564 Econo111ical Difference Sche1nes for Multicliinensional Proble1nswhich are i1nmediate implications of the chain of the relationsEsti1nate (56) serves to 1notivate that scheme (51 )-(52) and one of its equiv-
alent sche111es, na1nely sche1ne (46)-(47) converge in the space HA with the
rate O(r^2 + lhl^4 ).Re1nark By analogy with the preceding section it is possible to evaluate
the errors of approximation for either of the equations ( 48) such as"/, _ C 1 1l -- B 2 1t n+1 ( ) n
'h - + 1 - 0"1 cp.
TThis can be done using fonnula ( 49) for the intern1ecliate value fl of artificial
character
U = 0" 1 B2un+l + (1 - 0" 1 ) C21tn.Upon substituting this fictitious value into the above formula for 1/J 1 we find
thatthereby clarifying that the quantity v'i 0" 1 coincides with the error of approx-
in1ation for the factorized schen1e ( 51) that is known to us from fonnula
(53).
By virtue of the relationwe can be pretty sure that every of the equations ( 48) generates an approx-
imation of O(lhl^4 + r^2 ).
9.2 ECONOMICAL FACTORIZED SCHEMES- Schemes with factorized operator. VVe now consider the two-layer dif-
ference scheme