20.3 Linear Fractional Transformations

INTRODUCTION

In many applications that involve boundary-value problems associated with Laplace’s equation, it is necessary to find a conformal mapping that maps a disk onto the half-plane v ≥ 0. Such a mapping would have to map the circular boundary of the disk to the boundary line of the half-plane. An important class of elementary conformal mappings that map circles to lines (and vice versa) are the fractional transformations. In this section we will define and study this special class of mappings.

Linear Fractional Transformation

If a, b, c, and d are complex constants with ad − bc ≠ 0, then the complex function defined by

is called a linear fractional transformation. Since

T is conformal at z provided Δ = ad − bc ≠ 0 and z ≠ −d/c. (If Δ = 0, then T′(z) = 0 and T(z) would be a constant function.) Linear fractional transformations are circle preserving in a sense that we will make precise in this section, and, as we saw in Example 7 of Section 20.2, they can be useful in solving Dirichlet problems in regions bounded by circles.

Note that when c ≠ 0, T(z) has a simple pole at z₀ = −d/c and so

We will write T(z₀) = ∞ as shorthand for this limit. In addition, if c ≠ 0, then

and we write T(∞) = a/c.

EXAMPLE 1 A Linear Fractional Transformation

If T(z) = (2z + 1)/(z − i), compute T(0), T(∞), and T(i).

SOLUTION

Note that T(0) = 1/(−i) = i and . Since z = i is a simple pole for T(z), we have lim_z→iT(z) = ∞ and we write T(i) = ∞. ≡

Circle-Preserving Property

If c = 0, the linear fractional transformation reduces to a linear function T(z) = Az + B. We saw in Section 20.1 that such a complex mapping can be considered as the composite of a rotation, magnification, and translation. As such, a linear function will map a circle in the z-plane to a circle in the w-plane. When c ≠ 0, we can divide cz + d into az + b to obtain

(1)

If we let A = (bc − ad)/c and B = a/c, T(z) can be written as the composite of transformations:

(2)

A general linear fractional transformation can therefore be written as the composite of two linear functions and the inversion w = 1/z. Note that if z − z₁ = r and w = 1/z, then

(3)

It is not hard to show that the set of all points w that satisfy

(4)

is a line when λ = 1 and is a circle when λ > 0 and λ ≠ 1. It follows from (3) that the image of the circle z − z₁ = r under the inversion w = 1/z is a circle except when r = 1/w₁ = z₁. In the latter case, the original circle passes through the origin and the image is a line. See Figure 20.1.3. From (2), we can deduce the following theorem.

THEOREM 20.3.1 Circle-Preserving Property

A linear fractional transformation maps a circle in the z-plane to either a line or a circle in the w-plane. The image is a line if and only if the original circle passes through a pole of the linear fractional transformation.

PROOF:

We have shown that a linear function maps a circle to a circle, whereas an inversion maps a circle to a circle or a line. It follows from (2) that a circle in the z-plane will be mapped to either a circle or a line in the w-plane. If the original circle passes through a pole z₀, then T(z₀) = ∞, and so the image is unbounded. Therefore, the image of such a circle must be a line. If the original circle does not pass through z₀, then the image is bounded and must be a circle. ≡

EXAMPLE 2 Images of Circles

Find the images of the circles z = 1 and z = 2 under T(z) = (z + 2)/(z − 1). What are the images of the interiors of these circles?

SOLUTION

The circle z = 1 passes through the pole z₀ = 1 of the linear fractional transformation and so the image is a line. Since T(−1) = − and T(i) = − − i, we can conclude that the image is the line u = −. The image of the interior z < 1 is either the half-plane u < − or the half-plane u > − . Using z = 0 as a test point, T(0) = −2, and so the image is the .

The circle z = 2 does not pass through the pole and so the image is a circle. For z = 2,

Therefore, is a point on the image circle and so the image circle is symmetric with respect to the u-axis. Since T(−2) = 0 and T(2) = 4, the center of the circle is w = 2 and the image is the circle w − 2 = 2. See FIGURE 20.3.1. The image of the interior z < 2 is either the interior or the exterior of the image circle w − 2 = 2. Since T(0) = −2, we can conclude that the image is |w − 2| > 2.

