Attempt to generalize fractional-order electric elements to complex-order ones

The complex derivative D^α±jβ, with α, β ∈ R+ is a generalization of the concept of integer derivative, where α = 1,β = 0. Fractional-order electric elements and circuits are becoming more and more attractive. In this paper, the complexorder electric elements concept is proposed for the first time,...

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Bibliographic Details
Published in:Chinese physics B 2017-06, Vol.26 (6), p.87-92
Main Author: 司刚全 刁利杰 朱建伟 雷妤航 张彦斌
Format: Article
Language:English
Subjects:
complex derivative
fractional-order elements
imaginary and real part
memristor
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Summary:The complex derivative D^α±jβ, with α, β ∈ R+ is a generalization of the concept of integer derivative, where α = 1,β = 0. Fractional-order electric elements and circuits are becoming more and more attractive. In this paper, the complexorder electric elements concept is proposed for the first time, and the complex-order elements are modeled and analyzed.Some interesting phenomena are found that the real part of the order affects the phase of output signal, and the imaginary part affects the amplitude for both the complex-order capacitor and complex-order memristor. More interesting is that the complex-order capacitor can do well at the time of fitting electrochemistry impedance spectra. The complex-order memristor is also analyzed. The area inside the hysteresis loops increases with the increasing of the imaginary part of the order and decreases with the increasing of the real part. Some complex case of complex-order memristors hysteresis loops are analyzed at last, whose loop has touching points beyond the origin of the coordinate system.
ISSN:1674-1056
2058-3834
DOI:10.1088/1674-1056/26/6/060503