1549301742-The_Theory_of_Difference_Schemes__Samarskii

(jair2018) #1
Other problems 191

We now estimate the accuracy of scheme (38). Substituting into (38)
y = z + u, where u is a solution of problem (26)-(27) and y is a solution of
problem (38), we may set up the problem for the enor z = y - u:

1
Az = - ( ( 7' r -! h) a z,~) r - dz = -1/J , 0 < 7' = ih < 1 '
( 41)

where 1/J and v are the errors of approximation to the equation

( 42)

and the boundary condition

(43) v=


respectively.
The balance equation (30) with regard to ijJ gives


1 o/,*
1/J; = -;:.^1 7r, i + 'Yi '
'

Next, we set r = r; +sh and develop the expansion of integrals involved in
the formula for 1/J; in powers of h:


r;+1;2 1/2


  • 1


1
j f(r) r dr = ]:__ j f(r; +sh) (r; +sh) ds
I 7'; 7';
r,:-1;2 -1/2

l /2
j f(r; +sh)
-1/2

1/ 2
ds + ~ j (f; + shf; + O(h^2 )) s ds
-1/2

h2 I 2)
= f; + - f. + O(h.
12 7' '
'
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