X-Git-Url: http://gitweb.michael.orlitzky.com/?a=blobdiff_plain;f=mjo%2Feja%2Feja_algebra.py;h=0f2b655f21795cb1feb0e8b41cfc878261a67962;hb=c4203897950b84665ea41ed103f87f68aee0852e;hp=d90d3f2dcb5f4adc5cd6135ac4151ef63c3166c8;hpb=6c983c4d14a02b4eff37fd2a07ae6b32b93e611c;p=sage.d.git diff --git a/mjo/eja/eja_algebra.py b/mjo/eja/eja_algebra.py index d90d3f2..0f2b655 100644 --- a/mjo/eja/eja_algebra.py +++ b/mjo/eja/eja_algebra.py @@ -5,23 +5,24 @@ are used in optimization, and have some additional nice methods beyond what can be supported in a general Jordan Algebra. """ +from itertools import repeat + from sage.algebras.quatalg.quaternion_algebra import QuaternionAlgebra 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.lazy_import import lazy_import from sage.misc.prandom import choice from sage.misc.table import table from sage.modules.free_module import FreeModule, VectorSpace -from sage.rings.integer_ring import ZZ -from sage.rings.number_field.number_field import NumberField, QuadraticField -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 sage.rings.all import (ZZ, QQ, RR, RLF, CLF, + PolynomialRing, + QuadraticField) from mjo.eja.eja_element import FiniteDimensionalEuclideanJordanAlgebraElement +lazy_import('mjo.eja.eja_subalgebra', + 'FiniteDimensionalEuclideanJordanSubalgebra') from mjo.eja.eja_utils import _mat2vec class FiniteDimensionalEuclideanJordanAlgebra(CombinatorialFreeModule): @@ -39,11 +40,12 @@ class FiniteDimensionalEuclideanJordanAlgebra(CombinatorialFreeModule): rank, prefix='e', category=None, - natural_basis=None): + natural_basis=None, + check=True): """ SETUP:: - sage: from mjo.eja.eja_algebra import random_eja + sage: from mjo.eja.eja_algebra import (JordanSpinEJA, random_eja) EXAMPLES: @@ -51,18 +53,30 @@ class FiniteDimensionalEuclideanJordanAlgebra(CombinatorialFreeModule): sage: set_random_seed() sage: J = random_eja() - sage: x = J.random_element() - sage: y = J.random_element() + sage: x,y = J.random_elements(2) sage: x*y == y*x True + TESTS: + + The ``field`` we're given must be real:: + + sage: JordanSpinEJA(2,QQbar) + Traceback (most recent call last): + ... + ValueError: field is not real + """ + if check: + if not field.is_subring(RR): + # Note: this does return true for the real algebraic + # field, and any quadratic field where we've specified + # a real embedding. + raise ValueError('field is not real') + self._rank = rank self._natural_basis = natural_basis - # TODO: HACK for the charpoly.. needs redesign badly. - self._basis_normalizers = None - if category is None: category = MagmaticAlgebras(field).FiniteDimensional() category = category.WithBasis().Unital() @@ -123,11 +137,11 @@ class FiniteDimensionalEuclideanJordanAlgebra(CombinatorialFreeModule): vector representations) back and forth faithfully:: sage: set_random_seed() - sage: J = RealCartesianProductEJA(5) + sage: J = RealCartesianProductEJA.random_instance() sage: x = J.random_element() sage: J(x.to_vector().column()) == x True - sage: J = JordanSpinEJA(5) + sage: J = JordanSpinEJA.random_instance() sage: x = J.random_element() sage: J(x.to_vector().column()) == x True @@ -238,22 +252,12 @@ class FiniteDimensionalEuclideanJordanAlgebra(CombinatorialFreeModule): store the trace/determinant (a_{r-1} and a_{0} respectively) separate from the entire characteristic polynomial. """ - if self._basis_normalizers is not None: - # Must be a matrix class? - # WARNING/TODO: this whole mess is mis-designed. - n = self.natural_basis_space().nrows() - field = self.base_ring().base_ring() # yeeeeaaaahhh - J = self.__class__(n, field, False) - (_,x,_,_) = J._charpoly_matrix_system() - p = J._charpoly_coeff(i) - # p might be missing some vars, have to substitute "optionally" - pairs = zip(x.base_ring().gens(), self._basis_normalizers) - substitutions = { v: v*c for (v,c) in pairs } - return p.subs(substitutions) - (A_of_x, x, xr, detA) = self._charpoly_matrix_system() R = A_of_x.base_ring() - if i >= self.rank(): + + if i == self.rank(): + return R.one() + if i > self.rank(): # Guaranteed by theory return R.zero() @@ -362,7 +366,7 @@ class FiniteDimensionalEuclideanJordanAlgebra(CombinatorialFreeModule): SETUP:: - sage: from mjo.eja.eja_algebra import JordanSpinEJA + sage: from mjo.eja.eja_algebra import JordanSpinEJA, TrivialEJA EXAMPLES: @@ -376,12 +380,22 @@ class FiniteDimensionalEuclideanJordanAlgebra(CombinatorialFreeModule): sage: p(*xvec) t^2 - 2*t + 1 + By definition, the characteristic polynomial is a monic + degree-zero polynomial in a rank-zero algebra. Note that + Cayley-Hamilton is indeed satisfied since the polynomial + ``1`` evaluates to the identity element of the algebra on + any argument:: + + sage: J = TrivialEJA() + sage: J.characteristic_polynomial() + 1 + """ r = self.rank() n = self.dimension() - # The list of coefficient polynomials a_1, a_2, ..., a_n. - a = [ self._charpoly_coeff(i) for i in range(n) ] + # The list of coefficient polynomials a_0, a_1, a_2, ..., a_n. + a = [ self._charpoly_coeff(i) for i in range(r+1) ] # We go to a bit of trouble here to reorder the # indeterminates, so that it's easier to evaluate the @@ -393,18 +407,7 @@ class FiniteDimensionalEuclideanJordanAlgebra(CombinatorialFreeModule): S = PolynomialRing(S, R.variable_names()) t = S(t) - # Note: all entries past the rth should be zero. The - # coefficient of the highest power (x^r) is 1, but it doesn't - # appear in the solution vector which contains coefficients - # for the other powers (to make them sum to x^r). - if (r < n): - a[r] = 1 # corresponds to x^r - else: - # When the rank is equal to the dimension, trying to - # assign a[r] goes out-of-bounds. - a.append(1) # corresponds to x^r - - return sum( a[k]*(t**k) for k in range(len(a)) ) + return sum( a[k]*(t**k) for k in xrange(len(a)) ) def inner_product(self, x, y): @@ -421,14 +424,12 @@ class FiniteDimensionalEuclideanJordanAlgebra(CombinatorialFreeModule): EXAMPLES: - The inner product must satisfy its axiom for this algebra to truly - be a Euclidean Jordan Algebra:: + Our inner product is "associative," which means the following for + a symmetric bilinear form:: sage: set_random_seed() sage: J = random_eja() - sage: x = J.random_element() - sage: y = J.random_element() - sage: z = J.random_element() + sage: x,y,z = J.random_elements(3) sage: (x*y).inner_product(z) == y.inner_product(x*z) True @@ -446,15 +447,19 @@ class FiniteDimensionalEuclideanJordanAlgebra(CombinatorialFreeModule): SETUP:: - sage: from mjo.eja.eja_algebra import ComplexHermitianEJA + sage: from mjo.eja.eja_algebra import (ComplexHermitianEJA, + ....: TrivialEJA) EXAMPLES:: sage: J = ComplexHermitianEJA(3) sage: J.is_trivial() False - sage: A = J.zero().subalgebra_generated_by() - sage: A.is_trivial() + + :: + + sage: J = TrivialEJA() + sage: J.is_trivial() True """ @@ -488,7 +493,7 @@ class FiniteDimensionalEuclideanJordanAlgebra(CombinatorialFreeModule): """ M = list(self._multiplication_table) # copy - for i in range(len(M)): + for i in xrange(len(M)): # M had better be "square" M[i] = [self.monomial(i)] + M[i] M = [["*"] + list(self.gens())] + M @@ -629,13 +634,138 @@ class FiniteDimensionalEuclideanJordanAlgebra(CombinatorialFreeModule): 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 peirce_decomposition(self, c): + """ + The Peirce decomposition of this algebra relative to the + idempotent ``c``. + + In the future, this can be extended to a complete system of + orthogonal idempotents. + + INPUT: + + - ``c`` -- an idempotent of this algebra. + + OUTPUT: + + A triple (J0, J5, J1) containing two subalgebras and one subspace + of this algebra, + + - ``J0`` -- the algebra on the eigenspace of ``c.operator()`` + corresponding to the eigenvalue zero. + + - ``J5`` -- the eigenspace (NOT a subalgebra) of ``c.operator()`` + corresponding to the eigenvalue one-half. + + - ``J1`` -- the algebra on the eigenspace of ``c.operator()`` + corresponding to the eigenvalue one. + + These are the only possible eigenspaces for that operator, and this + algebra is a direct sum of them. The spaces ``J0`` and ``J1`` are + orthogonal, and are subalgebras of this algebra with the appropriate + restrictions. + + SETUP:: + + sage: from mjo.eja.eja_algebra import random_eja, RealSymmetricEJA + + EXAMPLES: + + The canonical example comes from the symmetric matrices, which + decompose into diagonal and off-diagonal parts:: + + sage: J = RealSymmetricEJA(3) + sage: C = matrix(QQ, [ [1,0,0], + ....: [0,1,0], + ....: [0,0,0] ]) + sage: c = J(C) + sage: J0,J5,J1 = J.peirce_decomposition(c) + sage: J0 + Euclidean Jordan algebra of dimension 1... + sage: J5 + Vector space of degree 6 and dimension 2... + sage: J1 + Euclidean Jordan algebra of dimension 3... + + TESTS: + + Every algebra decomposes trivially with respect to its identity + element:: + + sage: set_random_seed() + sage: J = random_eja() + sage: J0,J5,J1 = J.peirce_decomposition(J.one()) + sage: J0.dimension() == 0 and J5.dimension() == 0 + True + sage: J1.superalgebra() == J and J1.dimension() == J.dimension() + True + + The identity elements in the two subalgebras are the + projections onto their respective subspaces of the + superalgebra's identity element:: + + sage: set_random_seed() + sage: J = random_eja() + sage: x = J.random_element() + sage: if not J.is_trivial(): + ....: while x.is_nilpotent(): + ....: x = J.random_element() + sage: c = x.subalgebra_idempotent() + sage: J0,J5,J1 = J.peirce_decomposition(c) + sage: J1(c) == J1.one() + True + sage: J0(J.one() - c) == J0.one() + True + + """ + if not c.is_idempotent(): + raise ValueError("element is not idempotent: %s" % c) + + # Default these to what they should be if they turn out to be + # trivial, because eigenspaces_left() won't return eigenvalues + # 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 = FiniteDimensionalEuclideanJordanSubalgebra(self, ()) + J0 = trivial # eigenvalue zero + J5 = VectorSpace(self.base_ring(), 0) # eigenvalue one-half + J1 = trivial # eigenvalue one + + for (eigval, eigspace) in c.operator().matrix().left_eigenspaces(): + if eigval == ~(self.base_ring()(2)): + J5 = eigspace + else: + gens = tuple( self.from_vector(b) for b in eigspace.basis() ) + subalg = FiniteDimensionalEuclideanJordanSubalgebra(self, gens) + if eigval == 0: + J0 = subalg + elif eigval == 1: + J1 = subalg + else: + raise ValueError("unexpected eigenvalue: %s" % eigval) + + return (J0, J5, J1) + + + def random_elements(self, count): + """ + Return ``count`` random elements as a tuple. + + SETUP:: + + sage: from mjo.eja.eja_algebra import JordanSpinEJA + + EXAMPLES:: + + sage: J = JordanSpinEJA(3) + sage: x,y,z = J.random_elements(3) + sage: all( [ x in J, y in J, z in J ]) + True + sage: len( J.random_elements(10) ) == 10 + True + + """ + return tuple( self.random_element() for idx in xrange(count) ) def rank(self): @@ -671,27 +801,25 @@ class FiniteDimensionalEuclideanJordanAlgebra(CombinatorialFreeModule): The rank of the `n`-by-`n` Hermitian real, complex, or quaternion matrices is `n`:: - sage: RealSymmetricEJA(2).rank() - 2 - sage: ComplexHermitianEJA(2).rank() - 2 + sage: RealSymmetricEJA(4).rank() + 4 + sage: ComplexHermitianEJA(3).rank() + 3 sage: QuaternionHermitianEJA(2).rank() 2 - sage: RealSymmetricEJA(5).rank() - 5 - sage: ComplexHermitianEJA(5).rank() - 5 - sage: QuaternionHermitianEJA(5).rank() - 5 TESTS: Ensure that every EJA that we know how to construct has a - positive integer rank:: + positive integer rank, unless the algebra is trivial in + which case its rank will be zero:: sage: set_random_seed() - sage: r = random_eja().rank() - sage: r in ZZ and r > 0 + sage: J = random_eja() + sage: r = J.rank() + sage: r in ZZ + True + sage: r > 0 or (r == 0 and J.is_trivial()) True """ @@ -719,7 +847,62 @@ class FiniteDimensionalEuclideanJordanAlgebra(CombinatorialFreeModule): Element = FiniteDimensionalEuclideanJordanAlgebraElement -class RealCartesianProductEJA(FiniteDimensionalEuclideanJordanAlgebra): +class KnownRankEJA(object): + """ + A class for algebras that we actually know we can construct. The + main issue is that, for most of our methods to make sense, we need + to know the rank of our algebra. Thus we can't simply generate a + "random" algebra, or even check that a given basis and product + satisfy the axioms; because even if everything looks OK, we wouldn't + know the rank we need to actuallty build the thing. + + Not really a subclass of FDEJA because doing that causes method + resolution errors, e.g. + + TypeError: Error when calling the metaclass bases + Cannot create a consistent method resolution + order (MRO) for bases FiniteDimensionalEuclideanJordanAlgebra, + KnownRankEJA + + """ + @staticmethod + def _max_test_case_size(): + """ + Return an integer "size" that is an upper bound on the size of + this algebra when it is used in a random test + case. Unfortunately, the term "size" is quite vague -- when + dealing with `R^n` under either the Hadamard or Jordan spin + product, the "size" refers to the dimension `n`. When dealing + with a matrix algebra (real symmetric or complex/quaternion + Hermitian), it refers to the size of the matrix, which is + far less than the dimension of the underlying vector space. + + We default to five in this class, which is safe in `R^n`. The + matrix algebra subclasses (or any class where the "size" is + interpreted to be far less than the dimension) should override + with a smaller number. + """ + return 5 + + @classmethod + def random_instance(cls, field=QQ, **kwargs): + """ + Return a random instance of this type of algebra. + + Beware, this will crash for "most instances" because the + constructor below looks wrong. + """ + if cls is TrivialEJA: + # The TrivialEJA class doesn't take an "n" argument because + # there's only one. + return cls(field) + + n = ZZ.random_element(cls._max_test_case_size()) + 1 + return cls(n, field, **kwargs) + + +class RealCartesianProductEJA(FiniteDimensionalEuclideanJordanAlgebra, + KnownRankEJA): """ Return the Euclidean Jordan Algebra corresponding to the set `R^n` under the Hadamard product. @@ -758,22 +941,11 @@ class RealCartesianProductEJA(FiniteDimensionalEuclideanJordanAlgebra): 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, **kwargs): V = VectorSpace(field, n) - mult_table = [ [ V.gen(i)*(i == j) for j in range(n) ] - for i in range(n) ] + mult_table = [ [ V.gen(i)*(i == j) for j in xrange(n) ] + for i in xrange(n) ] fdeja = super(RealCartesianProductEJA, self) return fdeja.