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Year/Semester of Study | 1 / Spring Semester | ||||
Level of Course | 2nd Cycle Degree Programme | ||||
Type of Course | Optional | ||||
Department | MATHEMATICS | ||||
Pre-requisities and Co-requisites | None | ||||
Mode of Delivery | Face to Face | ||||
Teaching Period | 14 Weeks | ||||
Name of Lecturer | ESMA DEMİR ÇETİN (esma.demir@nevsehir.edu.tr) | ||||
Name of Lecturer(s) | ESMA DEMİR ÇETİN, ÇAĞLA RAMİS, | ||||
Language of Instruction | Turkish | ||||
Work Placement(s) | None | ||||
Objectives of the Course | |||||
Given the basic concepts of Riemannian geometry that students need for master education. Also show the ways to solve problems that students will experience. |
Learning Outcomes | PO | MME | |
The students who succeeded in this course: | |||
LO-1 | Create the relationship between geometric structure and metric. |
PO-1 Fundamental theorems of about some sub-theories of Analysis, Applied Mathematics, Geometry, and Algebra can apply to new problems. PO-3 Mathematics, natural sciences and their branches in these areas and related issues has sufficient infrastructure solutions for the problems of theoretical and practical uses of mathematics. |
Examination Performance Project |
PO: Programme Outcomes MME:Method of measurement & Evaluation |
Course Contents | ||
The basic structure of Riemannian geometry and its relationship to other geometries. | ||
Weekly Course Content | ||
Week | Subject | Learning Activities and Teaching Methods |
1 | Introduction to curvature | Speech, Problem Solving |
2 | Sectional curvature | Speech, Problem Solving |
3 | Ricci curvature | Speech, Problem Solving |
4 | Scalar curvature | Speech, Problem Solving |
5 | Tensors on Riemannian manifolds | Speech, Problem Solving |
6 | Applications of curvatures | Speech, Problem Solving |
7 | Riemannian manifolds with constant curvatures | Speech, Problem Solving |
8 | mid-term exam | |
9 | The Jakobi equation | Speech, Problem Solving |
10 | Conjugate points | Speech, Problem Solving |
11 | The second fundamental forms | Speech, Problem Solving |
12 | The fundamental equations | Speech, Problem Solving |
13 | Complete manifods | Speech, Problem Solving |
14 | The theorem of Hopf-Rinow | Speech, Problem Solving |
15 | The theorem of Hadamard | Speech, Problem Solving |
16 | final exam | |
Recommend Course Book / Supplementary Book/Reading | ||
1 | M. do Carmo, Riemannian geometry, Birkhauser, 1992. | |
Required Course instruments and materials | ||
Assessment Methods | |||
Type of Assessment | Week | Hours | Weight(%) |
mid-term exam | 8 | 2 | 40 |
Other assessment methods | |||
1.Oral Examination | |||
2.Quiz | |||
3.Laboratory exam | |||
4.Presentation | |||
5.Report | |||
6.Workshop | |||
7.Performance Project | |||
8.Term Paper | |||
9.Project | |||
final exam | 16 | 2 | 60 |
Student Work Load | |||
Type of Work | Weekly Hours | Number of Weeks | Work Load |
Weekly Course Hours (Theoretical+Practice) | 3 | 14 | 42 |
Outside Class | |||
a) Reading | 0 | ||
b) Search in internet/Library | 1 | 14 | 14 |
c) Performance Project | 0 | ||
d) Prepare a workshop/Presentation/Report | 0 | ||
e) Term paper/Project | 1 | 14 | 14 |
Oral Examination | 0 | ||
Quiz | 0 | ||
Laboratory exam | 0 | ||
Own study for mid-term exam | 3 | 14 | 42 |
mid-term exam | 1 | 14 | 14 |
Own study for final exam | 3 | 14 | 42 |
final exam | 1 | 14 | 14 |
0 | |||
0 | |||
Total work load; | 182 |