--- date: 2022-03-25 16:31 modification date: Friday 25th March 2022 16:31:37 title: "differential geometry" aliases: [differential geometry, differential topology] --- Last modified date: <%+ tp.file.last_modified_date() %> --- - Tags - #geomtop/differential-geometry #MOC - Refs: - Guillemin #resources/recommendations #resources/books - Oxford course notes: #resources/notes - Links: - [Sard's Theorem](Sard's%20Theorem) - [Unsorted/Sard-Smale](Unsorted/Sard-Smale.md) - [Tubular neighborhood](Tubular%20neighborhood) - [Whitney embedding theorem](Whitney%20embedding%20theorem) - [Jordan-Brouwer separation theorem](Jordan-Brouwer%20separation%20theorem) - [Poincaré-Hopf theorem](Poincaré-Hopf%20theorem) - [Hopf degree theorem](Hopf%20degree%20theorem) - [Stokes theorem](Unsorted/Stokes%20theorem.md) - [Frobenius integrability theorem](Frobenius%20integrability%20theorem) - [Riemannian](Unsorted/Riemannian%20manifold.md) - [Unsorted/Laplace-Beltrami operator](Unsorted/Laplace-Beltrami%20operator.md) --- # Differential Geometry # Exercises • [Here](https://yifeizhu.github.io/327/midterm-solutions.pdf) are solutions to the midterm exam. • Assignment 11 (required, not collected): Sec. 4-5 #1, 3, 4, 6, 7, 8; Sec. 4-6 #1, 2, 3, 4 • Assignment 10 due Monday, May 20 (note change): Sec. 4-4 #2, 3, 4, 5, 10, 14, 15, 17, 21 • Assignment 9 due Monday, May 6 (note change): Sec. 3-4 #2, 4, 5, 7, 10, 13; Sec. 4-2 #1, 2, 11; Sec. 4-3 #1, 3, 7, 8 • Assignment 8 due Monday, Apr. 22: Sec. 3-3 #4, 5 (see also Sec. 3-5 Example 7), 11, 20 ([solution](https://yifeizhu.github.io/327/umbilical.pdf)), 22, 23 (idea for part (c): given any q in S, from parts (a) and (b) we know that the only points r in R3 for which q is a degenerate critical point of hr are located on the normal line through q with distance 1/k1(q) or 1/k2(q) from q, namely, there are 4 such points r. Thus, roughly speaking, the set B is the complement in R3 of 4 surfaces with distance 1/k1(q) or 1/k2(q) from S, which is clearly open and dense.) • Assignment 7 due Monday, Apr. 15: Sec. 3-3 #1; Sec. 1-5 #3; show that a point p of a regular surface is umbilical if and only if the Gaussian curvature K and the mean curvature H at p satisfy H2 = K; find the coefficients e, f, g and the matrix dN in coordinates for the coordinate chart **x**(u, v) = (u2 + v2, u + v, u − v). • Assignment 6 due Monday, Apr. 1: Sec. 3-2 #3, 4, 5, 6, 12, 18 • Assignment 5 due Monday, Mar. 25: Sec. 2-5 #1, 5, 10, 11, 14 • Assignment 4 due Monday, Mar. 18: Sec. 2-3 #2, 3, 9, 11, 13; Sec. 2-4 #11, 16, 18 • Assignment 3 due Monday, Mar. 11: Sec. 2-2 #1, 2, 7, 16; state carefully the Implicit Function Theorem and give an alternative proof of Proposition 2 by this theorem (you may need Proposition 1 as well). • Assignment 2 due Monday, Mar. 4: Sec. 1-4 #2, 5, 13; Sec. 1-5 #1, 2, 6 (Zhou Xiangrui pointed out that part (b) was wrong), 12 • Assignment 1 due Monday, Feb. 25: Sec. 1-2 #1, 3, 4; Sec. 1-3 #1, 2, 6, 9