QuadraticField)
from mjo.eja.eja_element import FiniteDimensionalEJAElement
from mjo.eja.eja_operator import FiniteDimensionalEJAOperator
-from mjo.eja.eja_utils import _all2list, _mat2vec
+from mjo.eja.eja_utils import _all2list
+
+def EuclideanJordanAlgebras(field):
+ r"""
+ The category of Euclidean Jordan algebras over ``field``, which
+ must be a subfield of the real numbers. For now this is just a
+ convenient wrapper around all of the other category axioms that
+ apply to all EJAs.
+ """
+ category = MagmaticAlgebras(field).FiniteDimensional()
+ category = category.WithBasis().Unital().Commutative()
+ return category
class FiniteDimensionalEJA(CombinatorialFreeModule):
r"""
"""
Element = FiniteDimensionalEJAElement
+ @staticmethod
+ def _check_input_field(field):
+ if not field.is_subring(RR):
+ # Note: this does return true for the real algebraic
+ # field, the rationals, and any quadratic field where
+ # we've specified a real embedding.
+ raise ValueError("scalar field is not real")
+
+ @staticmethod
+ def _check_input_axioms(basis, jordan_product, inner_product):
+ if not all( jordan_product(bi,bj) == jordan_product(bj,bi)
+ for bi in basis
+ for bj in basis ):
+ raise ValueError("Jordan product is not commutative")
+
+ if not all( inner_product(bi,bj) == inner_product(bj,bi)
+ for bi in basis
+ for bj in basis ):
+ raise ValueError("inner-product is not commutative")
+
def __init__(self,
basis,
jordan_product,
matrix_space=None,
orthonormalize=True,
associative=None,
- cartesian_product=False,
check_field=True,
check_axioms=True,
prefix="b"):
n = len(basis)
if check_field:
- if not field.is_subring(RR):
- # Note: this does return true for the real algebraic
- # field, the rationals, and any quadratic field where
- # we've specified a real embedding.
- raise ValueError("scalar field is not real")
+ self._check_input_field(field)
if check_axioms:
# Check commutativity of the Jordan and inner-products.
# This has to be done before we build the multiplication
# and inner-product tables/matrices, because we take
# advantage of symmetry in the process.
- if not all( jordan_product(bi,bj) == jordan_product(bj,bi)
- for bi in basis
- for bj in basis ):
- raise ValueError("Jordan product is not commutative")
-
- if not all( inner_product(bi,bj) == inner_product(bj,bi)
- for bi in basis
- for bj in basis ):
- raise ValueError("inner-product is not commutative")
-
-
- category = MagmaticAlgebras(field).FiniteDimensional()
- category = category.WithBasis().Unital().Commutative()
+ self._check_input_axioms(basis, jordan_product, inner_product)
if n <= 1:
# All zero- and one-dimensional algebras are just the real
for bj in basis
for bk in basis)
+ category = EuclideanJordanAlgebras(field)
+
if associative:
# Element subalgebras can take advantage of this.
category = category.Associative()
- if cartesian_product:
- # Use join() here because otherwise we only get the
- # "Cartesian product of..." and not the things themselves.
- category = category.join([category,
- category.CartesianProducts()])
# Call the superclass constructor so that we can use its from_vector()
# method to build our multiplication table.
# Now we actually compute the multiplication and inner-product
# tables/matrices using the possibly-orthonormalized basis.
self._inner_product_matrix = matrix.identity(field, n)
- self._multiplication_table = [ [0 for j in range(i+1)]
+ zed = self.zero()
+ self._multiplication_table = [ [zed for j in range(i+1)]
for i in range(n) ]
# Note: the Jordan and inner-products are defined in terms
if elt.parent().superalgebra() == self:
return elt.superalgebra_element()
- try:
- # Try to convert a vector into a column-matrix...
+ if hasattr(elt, 'sparse_vector'):
+ # Convert a vector into a column-matrix. We check for
+ # "sparse_vector" and not "column" because matrices also
+ # have a "column" method.
elt = elt.column()
- except (AttributeError, TypeError):
- # and ignore failure, because we weren't really expecting
- # a vector as an argument anyway.
