Reading assignments are from the course textbook:
Bertsekas, Dimitri, and John Tsitsiklis. Introduction to Probability. 2nd ed. Athena Scientific, 2008. ISBN: 978188652923.
LEC # | TOPICS | READINGS |
---|---|---|
1 | Probability models and axioms | Sections 1.1–1.2 |
2 | Conditioning and Bayes' rule | Sections 1.3–1.4 |
3 | Independence | Section 1.5 |
4 | Counting | Section 1.6 |
5 | Discrete random variables; probability mass functions; expectations | Sections 2.1–2.4 |
6 | Discrete random variable examples; joint PMFs | Sections 2.4–2.5 |
7 | Multiple discrete random variables: expectations, conditioning, independence | Sections 2.6–2.7 |
8 | Continuous random variables | Sections 3.1–3.3 |
9 | Multiple continuous random variables | Sections 3.4–3.5 |
10 | Continuous Bayes rule; derived distributions | Sections 3.6; 4.1 |
11 | Derived distributions; convolution; covariance and correlation | Sections 4.1–4.2 |
12 | Iterated expectations; sum of a random number of random variables | Sections 4.3; 4.5 |
13 | Bernoulli process | Section 6.1 |
14 | Poisson process – I | Section 6.2 |
15 | Poisson process – II | Section 6.2 |
16 | Markov chains – I | Sections 7.1–7.2 |
17 | Markov chains – II | Section 7.3 |
18 | Markov chains – III | Section 7.3 |
19 | Weak law of large numbers | Sections 5.1–5.3 |
20 | Central limit theorem | Section 5.4 |
21 | Bayesian statistical inference – I | Sections 8.1–8.2 |
22 | Bayesian statistical inference – II | Sections 8.3–8.4 |
23 | Classical statistical inference – I | Section 9.1 |
24 | Classical inference – II | Sections 9.1–9.4 |
25 | Classical inference – III; course overview | Sections 9.1–9.4 |