DR. Strogatz, thank you once again for another awesome lecture on Chaos in the historic Lorenz equations. Whether Chaos system is predictable or not , it is really an important mathematical discovery.
It sucks that Interactive Differential Equation stops working. I have looked up and found Professor Strogatz's tweet thread about MIT Mathlets, but I could not find the corresponding applet for the Lorenz Equations.
If I try to test statistically the possibility of a pattern described by the Lorenz equations for 3 random variables, and I don't find any. Can I conclude that the 3 variables in question do not show a chaotic behaviour and therefore there will be a possible statistical deterministic model that can explain them?
DR. Strogatz, thank you once again for another awesome lecture on Chaos in the historic Lorenz equations. Whether Chaos system is predictable or not , it is really an important mathematical discovery.
It sucks that Interactive Differential Equation stops working. I have looked up and found Professor Strogatz's tweet thread about MIT Mathlets, but I could not find the corresponding applet for the Lorenz Equations.
Could you explain how C+ and C- are linearly stable for r < rhopf
If I try to test statistically the possibility of a pattern described by the Lorenz equations for 3 random variables, and I don't find any. Can I conclude that the 3 variables in question do not show a chaotic behaviour and therefore there will be a possible statistical deterministic model that can explain them?
did someone managed to make the interactive differential equation site work ? is it a java problem?
Muito bom!
il y'a un autre cas ou V=0 à part l'origine, si r=1 et x=y et z=0 !!!
Cool!