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Projects from my Nonlinear Dynamics & Chaos class were spectacular. One student made a chaotic waterwheel (also called the Lorenz or Malkus waterwheel) using 3D-printed parts and an inexpensive water pump. The dynamics are governed by the famous Lorenz equations.

59,228 просмотров • 2 лет назад •via X (Twitter)

Комментарии: 8

Фото профиля Prof. Shane Ross
Prof. Shane Ross2 лет назад

It rotates one way, then another, ad infinitum

Фото профиля andy
andy2 лет назад

here’s some fun code for visualizing a lorenz attractor in 3D

Фото профиля vini
vini2 лет назад

@SCalangos vamo fazer um desse para um futuro estudo dirigido do Strogatz KKKKK

Фото профиля Chris Roat
Chris Roat1 год назад

Any chance the model files were made available for the water wheel? Otherwise, I may have to reinvent the, uh, wheel.

Фото профиля Citizen8
Citizen82 лет назад

Interesting. I get the strange attractor I think. What's the point though?

Фото профиля Prof. Shane Ross
Prof. Shane Ross2 лет назад

Instead of just simulating some chaotic equations on the computer, a real life demonstration helps illustrate that the phenomena are real

Фото профиля Beeraiah Thonti(AB)
Beeraiah Thonti(AB)2 лет назад

Nice sophisticated prototype, which will give feel of chaotic water wheel 😃

Фото профиля Politični Monitor SI
Politični Monitor SI2 лет назад

Hi I am looking for chaotic DE that is 0 at -infinity and oscillates chaotic around 1 (attractor=1) when approaching + infinity. Are you aware of anything like that. Sprott's jerk DEs are all with the attractor 0.

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