| Chaos is a kind of special type in the nonlinear dynamical system, it widely lies in nature. Recently, chaos control and synchronization have been an active research of the nonlinear subject. This new technology promises to have significant impact on many novel engineering applications. The challenging research field has become a scientific inter-discipline involving many other fields. Form the point of practical application, in this paper, we study full state hybrid projective synchronization. The main content is depicted as follows:Chapter one gives the introduction of the predecessors'works systematically in this field including the notion, the methods and the application to practice of the chaossynchronization.The chapter two discusses the full state hybrid projective synchronization in continuous-time chaotic systems. Brief the full state hybrid projective synchronization and mathematical model is given. Based on synchronization error of feedback linearization system thinking, a controller is designed to realize the full state hybrid projective synchronization. Taking Lorenz system,hyperchaotic Chen and new three-dimensional autonomous chaos system as examples, the full state hybrid projective synchronization of the same structure chaotic systems is realized. The Matlab software is used to prove the effectiveness of this method.The third chapter discusses the full state hybrid projective synchronization between two different structure of chaos systems. Brief the full state hybrid projective synchronization and mathematical model is given. Taking Chen system and Liu system as examples, the full state hybrid projective synchronization of different chaotic systems is realized; taking hyperchaotic Chen system and hyperchaotic Lüsystem as examples, the full state hybrid projective synchronization of different hyperchaotic chaotic systems is realized. Through theoretical calculations and computer simulation results show that the effectiveness of the method.Last, concludes the work and points out some aspects to be further studied on chaos synchronization of nonlinear dynamic systems. |