Mathematical Methods for Physics and Engineering : A Comprehensive Guide

18.5 BESSEL FUNCTIONS

We note that Bessel functions of half-integer order are expressible in closed form

in terms of trigonometric functions, as illustrated in the following example.

Find the general solution of

x^2 y′′+xy′+(x^2 −^14 )y=0.

This is Bessel’s equation withν=1/2, so from (18.80) the general solution is simply

y(x)=c 1 J 1 / 2 (x)+c 2 J− 1 / 2 (x).

However, Bessel functions of half-integral order can be expressed in terms of trigonometric
functions. To show this, we note from (18.79) that

J± 1 / 2 (x)=x±^1 /^2

∑∞

n=0

(−1)nx^2 n

22 n±^1 /^2 n!Γ(1 +n±^12 )

.

Using the fact that Γ(x+1)=xΓ(x)andΓ(^12 )=

√

π,wefindthat,forν=1/2,

J 1 / 2 (x)=

(^12 x)^1 /^2

Γ(^32 )

−

(^12 x)^5 /^2

1!Γ(^52 )

+

(^12 x)^9 /^2

2!Γ(^72 )

−···

=

(^12 x)^1 /^2

(^12 )

√

π

−

(^12 x)^5 /^2

1!(^32 )(^12 )

√

π

+

(^12 x)^9 /^2

2!(^52 )(^32 )(^12 )

√

π

−···

=

(^12 x)^1 /^2

(^12 )

√

π

(

1 −

x^2

3!

+

x^4

5!

−···

)

=

(^12 x)^1 /^2

(^12 )

√

π

sinx

x

=

√

2

πx

sinx,

whereas forν=− 1 /2weobtain

J− 1 / 2 (x)=

(^12 x)−^1 /^2

Γ(^12 )

−

(^12 x)^3 /^2

1!Γ(^32 )

+

(^12 x)^7 /^2

2!Γ(^52 )

−···

=

(^12 x)−^1 /^2

√

π

(

1 −

x^2

2!

+

x^4

4!

−···

)

=

√

2

πx

cosx.

Therefore the general solution we require is

y(x)=c 1 J 1 / 2 (x)+c 2 J− 1 / 2 (x)=c 1

√

2

πx

sinx+c 2

√

2

πx

cosx.

18.5.2 Bessel functions for integerν

The definition of the Bessel functionJν(x) given in (18.79) is, of course, valid for

all values ofν, but, as we shall see, in the case of integerνthe general solution of

Bessel’s equation cannot be written in the form (18.80). Firstly, let us consider the

caseν= 0, so that the two solutions to the indicial equation are equal, and we

clearly obtain only one solution in the form of a Frobenius series. From (18.79),