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Analysis II Lecture 14 Part 3 examples of the index for vector fields
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Analysis II Video Lectures
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- 1 Introduction to LaTeX and TikZ
- 2 Analysis II Lecture 01 Part 1 diagrams
- 3 Analysis II Lecture 01 Part 2 products
- 4 Analysis II Lecture 01 Part 3 existence and uniqueness of products
- 5 Analysis II Lecture 01 Part 4 determinants
- 6 Analysis II Lecture 02 Part 1 basic topology of euclidean space
- 7 Analysis II Lecture 02 Part 2 nested rectangles
- 8 Analysis II Lecture 02 Part 3 Compactness
- 9 Analysis II Lecture 02 Part 4 connected and convex subsets
- 10 Analysis II Lecture 03 Part 1 functions
- 11 Analysis II Lecture 03 Part 2 limits
- 12 Analysis II Lecture 03 Part 3 continuity
- 13 Analysis II Lecture 03 Part 4 continuity theorems
- 14 Analysis II Lecture 03 Part 5 continuous paths
- 15 Analysis II Lecture 04 Part 1 intuition for derivatives
- 16 Analysis II Lecture 04 Part 2 the differential
- 17 Analysis II Lecture 04 Part 3 the chain rule
- 18 Analysis II Lecture 04 Part 4 example applying the chain rule
- 19 Analysis II Lecture 05 Part 1 partial derivatives
- 20 Analysis II Lecture 05 Part 2 continuously differentiable functions
- 21 Analysis II Lecture 06 Part 1 The derivative functor
- 22 Analysis II Lecture 06 Part 2 vector fields as derivations
- 23 Analysis II Lecture 06 Part 3 when partial derivatives commute
- 24 Analysis II Lecture 06 Part 4 continuously differentiable versus differentiable
- 25 Analysis II Lecture 07 Part 1 integral curves of vector fields
- 26 Analysis II Lecture 07 Part 2 dynamical systems
- 27 Analysis II Lecture 07 Part 3 integrals/constants of the motion
- 28 Analysis II Lecture 08 Part 1 inverse differential
- 29 Analysis II Lecture 08 Part 2 motivation for the inverse function theorem
- 30 Analysis II Lecture 08 Part 3 sketch of proof of inverse function theorem I
- 31 Analysis II Lecture 08 Part 4 sketch of proof of inverse function theorem II
- 32 Analysis II Lecture 09 Part 1 (review) example computing the differential of a function
- 33 Analysis II Lecture 10 Part 1 height functions and level sets
- 34 Analysis II Lecture 10 Part 2 Lemma for the implicit function theorem
- 35 Analysis II Lecture 10 Part 3 proof of lemma for the implicit function theorem
- 36 Analysis II Lecture 10 Part 4 statement and example of implicit function theorem
- 37 Analysis II Lecture 11 Part 1 manifolds
- 38 Analysis II Lecture 11 Part 2 alternative definition of manifold and non-examples
- 39 Analysis II Lecture 11 Part 3 implicitly defined manifolds
- 40 Analysis II Lecture 12 Part 1 the tangent space
- 41 Analysis II Lecture 12 Part 2 tangent space using curves
- 42 Analysis II Lecture 12 Part 3 associative algebras and derivations
- 43 Analysis II Lecture 12 Part 4 Hadamard's Lemma
- 44 Analysis II Lecture 13 Part 1 the differential for functions on manifolds
- 45 Analysis II Lecture 13 Part 2 Jacobians for differentiable functions on manifold
- 46 Analysis II Lecture 13 Part 3 familiar theorems for manifolds
- 47 Analysis II Lecture 13 Part 4 submanifolds and normal vectors
- 48 Analysis II Lecture 14 Part 1 orientations
- 49 Analysis II Lecture 14 Part 2 the degree and index
- 50 Analysis II Lecture 14 Part 3 examples of the index for vector fields
- 51 Analysis II Lecture 14 Part 4 the index is well-defined
- 52 Analysis II Lecture 15 Part 1 vector fields on manifolds
- 53 Analysis II Lecture 15 Part 2 flows on manifolds
- 54 Analysis II Lecture 15 Part 3 Triangulations and the Euler characteristic
- 55 Analysis II Lecture 15 Part 4 Poincare Hopf theorem and hairy ball theorem
- 56 Analysis II Lecture 16 Part 1 metric spaces
- 57 Analysis II Lecture 16 Part 2 Cauchy sequences in metric spaces
- 58 Analysis II Lecture 16 Part 3 point set topology and types of functions
- 59 Analysis II Lecture 16 Part 4 the completion of a metric space
- 60 Analysis II Lecture 17 Part 1 the method of successive approximations
- 61 Analysis II Lecture 17 Part 2 contraction mapping theorem I
- 62 Analysis II Lecture 17 Part 3 contraction mapping theorem II
- 63 Analysis II Lecture 17 Part 4 weaker fixed point theorem for compact subsets
- 64 Analysis II Lecture 18 Part 1 the matrix exponential
- 65 Analysis II Lecture 18 Part 2 damped harmonic oscillator
- 66 Analysis II Lecture 18 Part 3 non-autonomous linear ordinary differential equations
- 67 Analysis II Lecture 19 Part 1 integral equations
- 68 Analysis II Lecture 19 Part 2 existence and uniqueness of solutions to ODEs