MAE5790-21 Feigenbaum's renormalization analysis of period doubling Published 2014-05-27 Download video MP4 360p Recommendations 1:08:32 MAE5790-22 Renormalization: Function space and a hands-on calculation 18:39 This equation will change how you see the world (the logistic map) 1:14:35 MAE5790-19 One dimensional maps 20:55 Renormalization: The Art of Erasing Infinity 10:32 The Cultivated Narcissism of Hollywood | Adrian Grenier 18:55 The Feigenbaum Constant (4.669) - Numberphile 1:13:48 MAE5790-18 Strange attractor for the Lorenz equations 1:05:58 MAE5790-10 van der Pol oscillator 25:04 What Makes Avalanches So Deadly 28:39 Renormalization Theory for Dynamical Systems | Feigenbaum's Analysis of Period-Doubling Universality 1:16:36 MAE5790-17 Chaos in the Lorenz equations 1:07:17 MAE5790-6 Two dimensional nonlinear systems fixed points 1:13:56 MAE5790-8 Index theory and introduction to limit cycles 1:15:16 MAE5790-4 Model of an insect outbreak 08:05 Why flat earthers scare me 1:25:34 The Biggest Ideas in the Universe | 11. Renormalization 27:36 Beyond the Mandelbrot set, an intro to holomorphic dynamics 1:17:13 MAE5790-7 Conservative Systems Similar videos 22:07 Characterizing The Period-Doubling Route to Chaos 59:46 Intro Real Analysis, Lec 36: Chaos, Logistic Map, Period Doubling, Symbol Space, Shift Map 17:53 Period-Doubling Route to Chaos | Universality, Experiments, ODEs, and Maps 55:25 Lecture - 9 The Logistic Map and Period doubling 1:16:31 MAE5790-1 Course introduction and overview 1:16:44 MAE5790-2 One dimensional Systems 07:26 Introduction to Complexity: Period Doubling Route to Chaos Part 1 16:27 Dynamical Systems And Chaos: Renormalization 05:57 Nonlinear Dynamics: Feigenbaum and Universality 1:04:42 Lecture 27: Renormalization and envelopes 36:29 Renormalization of the Gaussian model 08:01 Universality in Transitions to Chaos | Where Feigenbaum Constant δ=4.669 Comes From 11:07 Introduction to Complexity: Period Doubling Route to Chaos Part 2 More results