- pass
if elt not in self.matrix_space():
raise ValueError(msg)
#
# Of course, matrices aren't vectors in sage, so we have to
# appeal to the "long vectors" isometry.
- oper_vecs = [ _mat2vec(g.operator().matrix()) for g in self.gens() ]
+
+ V = VectorSpace(self.base_ring(), self.dimension()**2)
+ oper_vecs = [ V(g.operator().matrix().list()) for g in self.gens() ]
# Now we use basic linear algebra to find the coefficients,
# of the matrices-as-vectors-linear-combination, which should
# We used the isometry on the left-hand side already, but we
# still need to do it for the right-hand side. Recall that we
# wanted something that summed to the identity matrix.
- b = _mat2vec( matrix.identity(self.base_ring(), self.dimension()) )
+ b = V( matrix.identity(self.base_ring(), self.dimension()).list() )
# Now if there's an identity element in the algebra, this
# should work. We solve on the left to avoid having to
# corresponding to trivial spaces (e.g. it returns only the
# eigenspace corresponding to lambda=1 if you take the
# decomposition relative to the identity element).
- trivial = self.subalgebra(())
+ trivial = self.subalgebra((), check_axioms=False)
J0 = trivial # eigenvalue zero
J5 = VectorSpace(self.base_ring(), 0) # eigenvalue one-half
J1 = trivial # eigenvalue one
check_field=False,
check_axioms=False)
+ def rational_algebra(self):
+ # Using None as a flag here (rather than just assigning "self"
+ # to self._rational_algebra by default) feels a little bit
+ # more sane to me in a garbage-collected environment.
+ if self._rational_algebra is None:
+ return self
+ else:
+ return self._rational_algebra
+
@cached_method
def _charpoly_coefficients(self):
r"""
Algebraic Real Field
"""
- if self._rational_algebra is None:
- # There's no need to construct *another* algebra over the
- # rationals if this one is already over the
- # rationals. Likewise, if we never orthonormalized our
- # basis, we might as well just use the given one.
+ if self.rational_algebra() is self:
+ # Bypass the hijinks if they won't benefit us.
return super()._charpoly_coefficients()
# Do the computation over the rationals. The answer will be
# the same, because all we've done is a change of basis.
# Then, change back from QQ to our real base ring
a = ( a_i.change_ring(self.base_ring())
- for a_i in self._rational_algebra._charpoly_coefficients() )
+ for a_i in self.rational_algebra()._charpoly_coefficients() )
# Otherwise, convert the coordinate variables back to the
# deorthonormalized ones.
# if the user passes check_axioms=True.
if "check_axioms" not in kwargs: kwargs["check_axioms"] = False
-
super().__init__(self._denormalized_basis(matrix_space),
self.jordan_product,
self.trace_inner_product,
return cls(n, **kwargs)
def __init__(self, n, field=AA, **kwargs):
- # We know this is a valid EJA, but will double-check
- # if the user passes check_axioms=True.
- if "check_axioms" not in kwargs: kwargs["check_axioms"] = False
-
A = MatrixSpace(field, n)
super().__init__(A, **kwargs)
from mjo.eja.eja_cache import real_symmetric_eja_coeffs
a = real_symmetric_eja_coeffs(self)
if a is not None:
- if self._rational_algebra is None:
- self._charpoly_coefficients.set_cache(a)
- else:
- self._rational_algebra._charpoly_coefficients.set_cache(a)
+ self.rational_algebra()._charpoly_coefficients.set_cache(a)
"""
def __init__(self, n, field=AA, **kwargs):
- # We know this is a valid EJA, but will double-check
- # if the user passes check_axioms=True.
- if "check_axioms" not in kwargs: kwargs["check_axioms"] = False
-
from mjo.hurwitz import ComplexMatrixAlgebra
A = ComplexMatrixAlgebra(n, scalars=field)
super().__init__(A, **kwargs)
from mjo.eja.eja_cache import complex_hermitian_eja_coeffs
a = complex_hermitian_eja_coeffs(self)
if a is not None:
- if self._rational_algebra is None:
- self._charpoly_coefficients.set_cache(a)
- else:
- self._rational_algebra._charpoly_coefficients.set_cache(a)
+ self.rational_algebra()._charpoly_coefficients.set_cache(a)
@staticmethod
def _max_random_instance_size(max_dimension):
"""
def __init__(self, n, field=AA, **kwargs):
- # We know this is a valid EJA, but will double-check
- # if the user passes check_axioms=True.
