X-Git-Url: http://gitweb.michael.orlitzky.com/?a=blobdiff_plain;f=mjo%2Feja%2FTODO;h=427a9539bb69aa4ab25e0687f0336a09377d57e0;hb=2eb57d9d9487ef2533c177d2771a7c47b2528c4b;hp=98314cea72c13f0d58a54f2e16ad0067e740336b;hpb=a7fa05ef3da8b47cc4962de23e1313a5f6ef6374;p=sage.d.git diff --git a/mjo/eja/TODO b/mjo/eja/TODO index 98314ce..427a953 100644 --- a/mjo/eja/TODO +++ b/mjo/eja/TODO @@ -1,23 +1,24 @@ -1. Add CartesianProductEJA. +1. Finish DirectSumEJA: add to_matrix(), random_instance(), + one()... methods. Make it subclass RationalBasisEuclideanJordanAlgebra. + This is not a general direct sum / cartesian product implementation, + it's used only with the other rationalbasis algebras (to make non- + simple EJAs out of the simple ones). -2. Check the axioms in the constructor when check != False? +2. Add references and start citing them. -3. Add references and start citing them. +3. Implement the octonion simple EJA. -4. Implement the octonion simple EJA. +4. Pre-cache charpoly for some small algebras? -5. Factor out the unit-norm basis (and operator symmetry) tests once - all of the algebras pass. +RealSymmetricEJA(4): -6. Implement spectral projector decomposition for EJA operators - using jordan_form() or eigenmatrix_right(). I suppose we can - ignore the problem of base rings for now and just let it crash - if we're not using AA as our base field. +sage: F = J.base_ring() +sage: a0 = (1/4)*X[4]**2*X[6]**2 - (1/2)*X[2]*X[5]*X[6]**2 - (1/2)*X[3]*X[4]*X[6]*X[7] + (F(2).sqrt()/2)*X[1]*X[5]*X[6]*X[7] + (1/4)*X[3]**2*X[7]**2 - (1/2)*X[0]*X[5]*X[7]**2 + (F(2).sqrt()/2)*X[2]*X[3]*X[6]*X[8] - (1/2)*X[1]*X[4]*X[6*X[8] - (1/2)*X[1]*X[3]*X[7]*X[8] + (F(2).sqrt()/2)*X[0]*X[4]*X[7]*X[8] + (1/4)*X[1]**2*X[8]**2 - (1/2)*X[0]*X[2]*X[8]**2 - (1/2)*X[2]*X[3]**2*X[9] + (F(2).sqrt()/2)*X[1]*X[3]*X[4]*X[9] - (1/2)*X[0]*X[4]**2*X[9] - (1/2)*X[1]**2*X[5]*X[9] + X[0]*X[2]*X[5]*X[9] -7. Do we really need to orthonormalize the basis in a subalgebra? - So long as we can decompose the operator (which is invariant - under changes of basis), who cares? +5. Compute the scalar in the general natural_inner_product() for + matrices, so no overrides are necessary. Actually, this is + probably better implemented as a dimension_over_reals() method + that returns 1, 2, or 4. -8. Ensure that we can construct all algebras over both AA and RR. - -9. Check that our field is a subring of RLF. +6. The main EJA element constructor is happy to convert between + e.g. HadamardEJA(3) and JordanSpinEJA(3).