A graph. The horizontal axis is labeled u and the vertical axis is labeled v. The horizontal axis ranges from minus 2 to 2. The graph shows a big circle centered at (2, 0) in the first quadrant passing through the origin. A vertical line intersects the negative horizontal axis at (minus 1, 0). The graph also shows a point at the origin, a point on the circle intersecting the horizontal axis, a point at the top right of the circle labeled T(z), a point at the bottom right of the circle labeled T(z) overbar, a point on the vertical line intersecting the horizontal axis, a point at the top of the vertical line, and a point (minus 2, 0). T(z) and T(z) overbar is joined by a dashed line. The exterior of the vertical line in the second quadrant is shaded. — FIGURE 20.3.1 Images of test points in Example 2 ≡

Constructing Special Mappings

In order to use linear fractional transformations to solve Dirichlet problems, we must construct special functions that map a given circular region R to a target region R′ in which the corresponding Dirichlet problem is solvable. Since a circular boundary is determined by three of its points, we must find a linear fractional transformation w = T(z) that maps three given points z₁, z₂, and z₃ on the boundary of R to three points w₁, w₂, and w₃ on the boundary of R′. In addition, the interior of R′ must be the image of the interior of R. See FIGURE 20.3.2.

An image has two squares. The first square is labeled R and the second square is labeled R prime. The first square has a circle inside it. The boundary of the circle has three points labeled z subscript 1, z subscript 2, and z subscript 3. The lower edge of the second square has three consecutive points labeled w subscript 1, w subscript 2, and w subscript 3. A rightward arrow from R to R prime is labeled w = T(z). — FIGURE 20.3.2 R′ is image of R under T

Matrix Methods

Matrix methods can be used to simplify many of the computations. We can associate the matrix

with T(z) = (az + b)/(cz + d).^* If T₁(z) = (a₁z + b₁)/(c₁z + d₁) and T₂(z) = (a₂z + b₂)/(c₂z + d₂), then the composite function T(z) = T₂(T₁(z)) is given by T(z) = (az + b)/(cz + d), where

(5)

If w = T(z) = (az + b)/(cz + d), we can solve for z to obtain z = (dw − b)/(−cw + a). Therefore the inverse of the linear fractional transformation T is T⁻¹(w) = (dw − b)/(−cw + a) and we associate the adjoint of the matrix A,

, (6)

with T⁻¹. The matrix adj A is the adjoint matrix of A (see Section 8.6), the matrix for T.

EXAMPLE 3 Using Matrices to Find an Inverse Transform

If T(z) = and S(z) = , find S⁻¹(T(z)).

SOLUTION

From (5) and (6), we have S⁻¹(T(z)) = (az + b)/(cz + d), where

Therefore, . ≡

Triples to Triples

The linear fractional transformation

has a zero at z = z₁, a pole at z = z₃, and T(z₂) = 1. Therefore, T(z) maps three distinct complex numbers z₁, z₂, and z₃ to 0, 1, and ∞, respectively. The term is called the cross-ratio of the complex numbers z, z₁, z₂, and z₃.

Likewise, the complex mapping S(w) = sends w₁, w₂, and w₃ to 0, 1, and ∞, and so S⁻¹ maps 0, 1, and ∞ to w₁, w₂, and w₃. It follows that the linear fractional transformation w = S⁻¹(T(z)) maps the triple z₁, z₂, and z₃ to w₁, w₂, and w₃. From w = S⁻¹(T(z)), we have S(w) = T(z) and we can conclude that

(7)

In constructing a linear fractional transformation that maps the triple z₁, z₂, and z₃ to w₁, w₂, and w₃, we can use matrix methods to compute w = S⁻¹(T(z)). Alternatively, we can substitute into (7) and solve the resulting equation for w.

EXAMPLE 4 Constructing a Linear Fractional Transformation

Construct a linear fractional transformation that maps the points 1, i, and −1 on the circle z = 1 to the points −1, 0, and 1 on the real axis.

SOLUTION

Substituting into (7), we have

Solving for w, we obtain w = −i(z − i)/(z + i). Alternatively, we could use the matrix method to compute w = S⁻¹(T(z)). ≡

When z_k = ∞ plays the role of one of the points in a triple, the definition of the cross-ratio is changed by replacing each factor that contains z_k by 1. For example, if z₂ = ∞, both z₂ − z₃ and z₂ − z₁ are replaced by 1, giving (z − z₁)/(z − z₃) as the cross-ratio.

EXAMPLE 5 Constructing a Linear Fractional Transformation

Construct a linear fractional transformation that maps the points ∞, 0, and 1 on the real axis to the points 1, i, and −1 on the circle w = 1.

SOLUTION

Since z₁ = ∞, the terms z − z₁ and z₂ − z₁ in the cross product are replaced by 1. It follows that

If we use the matrix method to find w = S⁻¹(T(z)), then

and so ≡

EXAMPLE 6 Solving a Dirichlet Problem

Solve the Dirichlet problem in FIGURE 20.3.3(a) using conformal mapping by constructing a linear fractional transformation that maps the given region into the upper half-plane.

