190 Homogeneous Difference Schemesand(37) ( k u')~ = ( q u - f)o - ( k u')~ = ~ ( qu - f)o.
Substituting (37) into formula (36) and taking into account (29), we get
v = O(h^2 ).
The difference boundary condition (34) can be expressed bya1 Y,. o
h ' - qo Yo = - fa '
*
With these, the difference scheme0 < 7' = ih < 1'
(38)
h
h* = 4 , YN = μ2,al Yr o
h ' - qo Yo = -fa '
*
is put in correspondence with problem (26)-(28).
The statement of the difference boundary-value problem for determi-
nation of Yi isA; Yi-1 - C; Yi + Ai+1 Yi+1 = -F; , i=l,2,.,,N-1,
(39)
F; = 'Pi ri ,which are supplemented with the boundary conditions( 40)whereandThis problem can be solved by the elimination method (see Chapter 1,
Section 1), for which the stability conditions are satisfied, because Ai > 0,
Ci >Ai+ Ai+l and 0 < x 1 ~ 1, x 2 = 0.