Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(Darren Dugan) #1

PDES: SEPARATION OF VARIABLES AND OTHER METHODS


This can be rearranged to give


r^2 R′′ 1 +2rR 1 ′− 2 R 1 =−

Ar^3
 0

,


where the prime denotes differentiation with respect tor. The LHS is homogeneous and
the equation can be reduced by the substitutionr=expt, and writingR 1 (r)=S(t), to


̈S+S ̇− 2 S=−A
 0

exp 3t, (21.68)

where the dots indicate differentiation with respect tot.
This is an inhomogeneous second-order ODE with constant coefficients and can be
straightforwardly solved by the methods of subsection 15.2.1 to give


S(t)=c 1 expt+c 2 exp(− 2 t)−

A


10  0


exp 3t.

Recalling thatr=exptwe find


R 1 (r)=c 1 r+c 2 r−^2 −

A


10  0


r^3.

Since we are interested in the regionr<awe must havec 2 = 0 for the solution to remain
finite. Thus inside the charge distribution the electrostatic potential has the form


u 1 (r, θ, φ)=

(


c 1 r−

A


10  0


r^3

)


P 1 (cosθ). (21.69)

Outside the charge distribution (forr≥a), however, the electrostatic potential obeys
Laplace’s equation,∇^2 u= 0, and so given the symmetry of the problem and the requirement
thatu→∞asr→∞the solution must take the form


u 2 (r, θ, φ)=

∑∞


=0

B


r+1

P(cosθ). (21.70)

We can now use the boundary conditions atr=ato fix the constants in (21.69) and
(21.70). The requirement of continuity of the potential and its radial derivative atr=a
imply that


u 1 (a, θ, φ)=u 2 (a, θ, φ),
∂u 1
∂r

(a, θ, φ)=

∂u 2
∂r

(a, θ, φ).

ClearlyB=0for= 1; carrying out the necessary differentiations and settingr=ain
(21.69) and (21.70) we obtain the simultaneous equations


c 1 a−

A


10  0


a^3 =

B 1


a^2

,


c 1 −

3 A


10  0


a^2 =−

2 B 1


a^3

,


which may be solved to givec 1 =Aa^2 /(6 0 )andB 1 =Aa^5 /(15 0 ). SinceP 1 (cosθ)=cosθ,
the electrostatic potentials inside and outside the charge distribution are given, respectively,
by


u 1 (r, θ, φ)=

A


 0


(


a^2 r
6


r^3
10

)


cosθ, u 2 (r, θ, φ)=

Aa^5
15  0

cosθ
r^2

.

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