Sec 6.17: Conformal Mapping Techniques Solve Our goal in this section.

Slides:

Advertisements

Similar presentations

8.2 Kernel And Range.

Advertisements

Methods of solving problems in electrostatics Section 3.

Sea f una función analítica que transforma un dominio D en un dominio D. Si U es armonica en D, entonces la función real u(x, y) = U(f(z)) es armonica.

CS CS 175 – Week 7 Parameterization Linear Methods.

Analytic Continuation: Let f 1 and f 2 be complex analytic functions defined on D 1 and D 2, respectively, with D 1 contained in D 2. If on D 1, then f.

Linear Equations Please Read Entire Section 2.1, pages in the text.

Copyright © Cengage Learning. All rights reserved. 15 Multiple Integrals.

EXPONENTIAL FUNCTIONS: DIFFERENTIATION AND INTEGRATION Section 5.4.

3.3 Linear Inequalities in Two Variables Objectives: Solve and graph a linear inequality in two variables. Use a linear inequality in two variables to.

6. 5 Graphing Linear Inequalities in Two Variables 7

Accurate Implementation of the Schwarz-Christoffel Tranformation

Chapter 7 IIR Filter Design

Chapter 9. Conformal Mapping

Sections 1.8/1.9: Linear Transformations

4 4.4 © 2012 Pearson Education, Inc. Vector Spaces COORDINATE SYSTEMS.

Chapter 8. Mapping by Elementary Functions

Chapter 3 Integral of Complex Function §3.1 Definition and Properties §3.2 Cauchy Integral Theorem §3.3 Cauchy’s Integral Formula §3.4 Analytic and Harmonic.

Linear Inequalities in Two Variables Objectives: Solve and graph a linear inequality in two variables..

Section 4-1: Introduction to Linear Systems. To understand and solve linear systems.

14. Mappings by the exponential function We shall introduce and develop properties of a number of elementary functions which do not involve polynomials.

1 §4.6 Area & Volume The student will learn about: area postulates, Cavalieri’s Principle, 1 and the areas of basic shapes.

Section 8.4a. A flashback to Section 6.5… We evaluated the following integral: This expansion technique is the method of partial fractions. Any rational.

© Cambridge University Press 2010 Brian J. Kirby, PhD Sibley School of Mechanical and Aerospace Engineering, Cornell University, Ithaca, NY Powerpoint.

SECTION 12.8 CHANGE OF VARIABLES IN MULTIPLE INTEGRALS.

3.3 Systems of Inequalities An inequality and a system of inequalities can each have many solutions. A solution of a system of inequalities is a solution.

6.9 Dirichlet Problem for the Upper Half-Plane Consider the following problem: We solved this problem by Fourier Transform: We will solve this problem.

IIR Digital Filter Design

Solving Quadratic Equations by Factoring. Martin-Gay, Developmental Mathematics 2 Zero Factor Theorem Quadratic Equations Can be written in the form ax.

2.1 – Linear and Quadratic Equations Linear Equations.

§ 6.6 Solving Quadratic Equations by Factoring. Martin-Gay, Beginning and Intermediate Algebra, 4ed 22 Zero Factor Theorem Quadratic Equations Can be.

3.3 Linear Inequalities in Two Variables Objectives: Solve and graph a linear inequality in two variables. Use a linear inequality in two variables to.

Solve polynomial equations with complex solutions by using the Fundamental Theorem of Algebra. 5-6 THE FUNDAMENTAL THEOREM OF ALGEBRA.

Blue part is out of 50 Green part is out of 50  Total of 100 points possible.

1 Chap 8 Mapping by Elementary Functions 68. Linear Transformations.

Chapter 8 Systems of Linear Equations in Two Variables Section 8.3.

Warm Up Week 1. Section 7.2 Day 1 I will identify and use reflections in a plane. Ex 1 Line of Reflection The mirror in the transformation.

Copyright © Cengage Learning. All rights reserved Change of Variables in Multiple Integrals.

ECE 6382 Functions of a Complex Variable as Mappings David R. Jackson Notes are adapted from D. R. Wilton, Dept. of ECE 1.

Chapter 2 The z-transform and Fourier Transforms The Z Transform The Inverse of Z Transform The Prosperity of Z Transform System Function System Function.

Analytic Functions A function f(z) is said to be analytic in a domain D if f(z) is defined and differentiable at every point of D. f(z) is said to be analytic.