__init__(field, mult_table, rank=n, **kwargs) @@ -792,10 +964,8 @@ class RealCartesianProductEJA(FiniteDimensionalEuclideanJordanAlgebra): over `R^n`:: 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: J = RealCartesianProductEJA.random_instance() + sage: x,y = J.random_elements(2) sage: X = x.natural_representation() sage: Y = y.natural_representation() sage: x.inner_product(y) == J.natural_inner_product(X,Y) @@ -805,32 +975,10 @@ class RealCartesianProductEJA(FiniteDimensionalEuclideanJordanAlgebra): return x.to_vector().inner_product(y.to_vector()) -def random_eja(): +def random_eja(field=QQ, nontrivial=False): """ Return a "random" finite-dimensional Euclidean Jordan Algebra. - ALGORITHM: - - For now, we choose a random natural number ``n`` (greater than zero) - and then give you back one of the following: - - * The cartesian product of the rational numbers ``n`` times; this is - ``QQ^n`` with the Hadamard product. - - * The Jordan spin algebra on ``QQ^n``. - - * The ``n``-by-``n`` rational symmetric matrices with the symmetric - product. - - * The ``n``-by-``n`` complex-rational Hermitian matrices embedded - in the space of ``2n``-by-``2n`` real symmetric matrices. - - * The ``n``-by-``n`` quaternion-rational Hermitian matrices embedded - in the space of ``4n``-by-``4n`` real symmetric matrices. - - Later this might be extended to return Cartesian products of the - EJAs above. - SETUP:: sage: from mjo.eja.eja_algebra import random_eja @@ -841,433 +989,190 @@ def random_eja(): Euclidean Jordan algebra of dimension... """ + eja_classes = KnownRankEJA.__subclasses__() + if nontrivial: + eja_classes.remove(TrivialEJA) + classname = choice(eja_classes) + return classname.random_instance(field=field) - # The max_n component lets us choose different upper bounds on the - # value "n" that gets passed to the constructor. This is needed - # because e.g. R^{10} is reasonable to test, while the Hermitian - # 10-by-10 quaternion matrices are not. - (constructor, max_n) = choice([(RealCartesianProductEJA, 6), - (JordanSpinEJA, 6), - (RealSymmetricEJA, 5), - (ComplexHermitianEJA, 4), - (QuaternionHermitianEJA, 3)]) - n = ZZ.random_element(1, max_n) - return constructor(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, QQ) - sage: all( M.is_symmetric() for M in B) - True - - """ - # The basis of symmetric matrices, as matrices, in their R^(n-by-n) - # coordinates. - S = [] - for i in xrange(n): - for j in xrange(i+1): - Eij = matrix(field, n, lambda k,l: k==i and l==j) - if i == j: - Sij = Eij - else: - Sij = Eij + Eij.transpose() - S.append(Sij) - return tuple(S) - - -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 - - TESTS:: - - sage: set_random_seed() - sage: n = ZZ.random_element(1,5) - sage: field = QuadraticField(2, 'sqrt2') - sage: B = _complex_hermitian_basis(n, field) - sage: all( M.is_symmetric() for M in B) - True - - """ - 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: - # - # * We want conjugate-symmetry, not just symmetry. - # * The diagonal will (as a result) be real. - # - S = [] - for i in xrange(n): - for j in xrange(i+1): - Eij = matrix(F, n, lambda k,l: k==i and l==j) - if i == j: - Sij = _embed_complex_matrix(Eij) - S.append(Sij) - else: - # The second one has a minus because it's conjugated. - Sij_real = _embed_complex_matrix(Eij + Eij.transpose()) - S.append(Sij_real) - Sij_imag = _embed_complex_matrix(I*Eij - I*Eij.transpose()) - S.append(Sij_imag) - - # Since we embedded these, we can drop back to the "field" that we - # started with instead of the complex extension "F". - return tuple( s.change_ring(field) for s in S ) +class MatrixEuclideanJordanAlgebra(FiniteDimensionalEuclideanJordanAlgebra): + @staticmethod + def _max_test_case_size(): + # Play it safe, since this will be squared and the underlying + # field can have dimension 4 (quaternions) too. + return 2 -def _quaternion_hermitian_basis(n, field): - """ - Returns a basis for the space of quaternion Hermitian n-by-n matrices. + def __init__(self, field, basis, rank, normalize_basis=True, **kwargs): + """ + Compared to the superclass constructor, we take a basis instead of + a multiplication table because the latter can be computed in terms + of the former when the product is known (like it is here). + """ + # Used in this class's fast _charpoly_coeff() override. + self._basis_normalizers = None - 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. + # We're going to loop through this a few times, so now's a good + # time to ensure that it isn't a generator expression. + basis = tuple(basis) - SETUP:: + if rank > 1 and normalize_basis: + # 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 = field.extension(p, 'sqrt2', embedding=RLF(2).sqrt()) + basis = tuple( s.change_ring(field) for s in basis ) + self._basis_normalizers = tuple( + ~(self.natural_inner_product(s,s).sqrt()) for s in basis ) + basis = tuple(s*c for (s,c) in zip(basis,self._basis_normalizers)) - sage: from mjo.eja.eja_algebra import _quaternion_hermitian_basis + Qs = self.multiplication_table_from_matrix_basis(basis) - TESTS:: + fdeja = super(MatrixEuclideanJordanAlgebra, self) + return fdeja.__init__(field, + Qs, + rank=rank, + natural_basis=basis, + **kwargs) - sage: set_random_seed() - sage: n = ZZ.random_element(1,5) - sage: B = _quaternion_hermitian_basis(n, QQ) - sage: all( M.is_symmetric() for M in B ) - True - """ - Q = QuaternionAlgebra(QQ,-1,-1) - I,J,K = Q.gens() - - # This is like the symmetric case, but we need to be careful: - # - # * We want conjugate-symmetry, not just symmetry. - # * The diagonal will (as a result) be real. - # - S = [] - for i in xrange(n): - for j in xrange(i+1): - Eij = matrix(Q, n, lambda k,l: k==i and l==j) - if i == j: - Sij = _embed_quaternion_matrix(Eij) - S.append(Sij) + @cached_method + def _charpoly_coeff(self, i): + """ + Override the parent method with something that tries to compute + over a faster (non-extension) field. + """ + if self._basis_normalizers is None: + # We didn't normalize, so assume that the basis we started + # with had entries in a nice field. + return super(MatrixEuclideanJordanAlgebra, self)._charpoly_coeff(i) + else: + basis = ( (b/n) for (b,n) in zip(self.natural_basis(), + self._basis_normalizers) ) + + # Do