High-Power Fractional-Order Capacitor With 1 < α < 2 Based on Power Converter

被引:50
|
作者
Jiang, Yanwei [1 ]
Zhang, Bo [1 ]
机构
[1] South China Univ Technol, Sch Elect Power, Guangzhou 510640, Guangdong, Peoples R China
来源
IEEE TRANSACTIONS ON INDUSTRIAL ELECTRONICS | 2018年 / 65卷 / 04期
基金
中国国家自然科学基金;
关键词
Fractional-order circuit; fractional-order derivative; high-power fractional-order capacitor (FOC); power converter; PARAMETERS; IMPEDANCE; RC;
D O I
10.1109/TIE.2017.2756581
中图分类号
TP [自动化技术、计算机技术];
学科分类号
0812 ;
摘要
A fractional-order capacitor (FOC) plays a vital role in fractional-order circuits. However, the FOC with order 1 < alpha < 2 based on existing manufacturing schemes can be only operated in milliwatt power level. Thus, the applications of an FOC in power conversion are limited. To solve the problem, this paper proposes a novel method for realizing a high-power FOC with order 1 < alpha < 2, in which a power converter is applied to emulate the current-voltage characteristic of an ideal FOC, so the rated power of the FOC can be increased greatly and depended on the power converter. The corresponding topology and its control strategy are provided. The available experiments verify the effectiveness of the proposed approach.
引用
收藏
页码:3157 / 3164
页数:8
相关论文
共 50 条
  • [1] One Adaptive Synchronization Approach for Fractional-Order Chaotic System with Fractional-Order 1 &lt; q &lt; 2
    Zhou, Ping
    Bai, Rongji
    SCIENTIFIC WORLD JOURNAL, 2014,
  • [2] THE CONTROLLER DESIGN FOR SINGULAR FRACTIONAL-ORDER SYSTEMS WITH FRACTIONAL ORDER 0 &lt; α &lt; 1
    Zhan, T.
    Ma, S. P.
    ANZIAM JOURNAL, 2018, 60 (02): : 230 - 248
  • [3] Stability and Stabilization of a Class of Fractional-Order Nonlinear Systems for 1 &lt; α &lt; 2
    Huang, Sunhua
    Wang, Bin
    JOURNAL OF COMPUTATIONAL AND NONLINEAR DYNAMICS, 2018, 13 (03):
  • [4] A stability criterion for fractional-order systems with α-order in frequency domain: The 1 &lt; α &lt; 2 case
    Gao, Zhe
    Liao, Xiaozhong
    Shan, Bo
    Huang, Hong
    2013 9TH ASIAN CONTROL CONFERENCE (ASCC), 2013,
  • [5] ON SYSTEMS OF FRACTIONAL-ORDER DIFFERENTIAL EQUATIONS FOR ORDER 1 &lt; ν ≤ 2
    Xu, Changjin
    Tahir, Sana
    Ansari, Khursheed j.
    Ur Rahman, Mati
    Al-duais, Fuad s.
    FRACTALS-COMPLEX GEOMETRY PATTERNS AND SCALING IN NATURE AND SOCIETY, 2023, 31 (10)
  • [6] Robust stabilization of uncertain descriptor fractional-order systems with the fractional order α(0 &lt; α &lt; 1)
    Zhang, Xuefeng
    Li, Bingxin
    PROCEEDINGS OF THE 28TH CHINESE CONTROL AND DECISION CONFERENCE (2016 CCDC), 2016, : 560 - 563
  • [7] Bounded Real Lemmas for Singular Fractional-Order Systems: The 1 &lt; α &lt; 2 Case
    Zhang, Qing-Hao
    Lu, Jun-Guo
    IEEE TRANSACTIONS ON CIRCUITS AND SYSTEMS II-EXPRESS BRIEFS, 2021, 68 (02) : 732 - 736
  • [8] The adaptive synchronization of fractional-order chaotic system with fractional-order 1 &lt; q &lt; 2 via linear parameter update law
    Zhou, Ping
    Bai, Rongji
    NONLINEAR DYNAMICS, 2015, 80 (1-2) : 753 - 765
  • [9] Robust Stability and Stabilization of Fractional-Order Interval Systems with the Fractional Order α: The 0 &lt; α &lt; 1 Case
    Lu, Jun-Guo
    Chen, Yang-Quan
    IEEE TRANSACTIONS ON AUTOMATIC CONTROL, 2010, 55 (01) : 152 - 158
  • [10] Observer-based control for fractional-order singular systems with order α (0 &lt; α &lt; 1) and input delay
    Li, Bingxin
    Zhao, Xiangfei
    Zhang, Xuefeng
    Zhao, Xin
    FRONTIERS OF INFORMATION TECHNOLOGY & ELECTRONIC ENGINEERING, 2022, 23 (12) : 1862 - 1870
12345