Mathematical Methods for Physics and Engineering : A Comprehensive Guide

24.7 CONFORMAL TRANSFORMATIONS

point of intersection. Since any finite-length tangent may be curved,wiis more

strictly given bywi−w 0 =ρiexpi(φi+δφi), whereδφi→0asρi→0, i.e. as

ρ→0.

Now sincew=g(z), wheregis analytic, we have

lim

z 1 →z 0

(

w 1 −w 0

z 1 −z 0

)

= lim

z 2 →z 0

(

w 2 −w 0

z 2 −z 0

)

=

dg

dz

∣

∣

∣

∣

z=z 0

,

which may be written as

lim

ρ→ 0

{

ρ 1

ρ

exp[i(φ 1 +δφ 1 −θ 1 )]

}

= lim

ρ→ 0

{

ρ 2

ρ

exp[i(φ 2 +δφ 2 −θ 2 )]

}

=g′(z 0 ).

(24.25)

Comparing magnitudes and phases (i.e. arguments) in the equalities (24.25) gives

the stated results (ii) and (iii) and adds quantitative information to them, namely

that forsmallline elements

ρ 1

ρ

≈

ρ 2

ρ

≈|g′(z 0 )|, (24.26)

φ 1 −θ 1 ≈φ 2 −θ 2 ≈argg′(z 0 ). (24.27)

For strict comparison with result (ii), (24.27) must be written asθ 1 −θ 2 =φ 1 −φ 2 ,

with an ordinary equality sign, since the angles are only defined in the limit

ρ→0 when (24.27) becomes a true identity. We also see from (24.26) that

the linear magnification factor is|g′(z 0 )|; similarly, small areas are magnified by

|g′(z 0 )|^2.

Since in the neighbourhoods of corresponding points in a transformation angles

are preserved and magnifications are independent of direction, it follows that small

plane figures are transformed into figures of the same shape, but, in general, ones

that are magnified and rotated (though not distorted). However, we also note

that at points whereg′(z) = 0, the angle argg′(z) through which line elements are

rotated is undefined; these are calledcritical pointsof the transformation.

The final result (iv) is perhaps the most important property of conformal

transformations. Iff(z) is an analytic function ofzandz=h(w) is also analytic,

thenF(w)=f(h(w)) is analytic inw. Its importance lies in the further conclusions

it allows us to draw from the fact that, sincefis analytic, the real and imaginary

parts off=φ+iψare necessarily solutions of

∂^2 φ

∂x^2

+

∂^2 φ

∂y^2

= 0 and

∂^2 ψ

∂x^2

+

∂^2 ψ

∂y^2

=0. (24.28)

Since the transformation property ensures thatF=Φ+iΨ is also analytic, we

can conclude that its real and imaginary parts must themselves satisfy Laplace’s

equation in thew-plane:

∂^2 Φ

∂r^2

+

∂^2 Φ

∂s^2

= 0 and

∂^2 Ψ

∂r^2

+

∂^2 Ψ

∂s^2

=0. (24.29)