Homogeneous difference schemes for the heat conduction 467The coefficient at the member Yi becomes non-negative for( 17)h2
T < ( 2 1 - CJ) c '
2
which assures us of the validity of the relationsllFJ lie < llYJ lie+ T ll\0^1 lie
and
j
(18) lluJ+
1
llc < llu111c + r ll\OJllc < llu
0
llc +I: T ll\011
llc ·
j'=OSummarizing, the weighted sche111e (9) is stable in the space C, provided
condition ( 17) holds. For the purely implicit scheme with CJ = 1 estimate
(18) is valid for any value of T.
The accurate account of the accuracy is stipulated by more a detailed
exploration of the residual'ljJ = A (CJ u + ( 1 - CJ) u) + \0 - ut
on the solution u of the original problem (1)-(3). Upon substituting the
expans10ns1l + U T T - 2
1l = 2 + 2 Ut = fi + 2 ll + 0( T ) ,1l + U T _ T -; 2
U =
2- 2 Ut = 1l - 2 U + 0( T ) ,
- 2
ut = u + O(r )
with the members. OU
U=-
Oi
it is plain to calculate the residual
=(Au+.f-u)
+(Au - Lu)+ (\0 - .fl+ (CJ - 0.5) r A 1t + O(r^2 ).