SES # | TOPICS | KEY DATES |
---|---|---|
1 |
Course Introduction
Matching Theory |
|
2 | The Hungarian Algorithm | |
3 | Edmonds’ Algorithm | |
4 | Polyhedral Combinatorics | |
5 | The Matching Polytope I | |
6 | The Matching Polytope II | |
7 | Flow Theory and Duality | |
8 | Max-flow Algorithms | Assignment 1 due |
9 | Min-cut Algorithms | |
10 | Min-cost Flow | |
11 | Strongly Polynomial Algorithms | |
12 | Linear Programming Duality | |
13 | The Simplex Algorithm | Assignment 2 due |
14 | Exam I | |
15 | The Simplex Algorithm (contd.) | |
16 |
Complementary Slackness
Primal-dual Algorithm |
|
17 | The Ellipsoid Algorithm I: Ideas | |
18 | The Ellipsoid Algorithm II: Details | |
19 | Separation Oracles I: Convex Problems | |
20 | Oracles II: Combinatorial Problems | |
21 | NP-completeness | Assignment 3 due |
22, 23 | Approximation Algorithms | |
24 | The Relax-and-round Paradigm | |
25 | Exam II | Assignment 4 due |
26, 27 | Projects Reviews |
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