講者：許永昌老師 1. Contents Preface Guide line of Ch6 and Ch7 Addition and Multiplication Complex Conjugation Functions of a complex variable Example: Electric.

case study on Laplace transform

MAT 3730 Complex Variables Section 2.4 Cauchy Riemann Equations

Advance Fluid Mechanics

Contents 20.1 Complex Functions as Mappings 20.2 Conformal Mappings

MATH 1330 Section 6.3.

MATH 1330 Section 6.3.

ECE 6382 Notes 2 Differentiation of Functions of a Complex Variable

Complex Variables. Complex Variables Open Disks or Neighborhoods Definition. The set of all points z which satisfy the inequality |z – z0|

Solving Quadratic Equations by the Quadratic Formula

Solve the equation for x. {image}

Advanced Engineering Mathematics

ENGR 3300 – 505 Advanced Engineering Mathematics

Chapter 4 Section 1.

Graphing Linear Equations

MATH 1330 Section 6.3.

Week 4 Complex numbers: analytic functions

Accurate Implementation of the Schwarz-Christoffel Tranformation

Chapter 4 THE LAPLACE TRANSFORM.

Section 10.4 Linear Equations

Solve the equation: 6 x - 2 = 7 x + 7 Select the correct answer.

Evaluate the line integral. {image}

3 Chapter Chapter 2 Graphing.

Advanced Engineering Mathematics

2 Chapter Chapter 2 Equations, Inequalities and Problem Solving.

ENGR 3300 – 505 Advanced Engineering Mathematics

Solving a System of Linear Equations

Power Series Solutions of Linear DEs

Evaluate the line integral. {image}

IIR Digital Filter Design

Presentation transcript:

Sec 6.17: Conformal Mapping Techniques Solve Our goal in this section

Sec 6.17: Conformal Mapping Techniques Complex function 1 f(z) onto 2 f(z) one-to-one

Sec 6.17: Conformal Mapping Techniques Example:

Sec 6.17: Conformal Mapping Techniques Is conformal if it preserve Def: Conformal mapping 1 angles 2 Orentation

Sec 6.17: Conformal Mapping Techniques Let Theorem 6.9: analytic function (D onto K) Conformal mapping Let Theorem 6.10(Riemann Mapping Theorem) : Unit circle

Sec 6.17: Conformal Mapping Techniques Remark: A conformal mapping of a domain D onto a domain K will map the boundary of D to the boundary of K.

Sec 6.17: Conformal Mapping Techniques Is a function of the form Linear fractional Transformation (bilinear) a, b, c, d complex number and T is a conformal mapping defined on C – {-d/c} Remark:

Sec 6.17: Conformal Mapping Techniques Theorem 6.11: T maps a circle to a circle or straight line circle T maps a straight line to a circle or straight line circle

Sec 6.17: Conformal Mapping Techniques Theorem 6.12: Find T so that:

Example Sec 6.17: Conformal Mapping Techniques Theorem 6.12: How to find T: Think of w =T(z) and solve for w in the equation Find a bilinear mapping that sends the given points to the images indicated.

Sec 6.17: Conformal Mapping Techniques How to find T: Theorem 6.10(Riemann Mapping Theorem) : Unit circle Map the right half-plane Re(z)>0 conformally onto the unit disk |w| <1 Select 3 points in z-plane Select 3 images in w-plane We will map boundary to boundary Maintain orentation (counterclockwise) As you walk on the boundary the domain is on your left.

Sec 6.17: Conformal Mapping Techniques Given u An integral Solution of the Dirichlet Problem for a Disk Let u be a harmonic function in the unit Disk |z|<1+e slightly larger than the unit the values of u are prescribed on the boundary circle C The complex function f(z) can be written as (see p322 for derivation) Remark

Sec 6.17: Conformal Mapping Techniques Solution of Dirichlet Problem by conformal mapping Solution is the real part of The solution of this problem is The real part of the function f(z)

Example Sec 6.17: Conformal Mapping Techniques Solution of Dirichlet Problem by conformal mapping The solution of this problemThe real part of the function f(z) Solve the Dirichlet problem for the right half-plane

Example Sec 6.17: Conformal Mapping Techniques Solution of Dirichlet Problem by conformal mapping Solve the Dirichlet problem for the right half-plane real Real part