Play all

Introduction to LaTeX and TikZ

Analysis II Lecture 01 Part 1 diagrams

Analysis II Lecture 01 Part 2 products

Analysis II Lecture 01 Part 3 existence and uniqueness of products

Analysis II Lecture 01 Part 4 determinants

Analysis II Lecture 02 Part 1 basic topology of euclidean space

Analysis II Lecture 02 Part 2 nested rectangles

Analysis II Lecture 02 Part 3 Compactness

Analysis II Lecture 02 Part 4 connected and convex subsets

Analysis II Lecture 03 Part 1 functions

Analysis II Lecture 03 Part 2 limits

Analysis II Lecture 03 Part 3 continuity

Analysis II Lecture 03 Part 4 continuity theorems

Analysis II Lecture 03 Part 5 continuous paths

Analysis II Lecture 04 Part 1 intuition for derivatives

Analysis II Lecture 04 Part 2 the differential

Analysis II Lecture 04 Part 3 the chain rule

Analysis II Lecture 04 Part 4 example applying the chain rule

Analysis II Lecture 05 Part 1 partial derivatives

Analysis II Lecture 05 Part 2 continuously differentiable functions

Analysis II Lecture 06 Part 1 The derivative functor

Analysis II Lecture 06 Part 2 vector fields as derivations

Analysis II Lecture 06 Part 3 when partial derivatives commute

Analysis II Lecture 06 Part 4 continuously differentiable versus differentiable

Analysis II Lecture 07 Part 1 integral curves of vector fields

Analysis II Lecture 07 Part 2 dynamical systems

Analysis II Lecture 07 Part 3 integrals/constants of the motion

Analysis II Lecture 08 Part 1 inverse differential

Analysis II Lecture 08 Part 2 motivation for the inverse function theorem

Analysis II Lecture 08 Part 3 sketch of proof of inverse function theorem I

Analysis II Lecture 08 Part 4 sketch of proof of inverse function theorem II

Analysis II Lecture 09 Part 1 (review) example computing the differential of a function

Analysis II Lecture 10 Part 1 height functions and level sets

Analysis II Lecture 10 Part 2 Lemma for the implicit function theorem

Analysis II Lecture 10 Part 3 proof of lemma for the implicit function theorem

Analysis II Lecture 10 Part 4 statement and example of implicit function theorem

Analysis II Lecture 11 Part 1 manifolds

Analysis II Lecture 11 Part 2 alternative definition of manifold and non-examples

Analysis II Lecture 11 Part 3 implicitly defined manifolds

Analysis II Lecture 12 Part 1 the tangent space

Analysis II Lecture 12 Part 2 tangent space using curves

Analysis II Lecture 12 Part 3 associative algebras and derivations

Analysis II Lecture 12 Part 4 Hadamard's Lemma

Analysis II Lecture 13 Part 1 the differential for functions on manifolds

Analysis II Lecture 13 Part 2 Jacobians for differentiable functions on manifold

Analysis II Lecture 13 Part 3 familiar theorems for manifolds

Analysis II Lecture 13 Part 4 submanifolds and normal vectors

Analysis II Lecture 14 Part 1 orientations

Analysis II Lecture 14 Part 2 the degree and index

Analysis II Lecture 14 Part 3 examples of the index for vector fields

Analysis II Lecture 14 Part 4 the index is well-defined

Analysis II Lecture 15 Part 1 vector fields on manifolds

Analysis II Lecture 15 Part 2 flows on manifolds

Analysis II Lecture 15 Part 3 Triangulations and the Euler characteristic

Analysis II Lecture 15 Part 4 Poincare Hopf theorem and hairy ball theorem

Analysis II Lecture 16 Part 1 metric spaces

Analysis II Lecture 16 Part 2 Cauchy sequences in metric spaces

Analysis II Lecture 16 Part 3 point set topology and types of functions

Analysis II Lecture 16 Part 4 the completion of a metric space

Analysis II Lecture 17 Part 1 the method of successive approximations

Analysis II Lecture 17 Part 2 contraction mapping theorem I

Analysis II Lecture 17 Part 3 contraction mapping theorem II

Analysis II Lecture 17 Part 4 weaker fixed point theorem for compact subsets

Analysis II Lecture 18 Part 1 the matrix exponential

Analysis II Lecture 18 Part 2 damped harmonic oscillator

Analysis II Lecture 18 Part 3 non-autonomous linear ordinary differential equations

Analysis II Lecture 19 Part 1 integral equations

Analysis II Lecture 19 Part 2 existence and uniqueness of solutions to ODEs

Description:

Dive into a comprehensive series of video lectures on Analysis II, spanning 14 hours of in-depth mathematical exploration. Begin with an introduction to LaTeX and TikZ, then progress through fundamental concepts such as topology in Euclidean space, functions, limits, continuity, and derivatives. Explore advanced topics including vector fields, dynamical systems, inverse function theorem, implicit function theorem, manifolds, and metric spaces. Examine orientations, the degree and index of vector fields, flows on manifolds, and the Poincaré-Hopf theorem. Conclude with discussions on metric spaces, contraction mapping theorem, matrix exponentials, and solutions to ordinary differential equations. Gain a thorough understanding of Analysis II through these detailed lectures, complete with examples, proofs, and applications.

Analysis II Video Lectures

Add to list

#Mathematics #Calculus #Differential Equations #Business #Finance #Trading #Derivatives #Mathematical Analysis #Integrals #Differentiability #Geometry #Topology #Manifolds