National Taiwan Normal University Course Outline Fall , 2020 |
@尊重智慧財產權,請同學勿隨意影印教科書 。 Please respect the intellectual property rights, and shall not copy the textbooks arbitrarily. |
I.Course information |
Serial No. | 2682 | Course Level | |
Course Code | MAC0143 | Chinese Course Name | 非線性規劃(一) |
Course Name | Nonlinear Programming (I) | ||
Department | Department of Mathematics | ||
Two/one semester | 1 | Req. / Sel. | Sel. |
Credits | 3.0 | Lecturing hours | Lecture hours: 3 |
Prerequisite Course | ◎1. This is a cross-level course and is available for junior and senior undergraduate students, master's students and PhD students. 2. If the listed course is a doctroal level course, it is only available for master's students and PhD students. | ||
Comment | |||
Course Description | |||
Time / Location | Mon. 6-8 Gongguan MA2-12 | ||
Curriculum Goals | Corresponding to the Departmental Core Goal | ||
1. Understand the theoretical background of various optimization problems |
Master: 1-1 Equipped with professional mathematics competences Doctor: 1-1 Equipped with professional mathematics competences |
||
2. Understand algorithms for solving various optimization problems |
Master: 1-2 Being able to reason and induct with mathematical logic 1-3 Being able to think mathematically and critically 1-4 Possessing the abilities to propose and solve questions in advanced mathematics Doctor: 1-2 Being able to reason and induct with mathematical logic 1-3 Being able to think mathematically and critically 1-4 Possessing the abilities to propose and solve questions in advanced mathematics |
||
3. Learn about practical applications of various optimization problems |
Master: 1-5 Being able to use mathematics as tools to learn other subjects Doctor: 1-5 Being able to use mathematics as tools to learn other subjects |
II. General Syllabus |
Instructor(s) | CHEN, Jein-Shan/ 陳界山 | ||
Schedule | |||
本課程主要在研究各種非線性規劃問題的極小值問題,內容包括解的存在性與相關的演算法。本課程將從介紹凸分析知識出發,對無約束條件的最佳化問題與具有約束條件的最佳化問題,分別講授其相關的理論背景,再介紹其常用的演算法。 | |||
Instructional Approach | |||
Methods | Notes | ||
Formal lecture |   | ||
Group discussion | 每個選修此課程的學生將被指定研讀的章節,並輪流上台報告所研讀的內容。 | ||
Grading assessment | |||
Methods | Percentage | Notes | |
Class discussion involvement | 20 % | 輪流上台報告所研讀的內容 | |
Attendances | 30 % | 參加研討會、出席課堂討論。 | |
Presentation | 50 % | 輪流上台報告所研讀的內容 | |
Required and Recommended Texts/Readings with References | 1. Nonlinear Programming: Theory and Algorithms, 3rd edition, by M. Bazaraa, H. Sherali, and C. Shetty, 2006. 2. Convexity and Optimization in R^n, by L. D. Berkovitz, 2002. 3. Numerical Optimization, by J. Nocedal and S. Wright, 2006. |