Two graphs. In the first graph, the horizontal axis is labeled x and the vertical axis is labeled y. The graph shows a big circle centered at the origin and a small circle centered on the horizontal axis. The circles are internally tangent at a point on the positive horizontal axis labeled 1. The big circle intersects the positive vertical axis at point A and the negative horizontal axis at point B. The small circle passes through the origin at a point labeled D and a point labeled C at the top of the circle in the first quadrant. The sections of the big circle in each quadrant is labeled u = 0. The section of the smaller circle in the fourth quadrant is labeled u = 1. The interior of the big circle and the exterior of the small circle is shaded. — FIGURE 20.3.3 Image of Dirichlet problem in Example 6

SOLUTION

The boundary circles z = 1 and z − = each pass through z = 1. We can therefore map each boundary circle to a line by selecting a linear fractional transformation that has z = 1 as a pole. If we further require that T(i) = 0 and T(−1) = 1, then

Since T(0) = 1 + i and T ( + i) = −1 + i, T maps the interior of the circle z = 1 onto the upper half-plane and maps the circle z − = onto the line v = 1. Figure 20.3.3(b) shows the transferred boundary conditions.

The harmonic function U(u, v) = v is the solution to the simplified Dirichlet problem in the w-plane, and so, by Theorem 20.2.2, u(x, y) = U(T(z)) is the solution to the original Dirichlet problem in the z-plane.

Since the imaginary part of T(z) = (1 − i) is , the solution is given by

The level curves u(x, y) = c can be written as

and are therefore circles that pass through z = 1. See FIGURE 20.3.4. These level curves may be interpreted as the isotherms of the steady-state temperature distribution induced by the boundary temperatures. ≡

A graph. The horizontal axis is labeled x and the vertical axis is labeled y. The graph shows six circles internally tangent at the positive horizontal axis labeled 1. The smallest circle is centered at the positive horizontal axis and passes through the origin. The second circle is labeled 0.8, the third circle is labeled 0.6, the fourth circle is labeled 0.4, and the fifth circle is labeled 0.2. — FIGURE 20.3.4 Circles are level curves in Example 6

20.3 Exercises Answers to selected odd-numbered problems begin on page ANS-49.

In Problems 1–4, a linear fractional transformation is given.

(a) Compute T(0), T(1), and T(∞).

(b) Find the images of the circles z = 1 and z − 1 = 1.

(c) Find the image of the disk z ≤ 1.

T(z) =
T(z) =
T(z) =
T(z) =

In Problems 5–8, use the matrix method to compute S⁻¹(w) and S⁻¹(T(z)) for each pair of linear fractional transformations.

T(z) = and S(z) =
T(z) = and S(z) =
T(z) = and S(z) =
T(z) = and S(z) =

In Problems 9–16, construct a linear fractional transformation that maps the given triple z₁, z₂, and z₃ to the triple w₁, w₂, and w₃.

−1, 0, 2 to 0, 1, ∞
i, 0, −i to 0, 1, ∞
0, 1, ∞ to 0, i, 2
0, 1, ∞ to 1 + i, 0, 1 − i
−1, 0, 1 to i, ∞, 0
−1, 0, 1 to ∞, −i, 1
1, i, −i to −1, 0, 3
1, i, −i to i, −i, 1
Use the results in Example 2 and the harmonic function U = (log_e r)/(log_e r₀) to solve the Dirichlet problem in FIGURE 20.3.5. Explain why the level curves must be circles.

FIGURE 20.3.5 Dirichlet problem in Problem 17
Use the linear fractional transformation that maps −1, 1, 0 to 0, 1, ∞ to solve the Dirichlet problem in FIGURE 20.3.6. Explain why, with one exception, all level curves must be circles. Which level curve is a line?

FIGURE 20.3.6 Dirichlet problem in Problem 18
Derive the conformal mapping H-1 in the conformal mappings in Appendix D.
Derive the conformal mapping H-5 in the conformal mappings in Appendix D by first mapping 1, i, −1 to ∞, i, 0.
Show that the composite of two linear fractional transformations is a linear fractional transformation and verify (5).
If w₁ ≠ w₂ and λ > 0, show that the set of all points w that satisfy w − w₁ = λw − w₂ is a line when λ = 1 and is a circle when λ ≠ 1. [Hint: Write as w − w₁² = λ²w − w₂² and expand.]

*The matrix A is not unique since the numerator and denominator in T(z) can be multiplied by a nonzero constant.