this over the rationals and convert back at the end. + J = MatrixEuclideanJordanAlgebra(QQ, + basis, + self.rank(), + normalize_basis=False) + (_,x,_,_) = J._charpoly_matrix_system() + p = J._charpoly_coeff(i) + # p might be missing some vars, have to substitute "optionally" + pairs = zip(x.base_ring().gens(), self._basis_normalizers) + substitutions = { v: v*c for (v,c) in pairs } + result = p.subs(substitutions) + + # The result of "subs" can be either a coefficient-ring + # element or a polynomial. Gotta handle both cases. + if result in QQ: + return self.base_ring()(result) else: - # Beware, orthogonal but not normalized! The second, - # third, and fourth ones have a minus because they're - # conjugated. - Sij_real = _embed_quaternion_matrix(Eij + Eij.transpose()) - S.append(Sij_real) - Sij_I = _embed_quaternion_matrix(I*Eij - I*Eij.transpose()) - S.append(Sij_I) - Sij_J = _embed_quaternion_matrix(J*Eij - J*Eij.transpose()) - S.append(Sij_J) - Sij_K = _embed_quaternion_matrix(K*Eij - K*Eij.transpose()) - S.append(Sij_K) - return tuple(S) - - - -def _multiplication_table_from_matrix_basis(basis): - """ - At least three of the five simple Euclidean Jordan algebras have the - symmetric multiplication (A,B) |-> (AB + BA)/2, where the - multiplication on the right is matrix multiplication. Given a basis - for the underlying matrix space, this function returns a - multiplication table (obtained by looping through the basis - elements) for an algebra of those matrices. - """ - # In S^2, for example, we nominally have four coordinates even - # though the space is of dimension three only. The vector space V - # is supposed to hold the entire long vector, and the subspace W - # of V will be spanned by the vectors that arise from symmetric - # matrices. Thus for S^2, dim(V) == 4 and dim(W) == 3. - field = basis[0].base_ring() - dimension = basis[0].nrows() - - V = VectorSpace(field, dimension**2) - W = V.span_of_basis( _mat2vec(s) for s in basis ) - n = len(basis) - mult_table = [[W.zero() for j in range(n)] for i in range(n)] - for i in range(n): - for j in range(n): - mat_entry = (basis[i]*basis[j] + basis[j]*basis[i])/2 - mult_table[i][j] = W.coordinate_vector(_mat2vec(mat_entry)) - - return mult_table - - -def _embed_complex_matrix(M): - """ - Embed the n-by-n complex matrix ``M`` into the space of real - matrices of size 2n-by-2n via the map the sends each entry `z = a + - bi` to the block matrix ``[[a,b],[-b,a]]``. + return result.change_ring(self.base_ring()) - SETUP:: - - sage: from mjo.eja.eja_algebra import _embed_complex_matrix - - EXAMPLES:: - sage: F = QuadraticField(-1, 'i') - sage: x1 = F(4 - 2*i) - sage: x2 = F(1 + 2*i) - sage: x3 = F(-i) - sage: x4 = F(6) - sage: M = matrix(F,2,[[x1,x2],[x3,x4]]) - sage: _embed_complex_matrix(M) - [ 4 -2| 1 2] - [ 2 4|-2 1] - [-----+-----] - [ 0 -1| 6 0] - [ 1 0| 0 6] - - TESTS: - - Embedding is a homomorphism (isomorphism, in fact):: - - sage: set_random_seed() - sage: n = ZZ.random_element(5) - sage: F = QuadraticField(-1, 'i') - sage: X = random_matrix(F, n) - sage: Y = random_matrix(F, n) - sage: actual = _embed_complex_matrix(X) * _embed_complex_matrix(Y) - sage: expected = _embed_complex_matrix(X*Y) - sage: actual == expected - True - - """ - n = M.nrows() - if M.ncols() != n: - raise ValueError("the matrix 'M' must be square") - field = M.base_ring() - blocks = [] - for z in M.list(): - 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. - return matrix.block(field.base_ring(), n, blocks) - - -def _unembed_complex_matrix(M): - """ - The inverse of _embed_complex_matrix(). - - SETUP:: - - sage: from mjo.eja.eja_algebra import (_embed_complex_matrix, - ....: _unembed_complex_matrix) - - EXAMPLES:: - - sage: A = matrix(QQ,[ [ 1, 2, 3, 4], - ....: [-2, 1, -4, 3], - ....: [ 9, 10, 11, 12], - ....: [-10, 9, -12, 11] ]) - sage: _unembed_complex_matrix(A) - [ 2*i + 1 4*i + 3] - [ 10*i + 9 12*i + 11] - - TESTS: - - Unembedding is the inverse of embedding:: - - sage: set_random_seed() - sage: F = QuadraticField(-1, 'i') - sage: M = random_matrix(F, 3) - sage: _unembed_complex_matrix(_embed_complex_matrix(M)) == M - True + @staticmethod + def multiplication_table_from_matrix_basis(basis): + """ + At least three of the five simple Euclidean Jordan algebras have the + symmetric multiplication (A,B) |-> (AB + BA)/2, where the + multiplication on the right is matrix multiplication. Given a basis + for the underlying matrix space, this function returns a + multiplication table (obtained by looping through the basis + elements) for an algebra of those matrices. + """ + # In S^2, for example, we nominally have four coordinates even + # though the space is of dimension three only. The vector space V + # is supposed to hold the entire long vector, and the subspace W + # of V will be spanned by the vectors that arise from symmetric + # matrices. Thus for S^2, dim(V) == 4 and dim(W) == 3. + field = basis[0].base_ring() + dimension = basis[0].nrows() + + V = VectorSpace(field, dimension**2) + W = V.span_of_basis( _mat2vec(s) for s in basis ) + n = len(basis) + mult_table = [[W.zero() for j in xrange(n)] for i in xrange(n)] + for i in xrange(n): + for j in xrange(n): + mat_entry = (basis[i]*basis[j] + basis[j]*basis[i])/2 + mult_table[i][j] = W.coordinate_vector(_mat2vec(mat_entry)) + + return mult_table - """ - n = ZZ(M.nrows()) - if M.ncols() != n: - raise ValueError("the matrix 'M' must be square") - if not n.mod(2).is_zero(): - raise ValueError("the matrix 'M' must be a complex embedding") - - 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 - # 2-by-2 block we see to a single complex element. - elements = [] - for k in xrange(n/2): - for j in xrange(n/2): - submat = M[2*k:2*k+2,2*j:2*j+2] - if submat[0,0] != submat[1,1]: - raise ValueError('bad on-diagonal submatrix') - if submat[0,1] != -submat[1,0]: - raise ValueError('bad off-diagonal submatrix') - z = submat[0,0] + submat[0,1]*i - elements.append(z) - - return matrix(F, n/2, elements) - - -def _embed_quaternion_matrix(M): - """ - Embed the n-by-n quaternion matrix ``M`` into the space of real - matrices of size 4n-by-4n by first sending each quaternion entry - `z = a + bi + cj + dk` to the block-complex matrix - ``[[a + bi, c+di],[-c + di, a-bi]]`, and then embedding those into - a real matrix. - SETUP:: + @staticmethod + def real_embed(M): + """ + Embed the matrix ``M`` into a space of real matrices. - sage: from mjo.eja.eja_algebra import _embed_quaternion_matrix + The matrix ``M`` can have entries in any field at the moment: + the real numbers, complex numbers, or quaternions. And although + they are not a field, we can probably support octonions at some + point, too. This function returns a real matrix that "acts like" + the original with respect to matrix multiplication; i.e. - EXAMPLES:: + real_embed(M*N) = real_embed(M)*real_embed(N) - sage: Q = QuaternionAlgebra(QQ,-1,-1) - sage: