The alternative-triangular inethod 677Within these notations, Seidel rnethod can be written as follows:(4)- k+l + k.
(A +D) y +A y =f,
Alternative forms of such a two-layer scheme areand(5)k+I k k
(A-+ D) ( y - y) +A y = f.Further identification with the preceding canonical form revealsk+I k
(6)y - y k 0
B +Ay=f, k=O,l, ... ,n-1, YEH,
Tk+Iwith B = A- + D and Tk = l. This sche1ne is certainly implicit. The
matrix B concerned is triangular and, hence, it is not symn1etric, because
the operator is non-self-adjoint: B f:- B*.
On the basis on the model problemAy=-<p, xEwh, Yl,,h=O,
arising fro1n Section 2, Seidel method acquires the formso that(7)k+I k+I k k 9
Yi,-!+ Yi2-1 +Yi,+1 +Y; 2 +1 +h-t.p
4
In such a setting it see111s reasonable to begin operations at tlw node.... k+I k+l.
i 1 1, i 2 = 1 rn tern1s of known values y i,-I and y ; 2 _ 1 and the nght-
hand side of (7) at the boundary nodes (0, 1) and ( 1, 0). With knowledge
of ktl at the node i 1 = I, i 2 = 1 the values kt! are yet to be determined
along the lower row by setting i 2 = 2, 3, ... for i 1 = 1 with further transition
to the rows with i 1 = 2, 3, .... During the course of Seidel method it is
possible to get the values ktl at all grid nodes.