1549301742-The_Theory_of_Difference_Schemes__Samarskii

122 Basic Concepts of the Theory of Difference Schemes

Likewise, one can prove another inequality

By the same token,

y^2 (x;) < ~ (1 + E) (y; + y~) + ~ ( 1 + ~) ( 1, y~],

I [y] 12 < ~ (1 + E) (y; + y~) + ~ ( 1 + ~) ( 1, y~].

Putting E = c 1 and using the identity

(12)

we establish relation (11).

It is plain to deduce for the norm of the operator A the estimate

(13) 11 A 11 < h 4 ( 2 1 + 2 1 C2 h) ' where

Indeed '

and

where I [y] 12 = L;:~^1 YI h + ~ h ( y; + y~ ). By virtue of the relations

[Ay, y] < llAll · l[Y]l^2 ,

we get from (12) the desired estimate (13).