i,j,k = Q.gens() - sage: x = 1 + 2*i + 3*j + 4*k - sage: M = matrix(Q, 1, [[x]]) - sage: _embed_quaternion_matrix(M) - [ 1 2 3 4] - [-2 1 -4 3] - [-3 4 1 -2] - [-4 -3 2 1] + """ + raise NotImplementedError - Embedding is a homomorphism (isomorphism, in fact):: - sage: set_random_seed() - sage: n = ZZ.random_element(5) - sage: Q = QuaternionAlgebra(QQ,-1,-1) - sage: X = random_matrix(Q, n) - sage: Y = random_matrix(Q, n) - sage: actual = _embed_quaternion_matrix(X)*_embed_quaternion_matrix(Y) - sage: expected = _embed_quaternion_matrix(X*Y) - sage: actual == expected - True + @staticmethod + def real_unembed(M): + """ + The inverse of :meth:`real_embed`. + """ + raise NotImplementedError - """ - quaternions = M.base_ring() - n = M.nrows() - if M.ncols() != n: - raise ValueError("the matrix 'M' must be square") - - F = QuadraticField(-1, 'i') - i = F.gen() - - blocks = [] - for z in M.list(): - t = z.coefficient_tuple() - a = t[0] - b = t[1] - c = t[2] - d = t[3] - cplx_matrix = matrix(F, 2, [[ a + b*i, c + d*i], - [-c + d*i, a - b*i]]) - blocks.append(_embed_complex_matrix(cplx_matrix)) - - # We should have real entries by now, so use the realest field - # we've got for the return value. - return matrix.block(quaternions.base_ring(), n, blocks) - - -def _unembed_quaternion_matrix(M): - """ - The inverse of _embed_quaternion_matrix(). - SETUP:: + @classmethod + def natural_inner_product(cls,X,Y): + Xu = cls.real_unembed(X) + Yu = cls.real_unembed(Y) + tr = (Xu*Yu).trace() - sage: from mjo.eja.eja_algebra import (_embed_quaternion_matrix, - ....: _unembed_quaternion_matrix) + if tr in RLF: + # It's real already. + return tr - EXAMPLES:: + # Otherwise, try the thing that works for complex numbers; and + # if that doesn't work, the thing that works for quaternions. + try: + return tr.vector()[0] # real part, imag part is index 1 + except AttributeError: + # A quaternions doesn't have a vector() method, but does + # have coefficient_tuple() method that returns the + # coefficients of 1, i, j, and k -- in that order. + return tr.coefficient_tuple()[0] - sage: M = matrix(QQ, [[ 1, 2, 3, 4], - ....: [-2, 1, -4, 3], - ....: [-3, 4, 1, -2], - ....: [-4, -3, 2, 1]]) - sage: _unembed_quaternion_matrix(M) - [1 + 2*i + 3*j + 4*k] - TESTS: +class RealMatrixEuclideanJordanAlgebra(MatrixEuclideanJordanAlgebra): + @staticmethod + def real_embed(M): + """ + The identity function, for embedding real matrices into real + matrices. + """ + return M - Unembedding is the inverse of embedding:: + @staticmethod + def real_unembed(M): + """ + The identity function, for unembedding real matrices from real + matrices. + """ + return M - sage: set_random_seed() - sage: Q = QuaternionAlgebra(QQ, -1, -1) - sage: M = random_matrix(Q, 3) - sage: _unembed_quaternion_matrix(_embed_quaternion_matrix(M)) == M - True - """ - n = ZZ(M.nrows()) - if M.ncols() != n: - raise ValueError("the matrix 'M' must be square") - if not n.mod(4).is_zero(): - raise ValueError("the matrix 'M' must be a complex embedding") - - # Use the base ring of the matrix to ensure that its entries can be - # multiplied by elements of the quaternion algebra. - field = M.base_ring() - Q = QuaternionAlgebra(field,-1,-1) - i,j,k = Q.gens() - - # Go top-left to bottom-right (reading order), converting every - # 4-by-4 block we see to a 2-by-2 complex block, to a 1-by-1 - # quaternion block. - elements = [] - for l in xrange(n/4): - for m in xrange(n/4): - submat = _unembed_complex_matrix(M[4*l:4*l+4,4*m:4*m+4]) - if submat[0,0] != submat[1,1].conjugate(): - raise ValueError('bad on-diagonal submatrix') - if submat[0,1] != -submat[1,0].conjugate(): - raise ValueError('bad off-diagonal submatrix') - z = submat[0,0].vector()[0] # real part - z += submat[0,0].vector()[1]*i # imag part - z += submat[0,1].vector()[0]*j # real part - z += submat[0,1].vector()[1]*k # imag part - elements.append(z) - - return matrix(Q, n/4, elements) - - -# The inner product used for the real symmetric simple EJA. -# We keep it as a separate function because e.g. the complex -# algebra uses the same inner product, except divided by 2. -def _matrix_ip(X,Y): - X_mat = X.natural_representation() - Y_mat = Y.natural_representation() - return (X_mat*Y_mat).trace() - - -class RealSymmetricEJA(FiniteDimensionalEuclideanJordanAlgebra): +class RealSymmetricEJA(RealMatrixEuclideanJordanAlgebra, KnownRankEJA): """ The rank-n simple EJA consisting of real symmetric n-by-n matrices, the usual symmetric Jordan product, and the trace inner @@ -1288,12 +1193,21 @@ class RealSymmetricEJA(FiniteDimensionalEuclideanJordanAlgebra): sage: e2*e2 e2 + In theory, our "field" can be any subfield of the reals:: + + sage: RealSymmetricEJA(2, AA) + Euclidean Jordan algebra of dimension 3 over Algebraic Real Field + sage: RealSymmetricEJA(2, RR) + Euclidean Jordan algebra of dimension 3 over Real Field with + 53 bits of precision + TESTS: The dimension of this algebra is `(n^2 + n) / 2`:: sage: set_random_seed() - sage: n = ZZ.random_element(1,5) + sage: n_max = RealSymmetricEJA._max_test_case_size() + sage: n = ZZ.random_element(1, n_max) sage: J = RealSymmetricEJA(n) sage: J.dimension() == (n^2 + n)/2 True @@ -1301,10 +1215,8 @@ class RealSymmetricEJA(FiniteDimensionalEuclideanJordanAlgebra): The Jordan multiplication is what we think it is:: 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: J = RealSymmetricEJA.random_instance() + sage: x,y = J.random_elements(2) sage: actual = (x*y).natural_representation() sage: X = x.natural_representation() sage: Y = y.natural_representation() @@ -1319,23 +1231,11 @@ class RealSymmetricEJA(FiniteDimensionalEuclideanJordanAlgebra): 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 natural basis is normalized with respect to the natural inner product unless we specify otherwise:: sage: set_random_seed() - sage: n = ZZ.random_element(1,5) - sage: J = RealSymmetricEJA(n) + sage: J = RealSymmetricEJA.random_instance() sage: all( b.norm() == 1 for b in J.gens() ) True @@ -1346,41 +1246,208 @@ class RealSymmetricEJA(FiniteDimensionalEuclideanJordanAlgebra): the operator is self-adjoint by the Jordan axiom:: sage: set_random_seed() - sage: n = ZZ.random_element(1,5) - sage: x = RealSymmetricEJA(n).random_element() + sage: x = RealSymmetricEJA.random_instance().random_element() sage: x.operator().matrix().is_symmetric() True """ - def __init__(self, n, field=QQ, normalize_basis=True, **kwargs): - S = _real_symmetric_basis(n, field) + @classmethod + def _denormalized_basis(cls, n, field): + """ + Return a basis for the space of real symmetric n-by-n matrices. - if n > 1 and normalize_basis: - # 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 = [ s.change_ring(field) for s in S ] - self._basis_normalizers = tuple( - ~(self.natural_inner_product(s,s).sqrt()) for s in S ) - S = tuple( s*c for (s,c) in zip(S,self._basis_normalizers) ) + SETUP:: - Qs = _multiplication_table_from_matrix_basis(S) + sage: from mjo.eja.eja_algebra import RealSymmetricEJA - fdeja = super(RealSymmetricEJA, self) - return fdeja.