I don't think there exists a method for your specific problem, but with a little thought you might be able to build an algorithm from the low-level BLAS routines that are wrapped in SciPy. For example, dgemm
, dsymm
, and dtrmm
do general, symmetric, and triangular matrix products respectively. Here's an example of using them:
from scipy.linalg.blas import dgemm, dsymm, dtrmm
A = np.random.rand(10, 10)
B = np.random.rand(10, 10)
S = np.dot(A, A.T) # symmetric matrix
T = np.triu(S) # upper triangular matrix
# normal matrix-matrix product
assert np.allclose(dgemm(1, A, B), np.dot(A, B))
# symmetric mat-mat product using only upper-triangle
assert np.allclose(dsymm(1, T, B), np.dot(S, B))
# upper-triangular mat-mat product
assert np.allclose(dtrmm(1, T, B), np.dot(T, B))
There are many other low-level BLAS routines available; I find the NETLIB page to be a good resource to learn what they do. You may be able to cleverly use some combination of the available routines to efficiently solve the problem you have in mind.
Edit: it looks like there are LAPACK routines that quickly compute exactly what you want: dsytrd or zhetrd, but unfortunately these don't appear to be wrapped directly in scipy.linalg.lapack
, though scipy does provide cython wrappers for them. Best of luck!