Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(Darren Dugan) #1

24.11 TAYLOR AND LAURENT SERIES


of orderpatz=z 0 but is analytic at every other point inside and onC.Then


the functiong(z)=(z−z 0 )pf(z) is analytic atz=z 0 , and so may be expanded


as a Taylor series aboutz=z 0 :


g(z)=

∑∞

n=0

bn(z−z 0 )n. (24.53)

Thus, for allzinsideC,f(z) will have a power series representation of the form


f(z)=

a−p
(z−z 0 )p

+···+

a− 1
z−z 0

+a 0 +a 1 (z−z 0 )+a 2 (z−z 0 )^2 +···,
(24.54)

witha−p= 0. Such a series, which is an extension of the Taylor expansion, is


called aLaurent series. By comparing the coefficients in (24.53) and (24.54), we


see thatan=bn+p. Now, the coefficientsbnin the Taylor expansion ofg(z)are


seen from (24.52) to be given by


bn=

g(n)(z 0 )
n!

=

1
2 πi


g(z)
(z−z 0 )n+1

dz,

and so for the coefficientsanin (24.54) we have


an=

1
2 πi


g(z)
(z−z 0 )n+1+p

dz=

1
2 πi


f(z)
(z−z 0 )n+1

dz,

an expression that is valid for both positive and negativen.


The terms in the Laurent series withn≥0 are collectively called theanalytic

part, whilst the remainder of the series, consisting of terms in inverse powers of


z−z 0 , is called theprincipal part. Depending on the nature of the pointz=z 0 ,


the principal part may contain an infinite number of terms, so that


f(z)=

∑+∞

n=−∞

an(z−z 0 )n. (24.55)

In this case we would expect the principal part to converge only for|(z−z 0 )−^1 |

less than some constant, i.e.outsidesome circle centred onz 0. However, the


analytic part will convergeinsidesome (different) circle also centred onz 0 .Ifthe


latter circle has the greater radius then the Laurent series will converge in the


regionRbetweenthe two circles (see figure 24.12); otherwise it does not converge


at all.


In fact, it may be shown that any functionf(z) that is analytic in a region

Rbetween two such circlesC 1 andC 2 centred onz=z 0 can be expressed as


a Laurent series aboutz 0 that converges inR. We note that, depending on the


nature of the pointz=z 0 , the inner circle may be a point (when the principal


part contains only a finite number of terms) and the outer circle may have an


infinite radius.


We may use the Laurent series of a functionf(z) about any pointz=z 0 to
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