- F = QuadraticField(-1, 'i')
+ field = M.base_ring() # This should already have sqrt2
+ R = PolynomialRing(field, 'z')
+ z = R.gen()
+ F = NumberField(z**2 + 1,'i', embedding=CLF(-1).sqrt())
i = F.gen()
# Go top-left to bottom-right (reading order), converting every
if M.ncols() != n:
raise ValueError("the matrix 'M' must be square")
- F = QuadraticField(-1, 'i')
+ R = PolynomialRing(QQ, 'z')
+ z = R.gen()
+ F = NumberField(z**2 + 1, 'i', embedding=CLF(-1).sqrt())
i = F.gen()
blocks = []
Y_mat = Y.natural_representation()
return (X_mat*Y_mat).trace()
+def _real_symmetric_matrix_ip(X,Y):
+ return (X*Y).trace()
+
+def _complex_hermitian_matrix_ip(X,Y):
+ # This takes EMBEDDED matrices.
+ Xu = _unembed_complex_matrix(X)
+ Yu = _unembed_complex_matrix(Y)
+ # The trace need not be real; consider Xu = (i*I) and Yu = I.
+ return ((Xu*Yu).trace()).vector()[0] # real part, I guess
class RealSymmetricEJA(FiniteDimensionalEuclideanJordanAlgebra):
"""
sage: e0*e0
e0
sage: e1*e1
- e0 + e2
+ 1/2*e0 + 1/2*e2
sage: e2*e2
e2
sage: J(expected) == x*y
True
+ We can change the generator prefix::
+
+ sage: RealSymmetricEJA(3, prefix='q').gens()
+ (q0, q1, q2, q3, q4, q5)
+
+ Our inner product satisfies the Jordan axiom::
+
+ sage: set_random_seed()
+ sage: n = ZZ.random_element(1,5)
+ sage: J = RealSymmetricEJA(n)
+ sage: x = J.random_element()
+ sage: y = J.random_element()
+ sage: z = J.random_element()
+ sage: (x*y).inner_product(z) == y.inner_product(x*z)
+ True
+
+ Our basis is normalized with respect to the natural inner product::
+
+ sage: set_random_seed()
+ sage: n = ZZ.random_element(1,5)
+ sage: J = RealSymmetricEJA(n)
+ sage: all( b.norm() == 1 for b in J.gens() )
+ True
+
+ Left-multiplication operators are symmetric because they satisfy
+ the Jordan axiom::
+
+ sage: set_random_seed()
+ sage: n = ZZ.random_element(1,5)
+ sage: x = RealSymmetricEJA(n).random_element()
+ sage: x.operator().matrix().is_symmetric()
+ True
+
"""
- def __init__(self, n, field=QQ):
- S = _real_symmetric_basis(n, field=field)
+ def __init__(self, n, field=QQ, **kwargs):
+ if n > 1:
+ # We'll need sqrt(2) to normalize the basis, and this
+ # winds up in the multiplication table, so the whole
+ # algebra needs to be over the field extension.
+ R = PolynomialRing(field, 'z')
+ z = R.gen()
+ p = z**2 - 2
+ if p.is_irreducible():
+ field = NumberField(p, 'sqrt2', embedding=RLF(2).sqrt())
+
+ S = _real_symmetric_basis(n, field)
Qs = _multiplication_table_from_matrix_basis(S)
fdeja = super(RealSymmetricEJA, self)
return fdeja.__init__(field,
Qs,
rank=n,
- natural_basis=S)
+ natural_basis=S,
+ **kwargs)
def inner_product(self, x, y):
- return _matrix_ip(x,y)
+ X = x.natural_representation()
+ Y = y.natural_representation()
+ return _real_symmetric_matrix_ip(X,Y)
class ComplexHermitianEJA(FiniteDimensionalEuclideanJordanAlgebra):
sage: J(expected) == x*y
True
+ We can change the generator prefix::
+
+ sage: ComplexHermitianEJA(2, prefix='z').gens()
+ (z0, z1, z2, z3)
+
+ Our inner product satisfies the Jordan axiom::
+
+ sage: set_random_seed()
+ sage: n = ZZ.random_element(1,5)
+ sage: J = ComplexHermitianEJA(n)
+ sage: x = J.random_element()
+ sage: y = J.random_element()
+ sage: z = J.random_element()
+ sage: (x*y).inner_product(z) == y.inner_product(x*z)
+ True
+
+ Our basis is normalized with respect to the natural inner product::
+
+ sage: set_random_seed()
+ sage: n = ZZ.random_element(1,4)
+ sage: J = ComplexHermitianEJA(n)
+ sage: all( b.norm() == 1 for b in J.gens() )
+ True
+
+ Left-multiplication operators are symmetric because they satisfy
+ the Jordan axiom::
+
+ sage: set_random_seed()
+ sage: n = ZZ.random_element(1,5)
+ sage: x = ComplexHermitianEJA(n).random_element()
+ sage: x.operator().matrix().is_symmetric()
+ True
+
"""
- def __init__(self, n, field=QQ):
- S = _complex_hermitian_basis(n)
+ def __init__(self, n, field=QQ, **kwargs):
+ if n > 1:
+ # We'll need sqrt(2) to normalize the basis, and this
+ # winds up in the multiplication table, so the whole
+ # algebra needs to be over the field extension.
