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Holiday
PHYS物 620 F5F6F7
This course aims to introduce fundamental ideas for analyzing nonlinear phenomena and to give students hands-on experiences by working out classical nonlinear model systems (both analytically and numerically). Related topics are fixed points, linear stability analysis, phase portraits, bifurcations, limit cycles, iterated maps, instabilities, pattern formation, etc. Possible hands-on topics include reaction-diffusion equation (Turing instability), Van der Pol oscillators or Fitzhugh- Nagumo model (excitable media), Swift-Hohenberg Equation or phase-field crystal model (pattern formation), Kuramoto model or Vicesk model (active systems), etc.
MON | TUE | WED | THU | FRI | |
| 08:00108:50 | |||||
| 09:00209:50 | |||||
| 10:10311:00 | |||||
| 11:10412:00 | |||||
| 12:10n13:00 | |||||
| 13:20514:10 | |||||
| 14:20615:10 | |||||
| 15:30716:20 | |||||
| 16:30817:20 | |||||
| 17:30918:20 | |||||
| 18:30a19:20 | |||||
| 19:30b20:20 | |||||
| 20:30c21:20 |
Average GPA 3.63
Std. Deviation 1.08
歡迎大二以上(已修習過理論力學一)選修
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