Description
Dive into the fascinating world of non-linear dynamics and chaos theory. This simulator provides an interactive environment to explore mathematical models and observe how small changes in parameters lead to vastly different outcomes. Built-in models for the Lorenz Attractor, Chua's Circuit, Duffing and Van der Pol Oscillators, Lotka-Volterra equations, RLC Circuits, and mechanical systems Numerical integration using Runge-Kutta methods Phase space visualization of system trajectories, attractors, and chaotic behaviors Poincaré sections for analysis of periodic and chaotic orbits Configurable system parameters to observe mathematical bifurcations