Presentation is loading. Please wait.

Presentation is loading. Please wait.

D. R. Wilton ECE Dept. ECE 6382 Pole and Product Expansions, Series Summation 8/24/10.

Published byKristian Ashley Ferguson Modified over 8 years ago

Similar presentations

Presentation on theme: "D. R. Wilton ECE Dept. ECE 6382 Pole and Product Expansions, Series Summation 8/24/10."— Presentation transcript:

1 D. R. Wilton ECE Dept. ECE 6382 Pole and Product Expansions, Series Summation 8/24/10

2 Pole Expansion of Meromorphic Functions Note that a pole at the origin is not allowed! 1 Historical note: It is often claimed that friction between Mittag-Leffler and Alfred Nobel resulted in there being no Nobel Prize in mathematics. However, it seems this is not likely the case; see, for example, www.snopes.com/science/nobel.aspwww.snopes.com/science/nobel.asp

3 Proof of Mittag-Leffler Theorem

4 Extended Form of the Mittag-Leffler Theorem

5 Example: Pole Expansion of cot z

6 Example: Pole Expansion of cot z (cont.)

7 Actually, it isn’t necessary that the paths C N be circular; indeed it is simpler in this case to estimate the maximum value on a sequence of square paths of increasing size that pass between the poles

8 Example: Pole Expansion of cot z (cont.) coth (x) ―

9 Example: Pole Expansion of cot z (cont.)

10 Other Pole Expansions The Mittag-Leffler theorem generalizes the partial fraction representation of a rational function to meromorphic functions

11 Infinite Product Expansion of Entire Functions

12 Product Expansion Formula

13 Useful Product Expansions Product expansions generalize for entire functions the factorization of the numerator and denominator polynomials of a rational function into products of their roots

14 The Argument Principle

15 The Argument Principle (cont.)

16 Summation of Series x y 123 … … -3-20 C

17 Summation of Series, cont’d

Download ppt "D. R. Wilton ECE Dept. ECE 6382 Pole and Product Expansions, Series Summation 8/24/10."

Similar presentations

12.3 Infinite Sequences and Series

12.3 Infinite Sequences and Series
Signals & Systems Predicting System Performance February 27, 2013.

Signals & Systems Predicting System Performance February 27, 2013.
Integrals 5.

Integrals 5.
TOPIC TECHNIQUES OF INTEGRATION. 1. Integration by parts 2. Integration by trigonometric substitution 3. Integration by miscellaneous substitution 4.

TOPIC TECHNIQUES OF INTEGRATION. 1. Integration by parts 2. Integration by trigonometric substitution 3. Integration by miscellaneous substitution 4.
ELEN 5346/4304 DSP and Filter Design Fall 2008 1 Lecture 7: Z-transform Instructor: Dr. Gleb V. Tcheslavski Contact:

ELEN 5346/4304 DSP and Filter Design Fall Lecture 7: Z-transform Instructor: Dr. Gleb V. Tcheslavski Contact:
11.3 – Rational Functions. Rational functions – Rational functions – algebraic fraction.

11.3 – Rational Functions. Rational functions – Rational functions – algebraic fraction.
Table of Contents Equivalent Rational Expressions Example 1: When we multiply both the numerator and the denominator of a rational number by the same non-zero.

Table of Contents Equivalent Rational Expressions Example 1: When we multiply both the numerator and the denominator of a rational number by the same non-zero.
Examples for Rationalizing the Denominator Examples It is improper for a fraction to have a radical in its denominator. To remove the radical we “rationalize.

Examples for Rationalizing the Denominator Examples It is improper for a fraction to have a radical in its denominator. To remove the radical we “rationalize.
Equivalent Rational Expressions Example 1: When we multiply both the numerator and the denominator of a rational number by the same non-zero value, we.

Equivalent Rational Expressions Example 1: When we multiply both the numerator and the denominator of a rational number by the same non-zero value, we.
11. Complex Variable Theory

11. Complex Variable Theory
Integrating Rational Functions by the Method of Partial Fraction.

Integrating Rational Functions by the Method of Partial Fraction.
Continued Fractions in Combinatorial Game Theory Mary A. Cox.

Continued Fractions in Combinatorial Game Theory Mary A. Cox.
Warm up   1. Find the tenth term in the sequence:   2. Find the sum of the first 6 terms of the geometric series 2-8+32-128…   If r=-2 and a 8 =

Warm up   1. Find the tenth term in the sequence:   2. Find the sum of the first 6 terms of the geometric series …   If r=-2 and a 8 =
11.3 Geometric Sequences.

11.3 Geometric Sequences.
D. R. Wilton ECE Dept. ECE 6382 Power Series Representations 8/24/10.

D. R. Wilton ECE Dept. ECE 6382 Power Series Representations 8/24/10.
THE LAPLACE TRANSFORM LEARNING GOALS Definition The transform maps a function of time into a function of a complex variable Two important singularity functions.

THE LAPLACE TRANSFORM LEARNING GOALS Definition The transform maps a function of time into a function of a complex variable Two important singularity functions.
Rational and Irrational Numbers

Rational and Irrational Numbers
1 © 2010 Pearson Education, Inc. All rights reserved 10.1 DEFINITION OF A SEQUENCE An infinite sequence is a function whose domain is the set of positive.

1 © 2010 Pearson Education, Inc. All rights reserved 10.1 DEFINITION OF A SEQUENCE An infinite sequence is a function whose domain is the set of positive.
D. R. Wilton ECE Dept. ECE 6382 Green’s Functions in Two and Three Dimensions.

D. R. Wilton ECE Dept. ECE 6382 Green’s Functions in Two and Three Dimensions.
HAWKES LEARNING SYSTEMS math courseware specialists Copyright © 2011 Hawkes Learning Systems. All rights reserved. Hawkes Learning Systems: Developmental.

HAWKES LEARNING SYSTEMS math courseware specialists Copyright © 2011 Hawkes Learning Systems. All rights reserved. Hawkes Learning Systems: Developmental.

Similar presentations

Ads by Google