244 Difference Schemes for· Elliptic EquationsBy the same token,UN~ II J \* UN= -^1
hWith these relations established, we arrive at the difference scheme(17)Yxx=-f(x),
A*y1=-J(x1),
xi = h 1 + ( i - 1) h,
A*yN = -f(xN), Yo = YN+ 1 = 0,
which will be convenient to be expressed with respect to the error z = y-u:(18) A z = -1/J(x), 0 < x < 1,
where Az = z.-tx for x 1 <xi< xN, Az 1 = A*z 1 and AzN = A*zN, 1/Ji
O(h^2 ) for i = 2,3, ... ,N-l, 1/Ji = 0(1) for i = l,N.
In spite of the fact that this scheme generates no approximation at
the near-boundary nodes i = 1 and i = N, scheme (17) is of second-order
accuracy in the space C': II z lie = O(h^2 ). In order to obtain this estimate
at the points x = xJJ xN, we rewrite equation (18) aswhere z 0 = hh 1 1/J 1 and zN+i = hh 2 1/JN· Thus, problem (18) is equivalent
to the following one:Z;rx = -1/J(x),
, Zo = h h11/J1 '
On account of the a priori estimate
N i
llzllc<max(lzol,lzN+1l)+I: h L hl1/Jkl,
i=l k=larising in Section 2 of Chapter 1, it is easily verified that
This means that scheme (17) provides an approximation of order 2.