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Conformal Mappings - Complex Analysis, CSIR-NET Mathematical Sciences | Mathematics for IIT JAM, GATE, CSIR NET, UGC NET PDF Download

Conformal Mapping

We shall show now that the curves

u(x, y)= constant and v(x, y)= constant

intersect each other at right angles (we say that they are orthogonal). To see this we note that along the curve u(x, y)= constant we have du =0. Hence

Conformal Mappings - Complex Analysis, CSIR-NET Mathematical Sciences | Mathematics for IIT JAM, GATE, CSIR NET, UGC NET

Thus, on these curves the gradient at a general point is given by

Conformal Mappings - Complex Analysis, CSIR-NET Mathematical Sciences | Mathematics for IIT JAM, GATE, CSIR NET, UGC NET

Similarly along the curve v(x, y)= constant, we have

Conformal Mappings - Complex Analysis, CSIR-NET Mathematical Sciences | Mathematics for IIT JAM, GATE, CSIR NET, UGC NET

The product of these gradients is

Conformal Mappings - Complex Analysis, CSIR-NET Mathematical Sciences | Mathematics for IIT JAM, GATE, CSIR NET, UGC NET

where we have made use of the Cauchy-Riemann equations. We deduce that the curves are orthogonal.

As an example of the practical application of this work consider two-dimensional electrostatics.
If u = constant gives the equipotential curves then the curves v = constant are the electric lines of force. Figure 1 shows some curves from each set in the case of oppositely-charged particles near to each other; the dashed curves are the lines of force and the solid curves are the equipotentials.

Conformal Mappings - Complex Analysis, CSIR-NET Mathematical Sciences | Mathematics for IIT JAM, GATE, CSIR NET, UGC NET

In ideal fluid flow the curves v = constant are the streamlines of the flow.

In these situations the function w = u +iv is the complex potential of the field.

Conformal Mapping

A function w = f (z) can be regarded as a mapping, which ‘maps’ a point in the z-plane to a point in the w-plane. Curves in the z-plane will be mapped into curves in the w-plane.
Consider aerodynamics. The idea is that we are interested in the fluid flow, in a complicated geometry (say flow past an aerofoil). We first find the flow in a simple geometry that can be mapped to the aerofoil shape (the complex plane with a circular hole works here). Most of the calculations necessary to find physical characteristics such as lift and drag on the aerofoil can be performed in the simple geometry - the resulting integrals being much easier to evaluate than in the complicated geometry.

Consider the mapping

w = z2.

The point z = 2+i maps to w =(2 + i)2 = 3+ 4i. The point z = 2+i lies on the intersection of the two lines x =2 and y =1.To what curves do these map? To answer this question we note that a point on the line y =1 can be written as z = x +i. Then

w =(x +i)2 = x2 − 1+2xi

As usual, let w = u +iv, then

u = x2 − 1 and v =2x

Eliminating x we obtain:

4u =4x2 − 4= v2 = 4 or v2 = 4+4u.

Note that the product of the gradients at (3,4) is −1 and therefore the angle bewteen the curves at their point of intersection is also 900. Since the angle bewteen the lines and the angle between the curves is the same we say the angle is preserved.

In general, if two curves in the z -plane intersect at a point z0, and their image curves under the mapping w = f (z)intersect at w0 = f (z0) and the angle between the two original curves at z0 equals the angle between the image curves at w0 we say that the mapping is conformal at z0.

An analytic function is conformal everywhere except where f '(z)=0.

Inversion

The mapping

Conformal Mappings - Complex Analysis, CSIR-NET Mathematical Sciences | Mathematics for IIT JAM, GATE, CSIR NET, UGC NET

is called an inversion.It maps the interior of the unit circle in the z -plane to the exterior of the unit circle in the w-plane, and vice-versa. Note that

Conformal Mappings - Complex Analysis, CSIR-NET Mathematical Sciences | Mathematics for IIT JAM, GATE, CSIR NET, UGC NET and similarly Conformal Mappings - Complex Analysis, CSIR-NET Mathematical Sciences | Mathematics for IIT JAM, GATE, CSIR NET, UGC NET

so that

Conformal Mappings - Complex Analysis, CSIR-NET Mathematical Sciences | Mathematics for IIT JAM, GATE, CSIR NET, UGC NET

A line through the origin in the z-plane will be mapped into a line through the origin in the w-plane. To see this consider the line y = mx, for m constant. Then

Conformal Mappings - Complex Analysis, CSIR-NET Mathematical Sciences | Mathematics for IIT JAM, GATE, CSIR NET, UGC NET

so that v = −mu, which is a line through the origin in the w-plane.

Similarly, it can be shown that a circle in the z -plane passing through the origin maps to a line in the w-plane which does not pass through the origin and a circle in the z-plane which does not pass through the origin maps to a circle in the w-plane which does not pass through the origin. The inversion mapping is an example of the bilinear transformation:

Conformal Mappings - Complex Analysis, CSIR-NET Mathematical Sciences | Mathematics for IIT JAM, GATE, CSIR NET, UGC NET  where we demand that ad − bc ≠ 0

(If ad − bc =0 the mapping reduces to f (z)= constant).

The document Conformal Mappings - Complex Analysis, CSIR-NET Mathematical Sciences | Mathematics for IIT JAM, GATE, CSIR NET, UGC NET is a part of the Mathematics Course Mathematics for IIT JAM, GATE, CSIR NET, UGC NET.
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FAQs on Conformal Mappings - Complex Analysis, CSIR-NET Mathematical Sciences - Mathematics for IIT JAM, GATE, CSIR NET, UGC NET

1. What is a conformal mapping?
Ans. A conformal mapping is a function between two complex manifolds that preserves angles locally. In other words, it is a mapping that preserves the shapes of small figures and the angles between intersecting curves.
2. How are conformal mappings used in complex analysis?
Ans. Conformal mappings are used in complex analysis to study the properties of analytic functions. They allow us to map complicated regions in the complex plane to simpler regions, making it easier to analyze the behavior of functions.
3. Can conformal mappings be used to solve practical problems?
Ans. Yes, conformal mappings have various practical applications. They are used in fluid dynamics to map complex flow regions to simpler ones, in electrostatics to solve boundary value problems, and in computer graphics to deform objects while preserving their local shapes.
4. Are all conformal mappings bijective?
Ans. No, not all conformal mappings are bijective. While a conformal mapping must preserve angles, it does not necessarily have to be one-to-one. There are conformal mappings that map multiple points to the same image point.
5. How can conformal mappings be computed?
Ans. Conformal mappings can be computed using various techniques such as analytic methods, numerical methods, or computer algorithms. Analytic methods involve solving certain differential equations, while numerical methods approximate the mapping using iterative procedures. Computer algorithms implement these methods to compute conformal mappings efficiently.
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