which may be written in a form analogous to (23) as:
um Wu PTE | ; à es
Xo Ma ‘2 witn Ae. * Ap - Ag A, Aj.
À
Jo - Ag, A, 4
Ao
The computation of X, is then carried out with formula (26).
Because the sequence of the steps in the process of partitioning is in
no way restricted, it is possible to write as in (28) and (26)
X s AU A, ' with Ar 3 A “Ap Ag Ag (29)
M = L- Ar Ag de
and of 1 d
Xo = A» La - A» Ag; Xi (30)
The method just described obviously eliminates one of the two groups of
unknowns as chosen by the process of partitioning and solves for the other
group. If the method is used to partition & system of normal equations at
any point along its diagonal, it follows from the symmetry of such a system
that Al = As , Further, it can be shown that in such a case the
matrix AS in (28) and correspondingly the matrix AT in (29) are again
symmetrically arranged square matrices.
Because the matrix AP HAT . in formula (21) is non-singular in
our problem, we may apply the method of partitioning as Just described for the
purpose of eliminating the k-values from the original normal equation system,
The reduced normal equation system is, according to formula (27),
[87 (aP~'AT)" B]a = B(APT'AN)'L (31)
22
pra EEE