__init__(field, - Qs, - rank=n, - natural_basis=S, - **kwargs) + TESTS:: + + sage: set_random_seed() + sage: n = ZZ.random_element(1,5) + sage: B = RealSymmetricEJA._denormalized_basis(n,QQ) + sage: all( M.is_symmetric() for M in B) + True + + """ + # The basis of symmetric matrices, as matrices, in their R^(n-by-n) + # coordinates. + S = [] + for i in xrange(n): + for j in xrange(i+1): + Eij = matrix(field, n, lambda k,l: k==i and l==j) + if i == j: + Sij = Eij + else: + Sij = Eij + Eij.transpose() + S.append(Sij) + return S + + + @staticmethod + def _max_test_case_size(): + return 4 # Dimension 10 + + + def __init__(self, n, field=QQ, **kwargs): + basis = self._denormalized_basis(n, field) + super(RealSymmetricEJA, self).__init__(field, basis, n, **kwargs) + + +class ComplexMatrixEuclideanJordanAlgebra(MatrixEuclideanJordanAlgebra): + @staticmethod + def real_embed(M): + """ + Embed the n-by-n complex matrix ``M`` into the space of real + matrices of size 2n-by-2n via the map the sends each entry `z = a + + bi` to the block matrix ``[[a,b],[-b,a]]``. + + SETUP:: + + sage: from mjo.eja.eja_algebra import \ + ....: ComplexMatrixEuclideanJordanAlgebra + + EXAMPLES:: + + sage: F = QuadraticField(-1, 'i') + sage: x1 = F(4 - 2*i) + sage: x2 = F(1 + 2*i) + sage: x3 = F(-i) + sage: x4 = F(6) + sage: M = matrix(F,2,[[x1,x2],[x3,x4]]) + sage: ComplexMatrixEuclideanJordanAlgebra.real_embed(M) + [ 4 -2| 1 2] + [ 2 4|-2 1] + [-----+-----] + [ 0 -1| 6 0] + [ 1 0| 0 6] + + TESTS: + + Embedding is a homomorphism (isomorphism, in fact):: + + sage: set_random_seed() + sage: n_max = ComplexMatrixEuclideanJordanAlgebra._max_test_case_size() + sage: n = ZZ.random_element(n_max) + sage: F = QuadraticField(-1, 'i') + sage: X = random_matrix(F, n) + sage: Y = random_matrix(F, n) + sage: Xe = ComplexMatrixEuclideanJordanAlgebra.real_embed(X) + sage: Ye = ComplexMatrixEuclideanJordanAlgebra.real_embed(Y) + sage: XYe = ComplexMatrixEuclideanJordanAlgebra.real_embed(X*Y) + sage: Xe*Ye == XYe + True + + """ + n = M.nrows() + if M.ncols() != n: + raise ValueError("the matrix 'M' must be square") + + # We don't need any adjoined elements... + field = M.base_ring().base_ring() + + 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]])) + + return matrix.block(field, n, blocks) + + + @staticmethod + def real_unembed(M): + """ + The inverse of _embed_complex_matrix(). + SETUP:: + + sage: from mjo.eja.eja_algebra import \ + ....: ComplexMatrixEuclideanJordanAlgebra + + EXAMPLES:: + + sage: A = matrix(QQ,[ [ 1, 2, 3, 4], + ....: [-2, 1, -4, 3], + ....: [ 9, 10, 11, 12], + ....: [-10, 9, -12, 11] ]) + sage: ComplexMatrixEuclideanJordanAlgebra.real_unembed(A) + [ 2*i + 1 4*i + 3] + [ 10*i + 9 12*i + 11] + + TESTS: + + Unembedding is the inverse of embedding:: + + sage: set_random_seed() + sage: F = QuadraticField(-1, 'i') + sage: M = random_matrix(F, 3) + sage: Me = ComplexMatrixEuclideanJordanAlgebra.real_embed(M) + sage: ComplexMatrixEuclideanJordanAlgebra.real_unembed(Me) == M + True + + """ + n = ZZ(M.nrows()) + if M.ncols() != n: + raise ValueError("the matrix 'M' must be square") + if not n.mod(2).is_zero(): + raise ValueError("the matrix 'M' must be a complex embedding") + + # If "M" was normalized, its base ring might have roots + # adjoined and they can stick around after unembedding. + field = M.base_ring() + R = PolynomialRing(field, 'z') + z = R.gen() + F = field.extension(z**2 + 1, 'i', embedding=CLF(-1).sqrt()) + i = F.gen() + + # Go top-left to bottom-right (reading order), converting every + # 2-by-2 block we see to a single complex element. + elements = [] + for k in xrange(n/2): + for j in xrange(n/2): + submat = M[2*k:2*k+2,2*j:2*j+2] + if submat[0,0] != submat[1,1]: + raise ValueError('bad on-diagonal submatrix') + if submat[0,1] != -submat[1,0]: + raise ValueError('bad off-diagonal submatrix') + z = submat[0,0] + submat[0,1]*i + elements.append(z) + + return matrix(F, n/2, elements) + + + @classmethod + def natural_inner_product(cls,X,Y): + """ + Compute a natural inner product in this algebra directly from + its real embedding. + + SETUP:: + + sage: from mjo.eja.eja_algebra import ComplexHermitianEJA + + TESTS: + This gives the same answer as the slow, default method implemented + in :class:`MatrixEuclideanJordanAlgebra`:: -class ComplexHermitianEJA(FiniteDimensionalEuclideanJordanAlgebra): + sage: set_random_seed() + sage: J = ComplexHermitianEJA.random_instance() + sage: x,y = J.random_elements(2) + sage: Xe = x.natural_representation() + sage: Ye = y.natural_representation() + sage: X = ComplexHermitianEJA.real_unembed(Xe) + sage: Y = ComplexHermitianEJA.real_unembed(Ye) + sage: expected = (X*Y).trace().vector()[0] + sage: actual = ComplexHermitianEJA.natural_inner_product(Xe,Ye) + sage: actual == expected + True + + """ + return RealMatrixEuclideanJordanAlgebra.natural_inner_product(X,Y)/2 + + +class ComplexHermitianEJA(ComplexMatrixEuclideanJordanAlgebra, KnownRankEJA): """ The rank-n simple EJA consisting of complex Hermitian n-by-n matrices over the real numbers, the usual symmetric Jordan product, @@ -1391,12 +1458,23 @@ class ComplexHermitianEJA(FiniteDimensionalEuclideanJordanAlgebra): sage: from mjo.eja.eja_algebra import ComplexHermitianEJA + EXAMPLES: + + In theory, our "field" can be any subfield of the reals:: + + sage: ComplexHermitianEJA(2, AA) + Euclidean Jordan algebra of dimension 4 over Algebraic Real Field + sage: ComplexHermitianEJA(2, RR) + Euclidean Jordan algebra of dimension 4 over Real Field with + 53 bits of precision + TESTS: The dimension of this algebra is `n^2`:: sage: set_random_seed() - sage: n = ZZ.random_element(1,5) + sage: n_max = ComplexHermitianEJA._max_test_case_size() + sage: n = ZZ.random_element(1, n_max) sage: J = ComplexHermitianEJA(n) sage: J.dimension() == n^2 True @@ -1404,10 +1482,8 @@ class ComplexHermitianEJA(FiniteDimensionalEuclideanJordanAlgebra): The Jordan multiplication is what we think it is:: 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: J = ComplexHermitianEJA.random_instance() + sage: x,y = J.random_elements(2) sage: actual = (x*y).natural_representation() sage: X = x.natural_representation() sage: Y = y.natural_representation() @@ -1422,23 +1498,11 @@ class ComplexHermitianEJA(FiniteDimensionalEuclideanJordanAlgebra): 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 natural basis is normalized with respect to the natural inner product unless we specify otherwise:: sage: set_random_seed() - sage: n = ZZ.random_element(1,4) - sage: J = ComplexHermitianEJA(n) + sage: J = ComplexHermitianEJA.random_instance() sage: all( b.norm() == 1 for b in J.gens() ) True @@ -1449,49 +1513,236 @@ class ComplexHermitianEJA(FiniteDimensionalEuclideanJordanAlgebra): the operator is self-adjoint by the Jordan axiom:: sage: set_random_seed() - sage: n = ZZ.random_element(1,5) - sage: x = ComplexHermitianEJA(n).random_element() + sage: x = ComplexHermitianEJA.random_instance().random_element() sage: x.operator().matrix().is_symmetric() True """ - def __init__(self, n, field=QQ, normalize_basis=True, **kwargs): - S = _complex_hermitian_basis(n, field) - if n > 1 and normalize_basis: - # 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 = [ s.change_ring(field) for s in S ] - self._basis_normalizers = tuple( - ~(self.natural_inner_product(s,s).sqrt()) for s in S ) - S = tuple( s*c for (s,c) in zip(S,self._basis_normalizers) ) + @classmethod + def _denormalized_basis(cls, n, field): + """ + Returns a basis for the space of complex Hermitian n-by-n matrices. - Qs = _multiplication_table_from_matrix_basis(S) + 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. - fdeja = super(ComplexHermitianEJA, self) - return fdeja.