A new modeled fractional-order memristor and its analysis in series circuit

Fractional calculus is believed ubiquitous in the natural world, the newcomer of circuit element named memristor should also contain this character. In this paper, we introduce a new model we called triple-order charge control fractional-order memristor, which is more general for researchers to use. We studied the characteristic of this element itself and proved some conclusions in the former paper. On this basis, we go further and discuss some conditions which will be problem in the future study of memristor. The effects of parameters (fractional order a) are theoretically analyzed with the help of new model. We separate the conditions into four parts and compare the difference between them. These analyze represent the development of memristor and we think our work will help to do further research in the future.

[1]  Qing Huo Liu,et al.  Two Memristor SPICE Models and Their Applications in Microwave Devices , 2014, IEEE Transactions on Nanotechnology.

[2]  Gangquan Si,et al.  Fractional-order charge-controlled memristor: theoretical analysis and simulation , 2017 .

[3]  Ahmed Gomaa Radwan,et al.  Optimization of Fractional-Order RLC Filters , 2013, Circuits Syst. Signal Process..

[4]  Yi-Fei Pu,et al.  Fracmemristor: Fractional-Order Memristor , 2016, IEEE Access.

[5]  Juan He,et al.  Characteristics for series and parallel circuits of flux-controlled memristors , 2017, IEICE Electron. Express.

[6]  Leon O. Chua Resistance switching memories are memristors , 2011 .

[7]  D. Stewart,et al.  The missing memristor found , 2008, Nature.

[8]  Wei Yang Lu,et al.  Nanoscale memristor device as synapse in neuromorphic systems. , 2010, Nano letters.

[9]  L. Chua Memristor-The missing circuit element , 1971 .

[10]  Massimiliano Di Ventra,et al.  Experimental demonstration of associative memory with memristive neural networks , 2009, Neural Networks.

[11]  Massimiliano Di Ventra,et al.  Memristive model of amoeba’s learning , 2008 .

[12]  Sung-Mo Kang,et al.  Compact Models for Memristors Based on Charge-Flux Constitutive Relationships , 2010, IEEE Transactions on Computer-Aided Design of Integrated Circuits and Systems.

[13]  Massimiliano Di Ventra,et al.  Memristive model of amoeba learning. , 2008, Physical review. E, Statistical, nonlinear, and soft matter physics.

[14]  Leon O. Chua,et al.  Circuit Elements With Memory: Memristors, Memcapacitors, and Meminductors , 2009, Proceedings of the IEEE.

[15]  L.O. Chua,et al.  Memristive devices and systems , 1976, Proceedings of the IEEE.

[16]  A. G. RADWAN,et al.  ON THE FRACTIONAL-ORDER MEMRISTOR MODEL , 2013 .

[17]  K. Miller,et al.  An Introduction to the Fractional Calculus and Fractional Differential Equations , 1993 .

[18]  Peng Li,et al.  Nonvolatile memristor memory: Device characteristics and design implications , 2009, 2009 IEEE/ACM International Conference on Computer-Aided Design - Digest of Technical Papers.

[19]  K. B. Oldham,et al.  The Fractional Calculus: Theory and Applications of Differentiation and Integration to Arbitrary Order , 1974 .

[20]  Leon O. Chua,et al.  What are Memristor, Memcapacitor, and Meminductor? , 2015, IEEE Transactions on Circuits and Systems II: Express Briefs.

[21]  Dalibor Biolek,et al.  SPICE modelling of memcapacitor , 2010 .