Exploring Thomas Attractor
Welcome to our comprehensive guide on Thomas Attractor.
- Animation of
- Thomas' cyclically symmetric attractor
- my website : https://abd3d.design/ #blender.
- Simulation code based on https://github.com/qiqi/lorenz-movie.
- Thomas attractor
In-Depth Information on Thomas Attractor
The so-called Basic initial conditions: (dx/dt,dy/dy,dz/dt) = (sin(y(t)) - bx(t),sin(z(t)) - by(t), sin(x(t)) - bz(t)) b = 0.18 (x(0),y(0),z(0)) = (0,0.1,0). Featured: Finance attractor, 3-Cells CNN, Dadras, Bouali, Aizawa, Newton-Leipnik, Nose-Hoover, ... Attractor 2:35 The Rössler Attractor 3:21 The TSUCS2 Attractor 4:07 The Qi-Chen Attractor 4:53 The
Invariant-lib b = 0.32899 SearchSpace : [-10;10]x[-10;10]x[-10;10] Computation time : 39s.
In summary, understanding Thomas Attractor gives us a better perspective.
