Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(Darren Dugan) #1

25.6 STOKES’ EQUATION AND AIRY INTEGRALS


(a)

(a)

(b)

(b)

(c)

(c)

y

z

Figure 25.9 Behaviour of the solutionsy(z)ofStokes’equationnearz=0
for various values ofλ=−y′(0). (a) withλsmall, (b) withλlarge and (c) with
λappropriate to the Airy function Ai(z).

happen in the regionz>0. For definiteness and ease of illustration (see figure


25.9), let us suppose that bothyandz, and hence the derivatives ofy, are real and


thaty(0) is positive; if it were negative, our conclusions would not be changed


since equation (25.32) is invariant undery(z)→−y(z). The only difference would


be that all plots ofy(z) would be reflected in thez-axis.


We first note thatd^2 y/dx^2 , and hence also the curvature of the plot, has the

same sign asz, i.e. it has positive curvature whenz>0, for so long asy(z)


remains positive there. What will happen to the plot forz>0 therefore depends


crucially on the value ofy′(0). If this slope is positive or only slightly negative


the positive curvature will carry the plot, either immediately or ultimately, further


away from thez-axis. On the other hand, ify′(0) is negative but sufficiently large


in magnitude, the plot will cross they= 0 line; if this happens the sign of the


curvature reverses and again the plot will be carried ever further from thez-axis,


only this time towards large negative values.


Between these two extremes it seems at least plausible that there is a particular

negative value ofy′(0) that leads to a plot that approaches thez-axis asymptot-


ically, never crosses it (and so always has positive curvature), and has a slope


that, whilst always negative, tends to zero in magnitude. There is such a solu-


tion, known as Ai(z), whose properties we will examine further in the following


subsections. The three cases are illustrated in figure 25.9.


The behaviour of the solutions of (25.32) in the regionz<0 is more straight-
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