__init__(field, - Qs, - rank=n, - natural_basis=S, - **kwargs) + SETUP:: + + sage: from mjo.eja.eja_algebra import ComplexHermitianEJA + + TESTS:: + sage: set_random_seed() + sage: n = ZZ.random_element(1,5) + sage: field = QuadraticField(2, 'sqrt2') + sage: B = ComplexHermitianEJA._denormalized_basis(n, field) + sage: all( M.is_symmetric() for M in B) + True + + """ + R = PolynomialRing(field, 'z') + z = R.gen() + F = field.extension(z**2 + 1, 'I') + I = F.gen() + # This is like the symmetric case, but we need to be careful: + # + # * We want conjugate-symmetry, not just symmetry. + # * The diagonal will (as a result) be real. + # + S = [] + for i in xrange(n): + for j in xrange(i+1): + Eij = matrix(F, n, lambda k,l: k==i and l==j) + 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()) + S.append(Sij_real) + Sij_imag = cls.real_embed(I*Eij - I*Eij.transpose()) + S.append(Sij_imag) + + # Since we embedded these, we can drop back to the "field" that we + # started with instead of the complex extension "F". + return ( s.change_ring(field) for s in S ) + + + def __init__(self, n, field=QQ, **kwargs): + basis = self._denormalized_basis(n,field) + super(ComplexHermitianEJA,self).__init__(field, basis, n, **kwargs) + + +class QuaternionMatrixEuclideanJordanAlgebra(MatrixEuclideanJordanAlgebra): @staticmethod - def natural_inner_product(X,Y): - 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 + def real_embed(M): + """ + Embed the n-by-n quaternion matrix ``M`` into the space of real + matrices of size 4n-by-4n by first sending each quaternion entry `z + = a + bi + cj + dk` to the block-complex matrix ``[[a + bi, + c+di],[-c + di, a-bi]]`, and then embedding those into a real + matrix. + + SETUP:: + + sage: from mjo.eja.eja_algebra import \ + ....: QuaternionMatrixEuclideanJordanAlgebra + + EXAMPLES:: + + sage: Q = QuaternionAlgebra(QQ,-1,-1) + sage: i,j,k = Q.gens() + sage: x = 1 + 2*i + 3*j + 4*k + sage: M = matrix(Q, 1, [[x]]) + sage: QuaternionMatrixEuclideanJordanAlgebra.real_embed(M) + [ 1 2 3 4] + [-2 1 -4 3] + [-3 4 1 -2] + [-4 -3 2 1] + Embedding is a homomorphism (isomorphism, in fact):: + + sage: set_random_seed() + sage: n_max = QuaternionMatrixEuclideanJordanAlgebra._max_test_case_size() + sage: n = ZZ.random_element(n_max) + sage: Q = QuaternionAlgebra(QQ,-1,-1) + sage: X = random_matrix(Q, n) + sage: Y = random_matrix(Q, n) + sage: Xe = QuaternionMatrixEuclideanJordanAlgebra.real_embed(X) + sage: Ye = QuaternionMatrixEuclideanJordanAlgebra.real_embed(Y) + sage: XYe = QuaternionMatrixEuclideanJordanAlgebra.real_embed(X*Y) + sage: Xe*Ye == XYe + True + + """ + quaternions = M.base_ring() + n = M.nrows() + if M.ncols() != n: + raise ValueError("the matrix 'M' must be square") + + F = QuadraticField(-1, 'i') + i = F.gen() + + blocks = [] + for z in M.list(): + t = z.coefficient_tuple() + a = t[0] + b = t[1] + c = t[2] + d = t[3] + cplxM = matrix(F, 2, [[ a + b*i, c + d*i], + [-c + d*i, a - b*i]]) + realM = ComplexMatrixEuclideanJordanAlgebra.real_embed(cplxM) + blocks.append(realM) + + # We should have real entries by now, so use the realest field + # we've got for the return value. + return matrix.block(quaternions.base_ring(), n, blocks) + + + + @staticmethod + def real_unembed(M): + """ + The inverse of _embed_quaternion_matrix(). + + SETUP:: + sage: from mjo.eja.eja_algebra import \ + ....: QuaternionMatrixEuclideanJordanAlgebra -class QuaternionHermitianEJA(FiniteDimensionalEuclideanJordanAlgebra): + EXAMPLES:: + + sage: M = matrix(QQ, [[ 1, 2, 3, 4], + ....: [-2, 1, -4, 3], + ....: [-3, 4, 1, -2], + ....: [-4, -3, 2, 1]]) + sage: QuaternionMatrixEuclideanJordanAlgebra.real_unembed(M) + [1 + 2*i + 3*j + 4*k] + + TESTS: + + Unembedding is the inverse of embedding:: + + sage: set_random_seed() + sage: Q = QuaternionAlgebra(QQ, -1, -1) + sage: M = random_matrix(Q, 3) + sage: Me = QuaternionMatrixEuclideanJordanAlgebra.real_embed(M) + sage: QuaternionMatrixEuclideanJordanAlgebra.real_unembed(Me) == M + True + + """ + n = ZZ(M.nrows()) + if M.ncols() != n: + raise ValueError("the matrix 'M' must be square") + if not n.mod(4).is_zero(): + raise ValueError("the matrix 'M' must be a quaternion embedding") + + # Use the base ring of the matrix to ensure that its entries can be + # multiplied by elements of the quaternion algebra. + field = M.base_ring() + Q = QuaternionAlgebra(field,-1,-1) + i,j,k = Q.gens() + + # Go top-left to bottom-right (reading order), converting every + # 4-by-4 block we see to a 2-by-2 complex block, to a 1-by-1 + # quaternion block. + elements = [] + for l in xrange(n/4): + for m in xrange(n/4): + submat = ComplexMatrixEuclideanJordanAlgebra.real_unembed( + M[4*l:4*l+4,4*m:4*m+4] ) + if submat[0,0] != submat[1,1].conjugate(): + raise ValueError('bad on-diagonal submatrix') + if submat[0,1] != -submat[1,0].conjugate(): + raise ValueError('bad off-diagonal submatrix') + z = submat[0,0].vector()[0] # real part + z += submat[0,0].vector()[1]*i # imag part + z += submat[0,1].vector()[0]*j # real part + z += submat[0,1].vector()[1]*k # imag part + elements.append(z) + + return matrix(Q, n/4, elements) + + + @classmethod + def natural_inner_product(cls,X,Y): + """ + Compute a natural inner product in this algebra directly from + its real embedding. + + SETUP:: + + sage: from mjo.eja.eja_algebra import QuaternionHermitianEJA + + TESTS: + + This gives the same answer as the slow, default method implemented + in :class:`MatrixEuclideanJordanAlgebra`:: + + sage: set_random_seed() + sage: J = QuaternionHermitianEJA.random_instance() + sage: x,y = J.random_elements(2) + sage: Xe = x.natural_representation() + sage: Ye = y.natural_representation() + sage: X = QuaternionHermitianEJA.real_unembed(Xe) + sage: Y = QuaternionHermitianEJA.real_unembed(Ye) + sage: expected = (X*Y).trace().coefficient_tuple()[0] + sage: actual = QuaternionHermitianEJA.natural_inner_product(Xe,Ye) + sage: actual == expected + True + + """ + return