| Lecturer: Jonathan
Korman Office: HU1024 email: jkorman at math at toronto at edu (do not send email to any other accounts) Office Hour: Th 5-6pm |
Teaching
Assistant:
Mykola Matviichuk Office Hours: Tue and Thr at 10-11am in BA6135 email: mykola dot matviichuk at mail dot utoronto dot ca Andrew Colinet Office Hours: Fri 2-4pm in PG207 email: andrew dot colinet at mail dot utoronto dot ca |
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| # | Week of ... | |
| Winter Semester: | 1 | Jan 8 | Review. Finite dimentional optimization (unconstrained problems): 1st and 2nd order neccessary conditions for a minimum. | 2 | Jan 15 | Finite dimentional optimization (unconstrained problems): 2nd order sufficient condition for a minimum. Convex functions: C 1 and C 2 characterizations. |
| 3 | Jan 22 | Convex functions: local minimum is a global minimum, maxumum is attained on boundary of compact convex domain. Introduction to Finite dimentional optimization (equality constraints): Lagrange multipliers. |
| 4 | Jan 29 | Finite dimentional optimization (equality constraints): 1st and 2nd order neccessary conditions for a local minimum. 2nd order sufficient condition for a local minimum. |
| 5 | Feb 5 | Finite dimentional optimization (inequality constraints): 1st and 2nd order neccessary conditions for a local minimum. 2nd order sufficient condition for a local minimum. |
| 6 | Feb 12 | Algorithems: Newton's method, method of steepest descent. | Feb 19 | Reading Week | 7 | Feb 26 | Midterm. Steepest descent. | 8 | Mar 1 | Conjugate direction methods. Conjugate gradient method. | 9 | Mar 8 | Global convergence theorem. Calculus of Variations: introduction. | 10 | Mar 15 | Calculus of Variations: 1st order necc. conditions, Euler-Lagrange equation. | 11 | Mar 22 | Calculus of Variations: Examples, classical mechanics (least action principle). | 12 | Mar 29 | Calculus of Variations: equality constraints, sufficient conditions (convexity). | Apr 9-30 | Final Exams period |