Instructor: Professor Jeffrey Rosenthal (contact me, phone (416) 978-4594)
Time: Tuesdays, 2:00 to 5:00 pm, Sidney Smith Hall room 1080.
Textbook: "Probability and Measure", 3rd ed., by Patrick Billingsley. (John Wiley & Sons, 1995. Available at U of T Bookstore, $90.95.)
Content: We will largely follow the textbook, though the order of certain topics will be changed. A rough outline is that Chapters 1 and 4 will be covered, with necessary measure-theoretic material from Chapters 2 and 3 introduced as needed. Specific topics to be covered include: probability measures, the extension theorem, random variables, distributions, expectations, laws of large numbers, Markov chains. (The follow-up course, STA 2211S, will then cover chapters 5, 6, and 7, including weak convergence, characteristic functions, central limit theorems, Radon-Nykodym Theorem and Lebesgue Decomposition, conditional probability and expectation, martingales, and Kolmogorov's Existence Theorem.)
Prerequisites: Students should have a strong undergraduate background in Real Analysis, including calculus, sequences and series, elementary set theory, and epsilon-delta proofs, at the level of (say) "Elementary Classical Analysis", by Jerrold E. Marsden (W.F. Freeman and Co., 1974).
Evaluation: Homework assignments 65%; attendance and class participation 35%.