+ R = PolynomialRing(field, 'z')
+ z = R.gen()
+ p = z**2 - 2
+ if p.is_irreducible():
+ field = NumberField(p, 'sqrt2', embedding=RLF(2).sqrt())
+
+ S = _complex_hermitian_basis(n, field)
Qs = _multiplication_table_from_matrix_basis(S)
fdeja = super(ComplexHermitianEJA, self)
return fdeja.__init__(field,
Qs,
rank=n,
- natural_basis=S)
+ natural_basis=S,
+ **kwargs)
def inner_product(self, x, y):
- # Since a+bi on the diagonal is represented as
- #
- # a + bi = [ a b ]
- # [ -b a ],
- #
- # we'll double-count the "a" entries if we take the trace of
- # the embedding.
- return _matrix_ip(x,y)/2
+ X = x.natural_representation()
+ Y = y.natural_representation()
+ return _complex_hermitian_matrix_ip(X,Y)
class QuaternionHermitianEJA(FiniteDimensionalEuclideanJordanAlgebra):
sage: J(expected) == x*y
True
+ We can change the generator prefix::
+
+ sage: QuaternionHermitianEJA(2, prefix='a').gens()
+ (a0, a1, a2, a3, a4, a5)
+
+ Our inner product satisfies the Jordan axiom::
+
+ sage: set_random_seed()
+ sage: n = ZZ.random_element(1,5)
+ sage: J = QuaternionHermitianEJA(n)
+ sage: x = J.random_element()
+ sage: y = J.random_element()
+ sage: z = J.random_element()
+ sage: (x*y).inner_product(z) == y.inner_product(x*z)
+ True
+
"""
- def __init__(self, n, field=QQ):
- S = _quaternion_hermitian_basis(n)
+ def __init__(self, n, field=QQ, **kwargs):
+ S = _quaternion_hermitian_basis(n, field)
Qs = _multiplication_table_from_matrix_basis(S)
fdeja = super(QuaternionHermitianEJA, self)
return fdeja.__init__(field,
Qs,
rank=n,
- natural_basis=S)
+ natural_basis=S,
+ **kwargs)
def inner_product(self, x, y):
# Since a+bi+cj+dk on the diagonal is represented as
sage: e2*e3
0
+ We can change the generator prefix::
+
+ sage: JordanSpinEJA(2, prefix='B').gens()
+ (B0, B1)
+
+ Our inner product satisfies the Jordan axiom::
+
+ sage: set_random_seed()
+ sage: n = ZZ.random_element(1,5)
+ sage: J = JordanSpinEJA(n)
+ sage: x = J.random_element()
+ sage: y = J.random_element()
+ sage: z = J.random_element()
+ sage: (x*y).inner_product(z) == y.inner_product(x*z)
+ True
+
"""
- def __init__(self, n, field=QQ):
+ def __init__(self, n, field=QQ, **kwargs):
V = VectorSpace(field, n)
mult_table = [[V.zero() for j in range(n)] for i in range(n)]
for i in range(n):
# one-dimensional ambient space (because the rank is bounded by
# the ambient dimension).
fdeja = super(JordanSpinEJA, self)
- return fdeja.__init__(field, mult_table, rank=min(n,2))
+ return fdeja.__init__(field, mult_table, rank=min(n,2), **kwargs)
def inner_product(self, x, y):
return _usual_ip(x,y)