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MAA306 - Topics in Differential Geometry (2022-2023)

This course provides an overview of the classical differential geometry of curves and surfaces. More precisely, we will study the local theory of (regular, parametrized) curves (curvature, torsion), topological and regular surfaces, and the local theory (first and second fundamental forms) and intrinsic geometry (Theorema Egregium and Gauss-Bonnet theorem) of the latter. Weekly exercise sessions form an integral part of the course. The instructor will provide lecture notes covering the materi...
MAA306-2022

MAA306 - Differential Geometry (2023-2024)

This course provides an overview of the classical differential geometry of curves and surfaces. More precisely, we will study the local theory of (regular, parametrized) curves (curvature, torsion), topological and regular surfaces, and the local theory (first and second fundamental forms) and intrinsic geometry (Theorema Egregium and Gauss-Bonnet theorem) of the latter. Weekly exercise sessions form an integral part of the course. The instructor will provide lecture notes covering the materi...
MAA306-2023

MAA306 - Topics in Differential Geometry (2022-2023)

This course provides an overview of the classical differential geometry of curves and surfaces. More precisely, we will study the local theory of (regular, parametrized) curves (curvature, torsion), topological and regular surfaces, and the local theory (first and second fundamental forms) and intrinsic geometry (Theorema Egregium and Gauss-Bonnet theorem) of the latter. Weekly exercise sessions form an integral part of the course. The instructor will provide lecture notes covering the materi...
MAA306-2022

MAA306 - Differential Geometry (2023-2024)

This course provides an overview of the classical differential geometry of curves and surfaces. More precisely, we will study the local theory of (regular, parametrized) curves (curvature, torsion), topological and regular surfaces, and the local theory (first and second fundamental forms) and intrinsic geometry (Theorema Egregium and Gauss-Bonnet theorem) of the latter. Weekly exercise sessions form an integral part of the course. The instructor will provide lecture notes covering the materi...
MAA306-2023