Mathematical Methods for Physics and Engineering : A Comprehensive Guide

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25.7 WKB METHODS


one function and the same function may need different expansions for
different values of argz.

Finally in this subsection we note that, although the form of equation (25.42) may


appear rather restrictive, in that it contains no term iny′, the results obtained so


far can be applied to an equation such as


d^2 y
dz^2

+P(z)

dy
dz

+Q(z)y=0. (25.56)

To make this possible, a change of either the dependent or the independent


variable is made. For the former we write


Y(z)=y(z)exp

(
1
2

∫z
P(u)du

)

d^2 Y
dz^2

+

(
Q−

1
4

P^2 −

1
2

dP
dz

)
Y=0,

whilst for the latter we introduce a new independent variableζdefined by



dz

=exp

(

∫z
P(u)du

)

d^2 y
dζ^2

+Q

(
dz

) 2
y=0.

In either case, equation (25.56) is reduced to the form of (25.42), though it


will be clear that the two sets of WKB solutions (which are, of course, only


approximations) will not be the same.


25.7.4 The Stokes phenomenon

As we saw in subsection 25.7.2, the combination of WKB solutions of a differential


equation required to reproduce the asymptotic form of the accurate solutiony(z)


of the same equation, varies according to the region of thez-plane in whichzlies.


We now consider this behaviour, known as the Stokes phenomenon, in a little


more detail.


Lety 1 (z)andy 2 (z) be the two WKB solutions of a second-order differential

equation. Then any solutionY(z) of the same equation can be written asymptot-


ically as


Y(z)∼A 1 y 1 (z)+A 2 y 2 (z), (25.57)

where, although we will be considering (abrupt) changes in them, we will continue


to refer toA 1 andA 2 as constants, as they are within any one region. In order to


produce the required change in the linear combination, as we pass over a Stokes


line from one region of thez-plane to another, one of the constants must change


(relative to the other) as the border between the regions is crossed.


At first sight, this may seem impossible without causing a discernible discon-

tinuity in the representation ofY(z). However, we must recall that the WKB


solutions are approximations, and that, as they contain a phase integral, for


certain values of argzthe phaseφ(z) will be purely imaginary and the factors

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