The maximum principle 265Theore1n 4 Let the conditionsD(P) = 00
for P E w, D(P)>O for PEw*hold, where~ is a connected grid. Then for a solution of problem ( 16) with
the right-hand sideF(P) = 0 for
0
P Ew, F(P) :f: 0 for PE w*,the estimate( 18) llvlle <II~ lie.
is valid in the norm II f lie• = maxPEw* I f(P) I·
Proof Let Y(P) be a majorant and.CY= I F(P) I on the grid w, YI,,= 0,
Y > 0. The function Y (P) should attain its maximum on a finite set w +I
at some node, not belonging to the boundary, because YI,, = 0. Also, it
does not enter the grid~ clue to the connectedness of~ and the 1naximum
principle. Hence,max Y(P) = max Y(P) = Y(Po),
PEw PEw*where Po is a node on the set w*.
By the initial hypothesis, D(Po) > 0. Arguing as in the proof of
Theorem 3 we arrive at (18). An analog of the remark to Theorem 3 is still
valid for that case.
4.3 STABILITY AND CONVERGENCE OF THE DIRICHLET
DIFFERENCE PROBLEM- Estimation of a solution of the Dirichlet difference problem. vVe make
use of a priori estimates obtained in Section 2 for a grid equation of common
structure for constructing a uniform estimate of a solution of the Dirichlet
difference problem (24)-(26) arising in Section 1:
(1)
Ay = -<p
A*y= -<p
y = p(x)at the regular nodes,
at the irregular nodes,
on the boundary,