This nonlinear system (known as Aizawa chaotic attractor) with specific initial conditions is solved
numerically and the resulting 3D coordinates map is shown in the animation.
Initial condition 1: (0.5, 0, 0)
Initial condition 2: (0.1, 0, 0)
__________________________________________________________________
My RedBubble Shop: www.redbubble....
__________________________________________________________________
Here are some links to other attractors that I animated.
Animation of TSUCS1 attractor : • Three-Scroll Unified C...
Animation of TSUCS2 attractor : • [TSUCS2] Three-Scroll ...
Animation of Sprott-Linz D attractor: • Simplest three-dimensi...
Since Lorenz found the first chaotic attractor in a smooth three-dimensional autonomous system, later chaotic attractors were developed, for example the Rossler system, the Sprott system, the Chen system, the Lu system, the generalized Lorenz system family, and the hyperbolic type of the generalized Lorenz canonical form. Here one of such attractor is shown in this video.
***************************************
Subscribe to support this channel.
***************************************
|#ChaoticSystem #ButterflyEffect#Aizawa| thinkeccel
27 сен 2024
