Algebraic Geometry(MATH 513)
| Course Code | Course Name | Semester | Theory | Practice | Lab | Credit | ECTS |
|---|---|---|---|---|---|---|---|
| MATH 513 | Algebraic Geometry | 1 | 3 | 0 | 0 | 3 | 7 |
| Prerequisites | |
| Admission Requirements |
| Language of Instruction | English |
| Course Type | Elective |
| Course Level | Masters Degree |
| Course Instructor(s) | Meral TOSUN mtosun@gsu.edu.tr (Email) |
| Assistant | |
| Objective | The aim of this course is to understand affine and porjective geometry and to learn the relation between algebraic notions and geometric structures |
| Content |
Ring theory and fields (summary), Polynomials and afine space, Affine algebraic sets, İdeals of algebraic sets, Hilbert’s Nullstellensatz theorem, Radical ideals and Nullstellensatz theorem; Zariski topology and irreducible algebraic sets, Decomposition of an algebraic set, Polynomial mappings and polynomial functions, Coordinate ring of an algebraic set, Affine change of coordinates, Rational functions and local rings; Projective space, Projective algebra-geometry dictionary, Homogeneous coordinate ring and function field, Projective change of coordinates, Dehomogenization and homogenization of polynomials, Affine-projective transfer of algebraic sets, Multiprojective space and Segre product; Algebraic set of a monomial ideal, Hilbert function and dimension, Dimension of a projective algebraic set, Elementary properties of dimension; Tangent spaces and singularities, blow-up, Smooth algebraic sets, Blow-up of curves and surfaces, Examples. |
| Course Learning Outcomes |
To know the definitions and the properties of algebraic sets in affine and projective space To be able to examine the properties of geometric structures using the properties of ideals |
| Teaching and Learning Methods | Lecture, discussion, problem solving |
| References |
A Primer of Algebraic Geometry, Huishi Li Ideals, Varieties and Algorithms, D. Cox, J. Little, D. O’Shea |
Theory Topics
| Week | Weekly Contents |
|---|---|
| 1 | Ring theory and fields (summary), Polynomials and afine space |
| 2 | Affine algebraic sets, Ideals of algebraic sets |
| 3 | Hilbert’s Nullstellensatz theorem, Radical ideals and Nullstellensatz theorem |
| 4 | Zariski topology and irreducible algebraic sets, Decomposition of an algebraic set |
| 5 | Polynomial mappings and polynomial functions, Coordinate ring of an algebraic set |
| 6 | Affine change of coordinates, Rational functions and local rings |
| 7 | Projective space, Projective algebra-geometry dictionary |
| 8 | Homogeneous coordinate ring and function field, Projective change of coordinates |
| 9 | Dehomogenization and homogenization of polynomials, Affine-projective transfer of algebraic sets |
| 10 | Multiprojective space and Segre product |
| 11 | Algebraic set of a monomial ideal, Hilbert function and dimension |
| 12 | Dimension of a projective algebraic set, Elementary properties of dimension |
| 13 | Tangent spaces and singularities, Blow-up, Smooth algebraic sets |
| 14 | Blow-up of curves and surfaces, Examples |
Practice Topics
| Week | Weekly Contents |
|---|
Contribution to Overall Grade
| Number | Contribution | |
|---|---|---|
| Contribution of in-term studies to overall grade | 5 | 50 |
| Contribution of final exam to overall grade | 1 | 50 |
| Toplam | 6 | 100 |
In-Term Studies
| Number | Contribution | |
|---|---|---|
| Assignments | 4 | 10 |
| Presentation | 0 | 0 |
| Midterm Examinations (including preparation) | 1 | 40 |
| Project | 0 | 0 |
| Laboratory | 0 | 0 |
| Other Applications | 0 | 0 |
| Quiz | 0 | 0 |
| Term Paper/ Project | 0 | 0 |
| Portfolio Study | 0 | 0 |
| Reports | 0 | 0 |
| Learning Diary | 0 | 0 |
| Thesis/ Project | 0 | 0 |
| Seminar | 0 | 0 |
| Other | 0 | 0 |
| Toplam | 5 | 50 |
| No | Program Learning Outcomes | Contribution | ||||
|---|---|---|---|---|---|---|
| 1 | 2 | 3 | 4 | 5 | ||
| 1 | X | |||||
| 2 | X | |||||
| 3 | X | |||||
| 4 | X | |||||
| 5 | X | |||||
| 6 | X | |||||
| 7 | ||||||
| 8 | ||||||
| 9 | X | |||||
| 10 | ||||||
| 11 | ||||||
| 12 | X | |||||
| 13 | X | |||||
| 14 | X | |||||
| Activities | Number | Period | Total Workload |
|---|---|---|---|
| Total Workload | 0 | ||
| Total Workload / 25 | 0.00 | ||
| Credits ECTS | 0 | ||