Let be an matrix and be a sequence of vectors. We consider the problem to find vectors such that:
We assume that the vectors are not known simultaneously. In particular, it is quite a common situation that the th problem has to be solved before becomes available, for example in the context of the simplified Newton iteration, see [24].
factorization is a way to organize the classical Gauss elimination method in such a way that the computation is done in two steps:
- A factorization step of the matrix to get matrices in triangular form
- A relatively cheap backward and forward elimination step that works on the instances of and benefits from the more time-consuming factorization step
The method also uses the fact that if is a permutation matrix such that is the original matrix with its rows permuted, the two systems and have the same...