We deal with the solutions of the systems of the difference equationsxn+1=1/xn-pyn-p,yn+1=xn-pyn-p/xn-qyn-q, andxn+1=1/xn-pyn-pzn-p,yn+1=xn-pyn-pzn-p/xn-qyn-qzn-q,zn+1=xn-qyn-qzn-q/xn-ryn-rzn-r, with a nonzero real numbers initial conditions. Also, the periodicity of the general system ofkvariables will be considered.
This study addresses the adaptive synchronization of Rössler and Chua circuit systems with unknown parameters. By using Lyapunov stability theory the adaptive synchronization law with a single-state variable feedback is derived, such that the trajectory of the two systems are globally stabilized to an equilibrium point of the uncontrolled system (globally stable means that the method of the solution is restricted in area of phase space i.e. globally in a subset of a phase space with bounded zero volume). We use the Lyapunov direct method to study the asymptotic stability of the solutions of error system. Numerical simulations are given to explain the effectiveness of the proposed control scheme.
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