| Title | Time | Room | Instructor |
|---|---|---|---|
| Introduction to Algebraic Geometry 1 | 11.10.2022 10:15 - 11:30 (Tue) | Hausel, Tamas | |
| Introduction to Algebraic Geometry 1 | 13.10.2022 10:15 - 11:30 (Thu) | Hausel, Tamas | |
| Introduction to Algebraic Geometry 1 | 13.10.2022 11:45 - 12:45 (Thu) | ||
| Introduction to Algebraic Geometry 1 | 18.10.2022 10:15 - 11:30 (Tue) | Hausel, Tamas | |
| Introduction to Algebraic Geometry 1 | 20.10.2022 10:15 - 11:30 (Thu) | Hausel, Tamas | |
| Introduction to Algebraic Geometry 1 | 20.10.2022 11:45 - 12:45 (Thu) | ||
| Introduction to Algebraic Geometry 1 | 25.10.2022 10:15 - 11:30 (Tue) | Hausel, Tamas | |
| Introduction to Algebraic Geometry 1 | 27.10.2022 10:15 - 11:30 (Thu) | Hausel, Tamas | |
| Introduction to Algebraic Geometry 1 | 27.10.2022 11:45 - 12:45 (Thu) | ||
| Introduction to Algebraic Geometry 1 | 03.11.2022 10:15 - 11:30 (Thu) | Hausel, Tamas | |
| Introduction to Algebraic Geometry 1 | 03.11.2022 11:45 - 12:45 (Thu) | ||
| Introduction to Algebraic Geometry 1 | 08.11.2022 10:15 - 11:30 (Tue) | Hausel, Tamas | |
| Introduction to Algebraic Geometry 1 | 10.11.2022 10:15 - 11:30 (Thu) | Hausel, Tamas | |
| Introduction to Algebraic Geometry 1 | 10.11.2022 11:45 - 12:45 (Thu) | ||
| Introduction to Algebraic Geometry 1 | 15.11.2022 10:15 - 11:30 (Tue) | Hausel, Tamas | |
| Introduction to Algebraic Geometry 1 | 17.11.2022 10:15 - 11:30 (Thu) | Hausel, Tamas | |
| Introduction to Algebraic Geometry 1 | 17.11.2022 11:45 - 12:45 (Thu) | ||
| Introduction to Algebraic Geometry 1 | 22.11.2022 10:15 - 11:30 (Tue) | Hausel, Tamas | |
| Introduction to Algebraic Geometry 1 | 24.11.2022 10:15 - 11:30 (Thu) | Hausel, Tamas | |
| Introduction to Algebraic Geometry 1 | 24.11.2022 11:45 - 12:45 (Thu) |
Description:
We will provide introduction to algebraic geometry, both from a differential geometric /complex analytic and algebraic/scheme-theoretical perspective.
Capacity:
4/20
Course Code:
C_MAT-4002_F22
Course instructor(s):
Tamas Hausel
Course type:
Taught course
Course level:
Advanced/specialized
Primary Track:
Mathematics
Course format:
On campus
Duration:
Half semester
ECTS:
6
Semester:
Fall 1
Prerequisites:
differentiable manifolds, complex analysis, basic algebra: fields, rings and modules
Teaching format:
lectures
Assessment form(s):
regular assignments
Grading scheme:
Numeric grades (1-5)
Course Category:
Credit Course
Academic Year:
AY 2022/23