18.5 BESSEL FUNCTIONS
generality. The equation arises from physical situations similar to those involving
Legendre’s equation but when cylindrical, rather than spherical, polar coordinates
are employed. The variablexin Bessel’s equation is usually a multiple of a radial
distance and therefore ranges from 0 to∞.
We shall seek solutions to Bessel’s equation in the form of infinite series. Writing(18.73) in the standard form used in chapter 16, we have
y′′+1
xy′+(
1 −ν^2
x^2)
y=0. (18.74)By inspection,x= 0 is a regular singular point; hence we try a solution of the
formy=xσ
∑∞
n=0anxn. Substituting this into (18.74) and multiplying the resultingequation byx^2 −σ,weobtain
∑∞n=0[
(σ+n)(σ+n−1) + (σ+n)−ν^2]
anxn+∑∞n=0anxn+2=0,which simplifies to
∑∞n=0[
(σ+n)^2 −ν^2]
anxn+∑∞n=0anxn+2=0.Considering the coefficient ofx^0 , we obtain the indicial equation
σ^2 −ν^2 =0,and soσ=±ν. For coefficients of higher powers ofxwe find
[
(σ+1)^2 −ν^2]
a 1 =0, (18.75)
[
(σ+n)^2 −ν^2]
an+an− 2 =0 forn≥ 2. (18.76)Substitutingσ=±νinto (18.75) and (18.76), we obtain the recurrence relations
(1± 2 ν)a 1 =0, (18.77)n(n± 2 ν)an+an− 2 =0 forn≥ 2. (18.78)We consider now the form of the general solution to Bessel’s equation (18.73) for
two cases: the case for whichνis not an integer and that for which it is (including
zero).
18.5.1 Bessel functions for non-integerνIfνis a non-integer then, in general, the two roots of the indicial equation,
σ 1 =νandσ 2 =−ν, will not differ by an integer, and we may obtain two linearly
independent solutions in the form of Frobenius series. Special considerations do
arise, however, whenν=m/2form=1, 3 , 5 ,...,andσ 1 −σ 2 =2ν=mis an
(odd positive) integer. When this happens, we may always obtain a solution in