Other problems^197We introduce on the segrnent 0 ::; r < R the equidistant grid w h =
{r; = ih, i = 0, 1, ... , N, hN = R} and by analogy with (31) may attempt
the scheme in the form(59) Ayi = 7'1
2 (r;_ 112 a; Yr,i)r,i - di Yi= -tpi' i=l,2, ... ,N-l.
'
At the point r = 0 we impose the difference boundary condition(60)a1 y,. o
I ' - qo Yo = - fo '
'*h = h
* 6 'and for i = N set(61)These equations adn1it the forn1 (39) and can be solved by the elimination
method. The n1ain difference fron1 the cylindrical case lies in the selection
rules for tp and d. To obtain the formulae for tp and d, we consider the
residual
(62) 1/J; = Au; + tp, = ~r. 2 (ri-^2 112 ai ur , ;) r,i. - di 1li + tpi
zand subtract from equality (62) the balance equation written on the segment
T'i-1/2 < T' < T'i+1;2
(^10) i+1/2 (^1) 'i+1/2
Wi+l/2 - Wi-1/2^1
J
2 1
J
')
0= h T'2 --- q u r dr + -- 2 fr~ dr,
z h r^2 h T'
' '"i-1/2 ' (^1) 'i-1/2
w = r^2 ku^1.
The outco111e of this is
1 *
1/J,: = r2^1 71·,i + 1/J; '
- ,2 1)^0
(^1) 7£ - (^1) i-1 /2 i )
O I
17; =a,: 1t,.; ' - (ku )i-1/2,
'
where
'"i+1/2 r,:+1/2
(63) 1/J7 dr).
1
J
f r^2 dr - (cl u - -
1
- J
= tp i - y;:--;; q u T'2
T'':' ' ' h r2
' ri-1/2 z ri-1/2