Linear Algebra 1,2, Analysis 2,3, Complex Analysis, Algebra 1.
In this course, we will focus on curves and surfaces embedded into three-dimensional space. We begin the course with the basics of curves: curvature and torsion. Then, the basics of surfaces in three-dimensional space will be discussed: the First and Second Fundamental Form, the Gauss map, and the principal curvatures. We continue the course with the intrinsic geometry of surfaces proving Gauss-Bonnet Theorem. We end the course with the definition of topological manifolds and with the classification of orientable compact topological surfaces.
- Multivariate differentiation: implicit function theorem, inverse function theorem
- Curves: Parametrized curves, curvature, canonical form and global properties of plane curves
- Surfaces: Regular surfaces, tangent planes, fundamental forms, orientation, Gauss-map, parallel-transport, geodesics, Gauss-Bonnet theorem
- Introduction to Topological Manifolds: Classification of surfaces, Whitney's embedding theorem
The schedule for the course can be found on MyTimeTable.
Mode of instruction
Lectures (maybe online), and discussion sessions
Weekly lectures and problem sessions. Written exam plus weekly homework. The final grade is the weighted average of the written exam (80%) and the homework grade (20%).
Manfredo P. Do Carmo: Differential Geometry of Curves and Surfaces
From the academic year 2022-2023 on every student has to register for courses with the new enrollment tool MyStudyMap. There are two registration periods per year: registration for the fall semester opens in July and registration for the spring semester opens in December. Please see this page for more information.
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