| Detailed information |
| Original study plan |
Master's programme Computational Mathematics 2024W |
| Objectives |
Determination of the number of solutions of a system of algebraic equations
|
| Subject |
When we change the coefficients in a polynomial system of equations, then the number of solutions often remains constant -
assuming we are counting complex solutions and take multiplicities into account.
This idea is formative for intersection theory, a central discipline of algebraic geometry.
|
| Criteria for evaluation |
final written or oral exam
|
| Methods |
lecture
|
| Language |
English |
| Study material |
D. Eisenbud and J. Harris: 3264 and all that.
|
| Changing subject? |
No |
| Earlier variants |
They also cover the requirements of the curriculum (from - to)
201SYMRCAGV20: VL Commutative algebra and algebraic geometry (2020W-2023S)
|
