The alternative-triangular inethodunder the inner product structure
Ni N2-1
(1t, vL = L L 11i,i2 vi,i2 h1 h2.
i1=l i2=l
The inner product (1t, v] 2 can be introduced in a similar way.689Knowing b and ~, it is not difficult to determine the values of 17, / 1 ,
/ 2 and~ and, after this, to estimate the number of the iterations required
in such n1atters.
Available data processing is a special starting procedure in the further
comparison of three rnethods in line with established priorities by having
recourse to the model problem (35) that we have set up on a square grid
h 1 = h 2 = h in the square G with the unit sides (! 1 = [ 2 = 1). Plain
calculations show that. 7r h
- = sm^2 - ,
2
2 y'rj 7r h
~ = ~ 2 y'rj = 2 sin -.
l+J17 2For srnall value.s " 2 h ~ 1 we might have0.29 2 2 9
n (c) ~ --In - = - for c = 2 e-^10 ~ 10-^4.
0 v'h c Jh
The first criterion among others is the number of the iterations in the
following three schemes:
h SIS SCP ATM1/10^200 32 9
1/50 5000 160 21
1/100 20000 320 29We present below the algorithm of finding the ( k + 1 )th iteration from
the equation(38)
k k k k k
F = By - Tk+l (A y - <p) = By + Tk+l (Av + !) ,