Dynamical Properties of Fractional-Order Memristor
نویسندگان
چکیده
منابع مشابه
On the Fractional-order Memristor Model
Fractional order calculus is the general expansion of linear integerorder calculus and is considered as one of the novel topics for modelling dynamical systems in different applications. In this paper, the generalized state equation of the nonlinear two-terminal element which is called memristor is discussed in the fractional-order sense. The effect of the added fractional-order parameter on th...
متن کاملGeneration and Nonlinear Dynamical Analyses of Fractional-Order Memristor-Based Lorenz Systems
1 College of Electrical Engineering and Automation, Shandong University of Science and Technology, No. 579, Qianwan’gang Road, Qingdao Economic and Technical Development Zone, Qingdao 266510, China; E-Mails: [email protected] or [email protected] (H.X.); [email protected] (X.H.) 2 Department of Mathematics, North University of China, No. 3, Xueyuan Road, Jiancaoping District, Taiyuan 030051...
متن کاملFractional Memristor
Based on the differential conformal transformation in the fractional order, we defined the fractional memristor in contrast to the traditional (integer-order) memristor. As an example, a typical STT memristor (with the asymmetric resistance hysteresis) was proved to be a 0.8 fractional memristor. In conclusion, many memristors should not be treated as ideal ones due to the fractional interactio...
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A memristor-based fractional order circuit derived from Chua’s topology is presented. The dynamic properties of this circuit such as phase trajectories, time evolution characteristics of state variables are analyzed through the approximation method of fractional order operator. In addition, it clearly describes the relationships between the impedance variation of the memristor and the varying m...
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As it results from many research works, the majority of real dynamical objects are fractional-order systems, although in some types of systems the order is very close to integer order. Application of fractional-order models is more adequate for the description and analysis of real dynamical systems than integer-order models, because their total entropy is greater than in integer-order models wi...
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ژورنال
عنوان ژورنال: Symmetry
سال: 2020
ISSN: 2073-8994
DOI: 10.3390/sym12030437