Stability and Anti-Chaos Control of Discrete Quadratic Maps

A dynamical system describes the consequence of current state an event or particle in future. The models expressed by functions systems are more often deterministic, but these might also be stochastic some cases. prediction system's behavior future is studied with analytical solution implicit relations (Differential, Difference equations) and simulations. discrete-time first order equations quadratic nonlinearity considered for study this work. Classical approach stability analysis using Jury's condition employed to analyze stability. chaotic nature illustrated bifurcation theory. enhancement chaos performed Cosine Chaotification Technique (CCT).
 Simulations carried out different parameter values.