Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(Darren Dugan) #1

18.13 EXERCISES


[ You will find it convenient to use
∫∞

−∞

x^2 ne−x

2
dx=

(2n)!


π
22 nn!
for integern≥0. ]
18.9 By initially writingy(x)asx^1 /^2 f(x) and then making subsequent changes of
variable, reduce Stokes’ equation,


d^2 y
dx^2

+λxy=0,

to Bessel’s equation. Hence show that a solution that is finite atx=0isa
multiple ofx^1 /^2 J 1 / 3 (^23


λx^3 ).
18.10 By choosing a suitable form forhin their generating function,


G(z, h)=exp

[


z
2

(


h−

1


h

)]


=


∑∞


n=−∞

Jn(z)hn,

show that integral repesentations of the Bessel functions of the first kind are
given, for integralm,by

J 2 m(z)=

(−1)m
π

∫ 2 π

0

cos(zcosθ)cos2mθ dθ m≥ 1 ,

J 2 m+1(z)=

(−1)m+1
π

∫ 2 π

0

cos(zcosθ) sin(2m+1)θdθ m≥ 0.

18.11 Identify the series for the following hypergeometric functions, writing them in
terms of better known functions:


(a) F(a, b, b;z),
(b)F(1, 1 ,2;−x),
(c) F(^12 , 1 ,^32 ;−x^2 ),
(d)F(^12 ,^12 ,^32 ;x^2 ),
(e) F(−a, a,^12 ;sin^2 x); this is a much more difficult exercise.

18.12 By making the substitutionz=(1−x)/2 and suitable choices fora,bandc,
convert the hypergeometric equation,


z(1−z)

d^2 u
dz^2

+[c−(a+b+1)z]

du
dz

−abu=0,

into the Legendre equation,

(1−x^2 )

d^2 y
dx^2

− 2 x

dy
dx

+(+1)y=0.

Hence, using the hypergeometric series, generate the Legendre polynomialsP(x)
for the integer values=0, 1 , 2 ,3. Comment on their normalisations.
18.13 Find a change of variable that will allow the integral


I=


∫∞


1


u− 1
(u+1)^2

du

to be expressed in terms of the beta function, and so evaluate it.
18.14 Prove that, ifmandnare both greater than−1, then


I=


∫∞


0

um
(au^2 +b)(m+n+2)/^2

du=

Γ[^12 (m+1)]Γ[^12 (n+1)]
2 a(m+1)/^2 b(n+1)/^2 Γ[^12 (m+n+2)]

.

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