- if "check_axioms" not in kwargs: kwargs["check_axioms"] = False
-
from mjo.hurwitz import QuaternionMatrixAlgebra
A = QuaternionMatrixAlgebra(n, scalars=field)
super().__init__(A, **kwargs)
from mjo.eja.eja_cache import quaternion_hermitian_eja_coeffs
a = quaternion_hermitian_eja_coeffs(self)
if a is not None:
- if self._rational_algebra is None:
- self._charpoly_coefficients.set_cache(a)
- else:
- self._rational_algebra._charpoly_coefficients.set_cache(a)
+ self.rational_algebra()._charpoly_coefficients.set_cache(a)
from mjo.eja.eja_cache import octonion_hermitian_eja_coeffs
a = octonion_hermitian_eja_coeffs(self)
if a is not None:
- if self._rational_algebra is None:
- self._charpoly_coefficients.set_cache(a)
- else:
- self._rational_algebra._charpoly_coefficients.set_cache(a)
+ self.rational_algebra()._charpoly_coefficients.set_cache(a)
class AlbertEJA(OctonionHermitianEJA):
sage: from mjo.eja.eja_algebra import (random_eja,
....: CartesianProductEJA,
+ ....: ComplexHermitianEJA,
....: HadamardEJA,
....: JordanSpinEJA,
....: RealSymmetricEJA)
| b2 || 0 | 0 | b2 |
+----++----+----+----+
+ The "matrix space" of a Cartesian product always consists of
+ ordered pairs (or triples, or...) whose components are the
+ matrix spaces of its factors::
+
+ sage: J1 = HadamardEJA(2)
+ sage: J2 = ComplexHermitianEJA(2)
+ sage: J = cartesian_product([J1,J2])
+ sage: J.matrix_space()
+ The Cartesian product of (Full MatrixSpace of 2 by 1 dense
+ matrices over Algebraic Real Field, Module of 2 by 2 matrices
+ with entries in Algebraic Field over the scalar ring Algebraic
+ Real Field)
+ sage: J.one().to_matrix()[0]
+ [1]
+ [1]
+ sage: J.one().to_matrix()[1]
+ +---+---+
+ | 1 | 0 |
+ +---+---+
+ | 0 | 1 |
+ +---+---+
+
TESTS:
All factors must share the same base field::
sage: expected = J.one() # long time
sage: actual == expected # long time
True
-
"""
- Element = FiniteDimensionalEJAElement
-
-
def __init__(self, factors, **kwargs):
m = len(factors)
if m == 0:
if not all( J.base_ring() == field for J in factors ):
raise ValueError("all factors must share the same base field")
+ # Figure out the category to use.
associative = all( f.is_associative() for f in factors )
-
- # Compute my matrix space. This category isn't perfect, but
- # is good enough for what we need to do.
+ category = EuclideanJordanAlgebras(field)
+ if associative: category = category.Associative()
+ category = category.join([category, category.CartesianProducts()])
+
+ # Compute my matrix space. We don't simply use the
+ # ``cartesian_product()`` functor here because it acts
+ # differently on SageMath MatrixSpaces and our custom
+ # MatrixAlgebras, which are CombinatorialFreeModules. We
+ # always want the result to be represented (and indexed) as an
+ # ordered tuple. This category isn't perfect, but is good
+ # enough for what we need to do.
MS_cat = MagmaticAlgebras(field).FiniteDimensional().WithBasis()
MS_cat = MS_cat.Unital().CartesianProducts()
MS_factors = tuple( J.matrix_space() for J in factors )
from sage.sets.cartesian_product import CartesianProduct
- MS = CartesianProduct(MS_factors, MS_cat)
+ self._matrix_space = CartesianProduct(MS_factors, MS_cat)
- basis = []
- zero = MS.zero()
+ self._matrix_basis = []
+ zero = self._matrix_space.zero()
for i in range(m):
for b in factors[i].matrix_basis():
z = list(zero)
z[i] = b
- basis.append(z)
+ self._matrix_basis.append(z)
- basis = tuple( MS(b) for b in basis )
+ self._matrix_basis = tuple( self._matrix_space(b)
+ for b in self._matrix_basis )
+ n = len(self._matrix_basis)
- # Define jordan/inner products that operate on that matrix_basis.
