LEC # | TOPICS |
---|---|
1 | Number Systems and Algebra of Complex Numbers |
2 | Elementary Complex Functions, Part 1 |
3 | Elementary Complex Functions, Part 2 |
4 | Branch Points and Branch Cuts |
5 | Analytic Functions |
6 | Complex Integrals |
7 | Cauchy’s Formula, Properties of Analytic Functions |
8 | Taylor Series, Laurent Series |
9 | Laurent Series (cont.) |
10 | Properties of Laurent Series, Singularities |
11 | Singularities (cont.) |
12 | Residue Theorem |
13 | In-class exam 1 |
14 | Evaluation of Real Definite Integrals, Case I |
15 | Evaluation of Real Definite Integrals, Case II |
16 | Evaluation of Real Definite Integrals, Case III |
17 | Evaluation of Real Definite Integrals, Case IV |
18 | Theorems for Contour Integration |
19 | Series and Convergence |
20 | Ordinary Differential Equations |
21 | Singular Points of Linear Second-Order ODEs |
22 | Frobenius Method |
23 | Frobenius Method - Examples |
24 | Frobenius Method (cont.) and a “particular type” of ODE |
25 | Bessel Functions |
26 | Properties of Bessel Functions |
27 | Modified Bessel Functions |
28 | In-class exam 2 |
29 | Differential Equations Satisfied by Bessel Functions |
30 | Introduction to Boundary-Value Problems |
31 | Eigenvalues, Eigenfunctions, Orthogonality of Eigenfunctions |
32 | Boundary Value Problems for Nonhomogeneous PDEs |
33 | Sturm-Liouville Problem |
34 | Fourier Series |
35 | Fourier Sine and Cosine Series |
36 | Complete Fourier Series |
37 | Review of Boundary Value Problems for Nonhomogeneous PDEs |
38 | In-class exam 3 |
Calendar
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As Taught In
Fall
2004
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notes
Lecture Notes
grading
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