MATHEMATICS (TURKISH, PHD) | |||||
PhD | TR-NQF-HE: Level 8 | QF-EHEA: Third Cycle | EQF-LLL: Level 8 |
Course Code | Course Name | Semester | Theoretical | Practical | Credit | ECTS |
MAT6002 | Advanced Algebra II | Fall Spring |
3 | 0 | 3 | 8 |
The course opens with the approval of the Department at the beginning of each semester |
Language of instruction: | Tr |
Type of course: | Departmental Elective |
Course Level: | |
Mode of Delivery: | Face to face |
Course Coordinator : | Assoc. Prof. ATABEY KAYGUN |
Course Objectives: | To provide the necessary algebraic tools and techniques to a graduate student who would go into a doctoral program in mathematics. |
The students who have succeeded in this course; A student who finished this course successfully will have acquired the necessary basic knowledge to be able to follow a course in algebra in a doctoral program in mathematics. |
Polynomial algebras over fields, their ideals and quaotients. Euclidean division algorithm. Free monoids. Lexicographical ordering. Other monomial orderings. Buchberger algorithm and Groebner bases. Symmetry groups of field extensions and Galois extensions. The Fundamental Theorem of Algebra. Algebraic closure. Seperable closure. Transcendental extensions and transcendence degree. Krull dimension of an algebra. Noetherian algebras and finite generation. Nilpotent elements, nilpotent and nil ideals. Radicals. Nullstellensatz. Affine varieties. Zariski topolojisi. İndirgenemeyen alt uzaylar. |
Week | Subject | Related Preparation | |
1) | Polynomial algebras over fields, their ideals and quaotients. Euclidean division algorithm. | ||
2) | Free monoids. Lexicographical ordering. Other monomial orderings. | ||
3) | Buchberger algorithm and Groebner bases. | ||
4) | Buchberger algorithm and Groebner bases. | ||
5) | Irreducible polynomials and field extensions. | ||
6) | Symmetry groups of field extensions and Galois extensions. | ||
7) | Examples from Galois extensions and calculations. | ||
8) | The Fundamental Theorem of Algebra. Algebraic closure. Seperable closure. | ||
9) | Transcendental extensions and transcendence degree. Krull dimension of an algebra. | ||
10) | Noetherian algebras and finite generation. Nilpotent elements, nilpotent and nil ideals. Radicals. | ||
11) | Nullstellensatz. | ||
12) | Affine varieties. Examples. | ||
13) | Zariski topology. Irreducible subvarieties. | ||
14) | Selected tpoics from affine algebraic geometry. |
Course Notes: | Instructor's own lecture notes. S. Lang, "Algebra" |
References: |
Semester Requirements | Number of Activities | Level of Contribution |
Attendance | % 0 | |
Laboratory | % 0 | |
Application | % 0 | |
Field Work | % 0 | |
Special Course Internship (Work Placement) | % 0 | |
Quizzes | % 0 | |
Homework Assignments | % 0 | |
Presentation | % 0 | |
Project | 1 | % 20 |
Seminar | % 0 | |
Midterms | 1 | % 30 |
Preliminary Jury | % 0 | |
Final | 1 | % 50 |
Paper Submission | % 0 | |
Jury | % 0 | |
Bütünleme | % 0 | |
Total | % 100 | |
PERCENTAGE OF SEMESTER WORK | % 30 | |
PERCENTAGE OF FINAL WORK | % 70 | |
Total | % 100 |
Activities | Number of Activities | Duration (Hours) | Workload |
Course Hours | 14 | 3 | 42 |
Laboratory | 0 | 0 | 0 |
Application | 0 | 0 | 0 |
Special Course Internship (Work Placement) | 0 | 0 | 0 |
Field Work | 0 | 0 | 0 |
Study Hours Out of Class | 14 | 6 | 84 |
Presentations / Seminar | 0 | 0 | 0 |
Project | 1 | 51 | 51 |
Homework Assignments | 0 | 0 | 0 |
Quizzes | 0 | 0 | 0 |
Preliminary Jury | 0 | ||
Midterms | 1 | 2 | 2 |
Paper Submission | 0 | ||
Jury | 0 | ||
Final | 1 | 21 | 21 |
Total Workload | 200 |
No Effect | 1 Lowest | 2 Low | 3 Average | 4 High | 5 Highest |
Program Outcomes | Level of Contribution |