Methods for designing difference schemes 227Adopting those ideas to problem (1), (2), (14) concerning a point heat
source, an excellent start in this direction is to replace the function f ( x)
involved in formula (40) by J(x) + 8(x - ~) Q, where 8(x - ~) is Dirac's
delta-function. Recall that 8( x - ~) = 0 if x f ~, 8( x - ~) = oo if x = ~ and
J((~,' 8(x - ~) dx = 1 for any c > 0. As a final result we get( 43)1
I[u] = j [k(u')^2 + qu^2 - 2fu] dx - 2Qu(~).
0If~= xn + ()h, 0 < () < 1, then u(~) must be replaced by un for() < ~
and by un+i for () > ~, whose use permits us to establishN N-1
(44) Ih[u] =Lai (Yx,;)^2 h + L (d; Yi - 2<.pi Yi) h,and 8ik is, as usual, Kronecker's delta. Equating olh/oyi to zero we arrive
at the scheme ( ayx )x - dy = -<p with the right-hand side specified by
formulae ( 45).
In the case of a non-equidistant grid w h = { X; , i = 0, 1, ... , N, x 0 =
0, xN = 1} we obtain instead of (44)
N N-l
I h [y] = L a; ( Yx, i)^2 hi + L (di Yi - 2 'Pi Yi) Iii ·
' i = 1 i=l
In particular, it is al ways possible to choose a grid so that ~ = xn would be
one of the nodal point and
Q
'Pn = fn + fi'
n'Pi = f; , i I n.
We are led by equating the derivatives olh[u]/oy; to zero to the scheme
( 46) (ay.,Jx,i - di Y; = -<p;, i = 1, 2, ... , N - 1.