ODE | Bifurcation diagrams
Examples and explanations for a course in ordinary differential equations. ODE playlist: • Ordinary Differential Equations In this video we explain how to construct a bifurcation diagram for a differential equation that depends on a parameter. We illustrate the idea using the example of the logistic equation with a harvesting parameter. We also show how the bifurcation diagram can be used to answer questions about harvesting rates.
▶︎
ODE | Principle of superposition
▶︎
Bifurcations and bifurcation diagrams
▶︎
sketching phase portraits
▶︎
Laplace Transform: First Order Equation
▶︎
This equation will change how you see the world (the logistic map)
▶︎
Differential equations, a tourist's guide | DE1
▶︎
Derivatives Aren't What You Think They Are
▶︎
Introducing Bifurcations: The Saddle Node Bifurcation
▶︎
Topics in Dynamical Systems: Fixed Points, Linearization, Invariant Manifolds, Bifurcations & Chaos
▶︎
Yulij Ilyashenko - What is the Bifurcation Theory about?
▶︎
Russell's Paradox - a simple explanation of a profound problem
▶︎
The Big Picture of Linear Algebra
▶︎
Bifurcation Theory
▶︎
The Logistic Map: Attractors, Bifurcation, and Chaos (Part 1 of 2)
▶︎
First Order Linear Differential Equation & Integrating Factor (introduction & example)
▶︎
24. Markov Matrices; Fourier Series
▶︎
Bifurcation Values
▶︎
10.1 Bifurcation and Lac Operon
▶︎
Saddle Node Bifurcations - Dynamical Systems | Lecture 6
▶︎