Dictionary of Conformal Mapping-IV

Dictionary of Conformal Mapping
Part IV

Example 38.  The conformal mapping  .
It can be constructed via the Schwarz-Christoffel integral  ,
here  , ,   and  , , ,
and the angles are  .

[Graphics:Images/ConformalMapDictionary.4_gr_11.gif]

Details 38.

Example 39. The conformal mapping ,
here , , , and , , , .

[Graphics:Images/ConformalMapDictionary.4_gr_24.gif]

Details 39.

Example 40. The conformal mapping .

[Graphics:Images/ConformalMapDictionary.4_gr_29.gif]
Details 40.

Example 41.  The conformal mapping  .
It can be constructed via the Schwarz-Christoffel integral  ,
here  , ,   and  , , ,
and the angles are  .
Also  .

[Graphics:Images/ConformalMapDictionary.4_gr_41.gif]

Details 41.

Example 42.  The conformal mapping  .
It can be constructed via the Schwarz-Christoffel integral  ,
here  , ,  and  , ,  and the angles are  ,
(additionally for we would have ).
Also  ,  also  .

[Graphics:Images/ConformalMapDictionary.4_gr_56.gif]

Details 42.

Example 43.  The conformal mapping  .
It can be constructed via the Schwarz-Christoffel integral   [Graphics:Images/ConformalMapDictionary.4_gr_61.gif] ,
here  , , ,   and  , , , ,
and the angles are  .
Also  .

[Graphics:Images/ConformalMapDictionary.4_gr_72.gif]

Details 43.

Example 44.  The conformal mapping  .
It can be constructed via the Schwarz-Christoffel integral  ,
here , ,  and  , ,  and the angles are  ,
(additionally for we would have   and  , ).
Also  .

[Graphics:Images/ConformalMapDictionary.4_gr_88.gif]

Details 44.

Example 45. The conformal mapping ,
here , , and , , .

[Graphics:Images/ConformalMapDictionary.4_gr_99.gif]

Details 45.

Example 46. The conformal mapping ,
here , , and , , .

[Graphics:Images/ConformalMapDictionary.4_gr_110.gif]

Details 46.

Example 47.  The conformal mapping  .
It can be constructed via the Schwarz-Christoffel integral  ,
here  , ,   and  , , ,  and the angles are  .
Also  .

[Graphics:Images/ConformalMapDictionary.4_gr_124.gif]

Details 47.

Remark. When we compare Examples 31, 41, 45, 46, 47 we see that there are many conformal mappings whose range is a right angle channel. Many of the other examples can also be done in several alternate ways.

Conformal Mapping Dictionary - Part I

Conformal Mapping Dictionary - Part II

Conformal Mapping Dictionary - Part III

Conformal Mapping Dictionary - Part IV

Conformal Mapping Dictionary - Part V

Chapter 2. Complex Functions

Complex Functions and Linear Mappings

The Mappings and

Complex Limits and Continuity

Branches of Complex Functions

The Reciprocal Transformation
Chapter 5. Elementary Functions

The Complex Exponential Function

The Complex Logarithm Function

Complex Exponents and Powers

Trigonometric and Hyperbolic Functions

Inverse Trigonometric and Hyperbolic Functions
Chapter 10. Conformal Mapping

Basic Properties of Conformal Mappings

Mobius Transformations - Bilinear Transformations

Mappings Involving Elementary Functions

Mappings by Trigonometric Functions
Chapter 11. Applications of Harmonic Functions

Preliminaries

Invariance of Laplace's Equation and the Dirichlet Problem

Poisson's Integral Formula for the Upper Half Plane

Two-Dimensional Mathematical Models

Steady State Temperatures

Two-Dimensional Electrostatics

Two-Dimensional Fluid Flow

The Joukowski Airfoil

The Schwarz-Christoffel Transformation

Image of a Fluid Flow

Sources and Sinks

Return to the Complex Analysis Project

(c) 2008 John H. Mathews, Russell W. Howell