- def jordan_product(x,y):
- return MS(tuple(
- (factors[i](x[i])*factors[i](y[i])).to_matrix()
- for i in range(m)
- ))
-
- def inner_product(x, y):
- return sum(
- factors[i](x[i]).inner_product(factors[i](y[i]))
- for i in range(m)
- )
+ # We already have what we need for the super-superclass constructor.
+ CombinatorialFreeModule.__init__(self,
+ field,
+ range(n),
+ prefix="b",
+ category=category,
+ bracket=False)
- # There's no need to check the field since it already came
- # from an EJA. Likewise the axioms are guaranteed to be
- # satisfied, unless the guy writing this class sucks.
- #
- # If you want the basis to be orthonormalized, orthonormalize
- # the factors.
- FiniteDimensionalEJA.__init__(self,
- basis,
- jordan_product,
- inner_product,
- field=field,
- matrix_space=MS,
- orthonormalize=False,
- associative=associative,
- cartesian_product=True,
- check_field=False,
- check_axioms=False)
+ # Now create the vector space for the algebra, which will have
+ # its own set of non-ambient coordinates (in terms of the
+ # supplied basis).
+ degree = sum( f._matrix_span.ambient_vector_space().degree()
+ for f in factors )
+ V = VectorSpace(field, degree)
+ vector_basis = tuple( V(_all2list(b)) for b in self._matrix_basis )
+
+ # Save the span of our matrix basis (when written out as long
+ # vectors) because otherwise we'll have to reconstruct it
+ # every time we want to coerce a matrix into the algebra.
+ self._matrix_span = V.span_of_basis( vector_basis, check=False)
# Since we don't (re)orthonormalize the basis, the FDEJA
# constructor is going to set self._deortho_matrix to the
# identity matrix. Here we set it to the correct value using
# the deortho matrices from our factors.
- self._deortho_matrix = matrix.block_diagonal( [J._deortho_matrix
- for J in factors] )
+ self._deortho_matrix = matrix.block_diagonal(
+ [J._deortho_matrix for J in factors]
+ )
+
+ self._inner_product_matrix = matrix.block_diagonal(
+ [J._inner_product_matrix for J in factors]
+ )
+ self._inner_product_matrix._cache = {'hermitian': True}
+ self._inner_product_matrix.set_immutable()
+
+ # Building the multiplication table is a bit more tricky
+ # because we have to embed the entries of the factors'
+ # multiplication tables into the product EJA.
+ zed = self.zero()
+ self._multiplication_table = [ [zed for j in range(i+1)]
+ for i in range(n) ]
+
+ # Keep track of an offset that tallies the dimensions of all
+ # previous factors. If the second factor is dim=2 and if the
+ # first one is dim=3, then we want to skip the first 3x3 block
+ # when copying the multiplication table for the second factor.
+ offset = 0
+ for f in range(m):
+ phi_f = self.cartesian_embedding(f)
+ factor_dim = factors[f].dimension()
+ for i in range(factor_dim):
+ for j in range(i+1):
+ f_ij = factors[f]._multiplication_table[i][j]
+ e = phi_f(f_ij)
+ self._multiplication_table[offset+i][offset+j] = e
+ offset += factor_dim
self.rank.set_cache(sum(J.rank() for J in factors))
ones = tuple(J.one().to_matrix() for J in factors)
return cartesian_product.symbol.join("%s" % factor
for factor in self._sets)
- def matrix_space(self):
- r"""
- Return the space that our matrix basis lives in as a Cartesian
- product.
-
- We don't simply use the ``cartesian_product()`` functor here
- because it acts differently on SageMath MatrixSpaces and our
- custom MatrixAlgebras, which are CombinatorialFreeModules. We
- always want the result to be represented (and indexed) as
- an ordered tuple.
