Chaos in the fractional order unified system and its synchronization

Chaos synchronization of two identical Chua systems with the same fractional order is studied by utilizing the Pecora-Carroll (PC) method, the active-passive decomposition (PAD) method, the one-way coupling method and the bidirectional coupling one. The sufficient conditions for achieving synchroniz

Some dynamical behaviors are studied in the fractional order hyperchaotic Chen system which shows hyperchaos with order less than 4. The analytical conditions for achieving synchronization in this system via linear control are investigated theoretically by using the Laplace transform theory. Routh-H

Chaotic dynamics of fractional conjugate Lorenz system are demonstrated in terms of local stability and largest Lyapunov exponent. Chaos does exist in the fractional conjugate Lorenz system with order less than three since it has positive largest Lyapunov exponent. Furthermore, scaling chaotic attra

The dynamics of fractional-order systems have attracted increasing attentions in recent years. In this paper, we numerically study the chaotic behaviors in the fractional-order R ossler equations. We found that chaotic behaviors exist in the fractional-order R ossler equation with orders less than 3