Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(Darren Dugan) #1

25.6 STOKES’ EQUATION AND AIRY INTEGRALS


the integrand. Consider the contour integral


y(z)=

∫b

a

f(t) exp(zt)dt, (25.33)

in whicha,bandf(t) are all yet to be chosen. Note that the contour is in the


complext-plane and that the path fromatobcan be distorted as required so


long as no poles of the integrand are trapped between an original path and its


distortion.


Substitution of (25.33) into (25.32) yields
∫b

a

t^2 f(t) exp(zt)dt=

∫b

a

zf(t) exp(zt)dt

=[f(t) exp(zt)]ba−

∫b

a

df(t)
dt

exp(zt)dt.

If we could choose the limitsaandbso that the end-point contributions vanish


then Stokes’ equation would be satisfied by (25.33), providedf(t) satisfies


df(t)
dt

+t^2 f(t)=0 ⇒ f(t)=Aexp(−^13 t^3 ), (25.34)

whereAis any constant.


To make the end-point contributions vanish we must chooseaandbsuch that

exp(−^13 t^3 +zt) = 0 for both values oft. This can only happen if|a|→∞and


|b|→∞and, even then, only if Re (t^3 ) is positive. This condition is satisfied if


2 nπ−^12 π<3arg(t)< 2 nπ+^12 πfor some integern.

Thusaandbmust each be at infinity in one of the three shaded areas shown in


figure 25.10, but clearly not in the same area as this would lead to a zero value


for the contour integral. This leaves three contours (markedC 1 ,C 2 andC 3 in the


figure) that start and end in different sectors. However, only two of them give rise


to independent integrals since the pathC 2 +C 3 is equivalent to (can be distorted


into) the pathC 1.


The two integral functions given particular names are

Ai(z)=

1
2 πi


C 1

exp(−^13 t^3 +zt)dt (25.35)

and


Bi(z)=

1
2 π


C 2

exp(−^13 t^3 +zt)dt−

1
2 π


C 3

exp(−^13 t^3 +zt)dt.
(25.36)

Stokes’ equation is unchanged if the independent variable is changed fromz


toζ,whereζ=exp(2πi/3)z≡Ωz. This is also true for the repeated change


z→Ωζ=Ω^2 z. The same changes of variable, rotations of the complex plane


through 2π/3or4π/3, carry the three contoursC 1 ,C 2 andC 3 into each other,

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