There are many situations where the factors of the Cholesky decompositon are needed. One of them, very important for many number smashers, regards the solution of the generalized eigenvalue problem:
find (L, X) (L real and X vector) such that
K X = L M X
where K,M are symmetric positive definite matrices.
The generalized problem could be transformed into a classical eigenvalue problem, retaining the symmetry and posiveness of the matrix operator A:
A X = 1/L X
where A depends on K,M. Using A Lanczos or a subspace iteration method for this problem (when coming from the generalized one) requires access to the factors of K (or M).
Please note that generalized eigenvalue analysis is a very common task in many engineering sciences.
