21.5 INHOMOGENEOUS PROBLEMS – GREEN’S FUNCTIONS
yza−aB
A
V
x−a
|r 0 | r 1+1 r 0Figure 21.14 The arrangement of images for solving Poisson’s equation
outside a sphere of radiusacentred at the origin. For a charge +1 atr 0 ,the
image pointr 1 is given by (a/|r 0 |)^2 r 0 and the strength of the image charge is
−a/|r 0 |.By symmetry we expect the image pointr 1 to lie on the same radial line as the original
source,r 0 , as shown in figure 21.14, and sor 1 =kr 0 wherek<1. However, for a Dirichlet
Green’s function we requireG(r−r 0 )=0on|r|=a, and the form of the Green’s function
suggests that we need
|r−r 0 |∝|r−r 1 | for all|r|=a. (21.97)Referring to figure 21.14, if this relationship is to hold over the whole surface of the
sphere, then it must certainly hold for the pointsAandB. We thus require
|r 0 |−a
a−|r 1 |=
|r 0 |+a
a+|r 1 |,
which reduces to|r 1 |=a^2 /|r 0 |. Therefore the image point must be located at the position
r 1 =a^2
|r 0 |^2r 0.It may now be checked that, for this location of the image point, (21.97) is satisfied over
the whole sphere. Using the geometrical result
|r−r 1 |^2 =|r|^2 −2 a^2
|r 0 |^2r·r 0 +a^4
|r 0 |^2=a^2
|r 0 |^2(
|r 0 |^2 − 2 r·r 0 +a^2)
for|r|=a, (21.98)we see that, on the surface of the sphere,
|r−r 1 |=a
|r 0 ||r−r 0 | for|r|=a. (21.99)