RealMatrixEuclideanJordanAlgebra.natural_inner_product(X,Y)/4 + + +class QuaternionHermitianEJA(QuaternionMatrixEuclideanJordanAlgebra, + KnownRankEJA): """ The rank-n simple EJA consisting of self-adjoint n-by-n quaternion matrices, the usual symmetric Jordan product, and the @@ -1502,12 +1753,23 @@ class QuaternionHermitianEJA(FiniteDimensionalEuclideanJordanAlgebra): sage: from mjo.eja.eja_algebra import QuaternionHermitianEJA + EXAMPLES: + + In theory, our "field" can be any subfield of the reals:: + + sage: QuaternionHermitianEJA(2, AA) + Euclidean Jordan algebra of dimension 6 over Algebraic Real Field + sage: QuaternionHermitianEJA(2, RR) + Euclidean Jordan algebra of dimension 6 over Real Field with + 53 bits of precision + TESTS: - The dimension of this algebra is `n^2`:: + The dimension of this algebra is `2*n^2 - n`:: sage: set_random_seed() - sage: n = ZZ.random_element(1,4) + sage: n_max = QuaternionHermitianEJA._max_test_case_size() + sage: n = ZZ.random_element(1, n_max) sage: J = QuaternionHermitianEJA(n) sage: J.dimension() == 2*(n^2) - n True @@ -1515,10 +1777,8 @@ class QuaternionHermitianEJA(FiniteDimensionalEuclideanJordanAlgebra): The Jordan multiplication is what we think it is:: sage: set_random_seed() - sage: n = ZZ.random_element(1,4) - sage: J = QuaternionHermitianEJA(n) - sage: x = J.random_element() - sage: y = J.random_element() + sage: J = QuaternionHermitianEJA.random_instance() + sage: x,y = J.random_elements(2) sage: actual = (x*y).natural_representation() sage: X = x.natural_representation() sage: Y = y.natural_representation() @@ -1533,23 +1793,11 @@ class QuaternionHermitianEJA(FiniteDimensionalEuclideanJordanAlgebra): 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(1,4) - 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 - Our natural basis is normalized with respect to the natural inner product unless we specify otherwise:: sage: set_random_seed() - sage: n = ZZ.random_element(1,4) - sage: J = QuaternionHermitianEJA(n) + sage: J = QuaternionHermitianEJA.random_instance() sage: all( b.norm() == 1 for b in J.gens() ) True @@ -1560,51 +1808,73 @@ class QuaternionHermitianEJA(FiniteDimensionalEuclideanJordanAlgebra): the operator is self-adjoint by the Jordan axiom:: sage: set_random_seed() - sage: n = ZZ.random_element(1,5) - sage: x = QuaternionHermitianEJA(n).random_element() + sage: x = QuaternionHermitianEJA.random_instance().random_element() sage: x.operator().matrix().is_symmetric() True """ - def __init__(self, n, field=QQ, normalize_basis=True, **kwargs): - S = _quaternion_hermitian_basis(n, field) + @classmethod + def _denormalized_basis(cls, n, field): + """ + Returns a basis for the space of quaternion Hermitian n-by-n matrices. - if n > 1 and normalize_basis: - # 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 = [ s.change_ring(field) for s in S ] - self._basis_normalizers = tuple( - ~(self.natural_inner_product(s,s).sqrt()) for s in S ) - S = tuple( s*c for (s,c) in zip(S,self._basis_normalizers) ) + 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. - Qs = _multiplication_table_from_matrix_basis(S) + SETUP:: - fdeja = super(QuaternionHermitianEJA, self) - return fdeja.__init__(field, - Qs, - rank=n, - natural_basis=S, - **kwargs) + sage: from mjo.eja.eja_algebra import QuaternionHermitianEJA - @staticmethod - def natural_inner_product(X,Y): - Xu = _unembed_quaternion_matrix(X) - Yu = _unembed_quaternion_matrix(Y) - # The trace need not be real; consider Xu = (i*I) and Yu = I. - # The result will be a quaternion algebra element, which doesn't - # have a "vector" method, but does have coefficient_tuple() method - # that returns the coefficients of 1, i, j, and k -- in that order. - return ((Xu*Yu).trace()).coefficient_tuple()[0] + TESTS:: + + sage: set_random_seed() + sage: n = ZZ.random_element(1,5) + sage: B = QuaternionHermitianEJA._denormalized_basis(n,QQ) + sage: all( M.is_symmetric() for M in B ) + True + + """ + Q = QuaternionAlgebra(QQ,-1,-1) + I,J,K = Q.gens() + # This is like the symmetric case, but we need to be careful: + # + # * We want conjugate-symmetry, not just symmetry. + # * The diagonal will (as a result) be real. + # + S = [] + for i in xrange(n): + for j in xrange(i+1): + Eij = matrix(Q, n, lambda k,l: k==i and l==j) + 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()) + S.append(Sij_real) + Sij_I = cls.real_embed(I*Eij - I*Eij.transpose()) + S.append(Sij_I) + Sij_J = cls.real_embed(J*Eij - J*Eij.transpose()) + S.append(Sij_J) + Sij_K = cls.real_embed(K*Eij - K*Eij.transpose()) + S.append(Sij_K) + + # Since we embedded these, we can drop back to the "field" that we + # started with instead of the quaternion algebra "Q". + return ( s.change_ring(field) for s in S ) + + + def __init__(self, n, field=QQ, **kwargs): + basis = self._denormalized_basis(n,field) + super(QuaternionHermitianEJA,self).__init__(field, basis, n, **kwargs) -class JordanSpinEJA(FiniteDimensionalEuclideanJordanAlgebra): +class JordanSpinEJA(FiniteDimensionalEuclideanJordanAlgebra, KnownRankEJA): """ The rank-2 simple EJA consisting of real vectors ``x=(x0, x_bar)`` with the usual inner product and jordan product ``x*y = @@ -1641,23 +1911,12 @@ class JordanSpinEJA(FiniteDimensionalEuclideanJordanAlgebra): 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, **kwargs): V = VectorSpace(field, n) - mult_table = [[V.zero() for j in range(n)] for i in range(n)] - for i in range(n): - for j in range(n): + mult_table = [[V.zero() for j in xrange(n)] for i in xrange(n)] + for i in xrange(n): + for j in xrange(n): x = V.gen(i) y = V.gen(j) x0 = x[0] @@ -1690,10 +1949,8 @@ class JordanSpinEJA(FiniteDimensionalEuclideanJordanAlgebra): over `R^n`:: 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: J = JordanSpinEJA.random_instance() + sage: x,y = J.random_elements(2) sage: X = x.natural_representation() sage: Y = y.natural_representation() sage: x.inner_product(y) == J.natural_inner_product(X,Y) @@ -1701,3 +1958,40 @@ class JordanSpinEJA(FiniteDimensionalEuclideanJordanAlgebra): """ return x.to_vector().inner_product(y.to_vector()) + + +class TrivialEJA(FiniteDimensionalEuclideanJordanAlgebra, KnownRankEJA): + """ + The trivial Euclidean Jordan algebra consisting of only a zero element. + + SETUP:: + + sage: from mjo.eja.eja_algebra import TrivialEJA + + EXAMPLES:: + + sage: J = TrivialEJA() + sage: J.dimension() + 0 + sage: J.zero() + 0 + sage: J.one() + 0 + sage: 7*J.one()*12*J.one() + 0 + sage: J.one().inner_product(J.one()) + 0 + sage: J.one().norm() + 0 + sage: J.one().subalgebra_generated_by() + Euclidean Jordan algebra of dimension 0 over Rational Field + sage: J.rank() + 0 + + """ + def __init__(self, field=QQ, **kwargs): + mult_table = [] + fdeja = super(TrivialEJA, self) + # The rank is zero using my definition, namely the dimension of the + # largest subalgebra generated by any element. + return fdeja.__init__(field, mult_table, rank=0, **kwargs)