-
- SETUP::
-
- sage: from mjo.eja.eja_algebra import (ComplexHermitianEJA,
- ....: HadamardEJA,
- ....: OctonionHermitianEJA,
- ....: RealSymmetricEJA)
-
- EXAMPLES::
-
- sage: J1 = HadamardEJA(1)
- sage: J2 = RealSymmetricEJA(2)
- sage: J = cartesian_product([J1,J2])
- sage: J.matrix_space()
- The Cartesian product of (Full MatrixSpace of 1 by 1 dense
- matrices over Algebraic Real Field, Full MatrixSpace of 2
- by 2 dense matrices over Algebraic Real Field)
-
- ::
-
- sage: J1 = ComplexHermitianEJA(1)
- sage: J2 = ComplexHermitianEJA(1)
- sage: J = cartesian_product([J1,J2])
- sage: J.one().to_matrix()[0]
- +---+
- | 1 |
- +---+
- sage: J.one().to_matrix()[1]
- +---+
- | 1 |
- +---+
-
- ::
-
- sage: J1 = OctonionHermitianEJA(1)
- sage: J2 = OctonionHermitianEJA(1)
- sage: J = cartesian_product([J1,J2])
- sage: J.one().to_matrix()[0]
- +----+
- | e0 |
- +----+
- sage: J.one().to_matrix()[1]
- +----+
- | e0 |
- +----+
-
- """
- return super().matrix_space()
-
@cached_method
def cartesian_projection(self, i):
SETUP::
- sage: from mjo.eja.eja_algebra import (HadamardEJA,
+ sage: from mjo.eja.eja_algebra import (FiniteDimensionalEJA,
+ ....: HadamardEJA,
....: JordanSpinEJA,
- ....: OctonionHermitianEJA,
....: RealSymmetricEJA)
EXAMPLES:
The ``cartesian_product()`` function only uses the first factor to
decide where the result will live; thus we have to be careful to
- check that all factors do indeed have a `_rational_algebra` member
- before we try to access it::
-
- sage: J1 = OctonionHermitianEJA(1) # no rational basis
- sage: J2 = HadamardEJA(2)
- sage: cartesian_product([J1,J2])
- Euclidean Jordan algebra of dimension 1 over Algebraic Real Field
- (+) Euclidean Jordan algebra of dimension 2 over Algebraic Real Field
- sage: cartesian_product([J2,J1])
- Euclidean Jordan algebra of dimension 2 over Algebraic Real Field
- (+) Euclidean Jordan algebra of dimension 1 over Algebraic Real Field
+ check that all factors do indeed have a ``rational_algebra()`` method
+ before we construct an algebra that claims to have a rational basis::
+
+ sage: J1 = HadamardEJA(2)
+ sage: jp = lambda X,Y: X*Y
+ sage: ip = lambda X,Y: X[0,0]*Y[0,0]
+ sage: b1 = matrix(QQ, [[1]])
+ sage: J2 = FiniteDimensionalEJA((b1,), jp, ip)
+ sage: cartesian_product([J2,J1]) # factor one not RationalBasisEJA
+ Euclidean Jordan algebra of dimension 1 over Algebraic Real
+ Field (+) Euclidean Jordan algebra of dimension 2 over Algebraic
+ Real Field
+ sage: cartesian_product([J1,J2]) # factor one is RationalBasisEJA
+ Traceback (most recent call last):
+ ...
+ ValueError: factor not a RationalBasisEJA
"""
def __init__(self, algebras, **kwargs):
+ if not all( hasattr(r, "rational_algebra") for r in algebras ):
+ raise ValueError("factor not a RationalBasisEJA")
+
CartesianProductEJA.__init__(self, algebras, **kwargs)
- self._rational_algebra = None
- if self.vector_space().base_field() is not QQ:
- if all( hasattr(r, "_rational_algebra") for r in algebras ):
- self._rational_algebra = cartesian_product([
- r._rational_algebra for r in algebras
- ])
+ @cached_method
+ def rational_algebra(self):
+ if self.base_ring() is QQ:
+ return self
+
+ return cartesian_product([
+ r.rational_algebra() for r in self.cartesian_factors()
+ ])
RationalBasisEJA.CartesianProduct = RationalBasisCartesianProductEJA