A Dynamic-Order Fractional Dynamic System

被引:0
|
作者
孙洪广 [1 ]
盛虎 [2 ]
陈阳泉 [3 ]
陈文 [1 ]
余钟波 [4 ]
机构
[1] State Key Laboratory of Hydrology-Water Resources and Hydraulic Engineering,College of Mechanics and Materials,Hohai University
[2] School of Electronic and Information Engineering,Dalian Jiaotong University
[3] Mechatronics,Embedded Systems and Automation(MESALab),School of Engineering,University of California
[4] State Key Laboratory of Hydrology-Water Resources and Hydraulic Engineering,Hohai
来源
Chinese Physics Letters | 2013年 / 30卷 / 04期
关键词
D O I
暂无
中图分类号
TN710 [电子电路];
学科分类号
摘要
Motivated by the experimental result of an electronic circuit element "fractor",we introduce the concept of a dynamic-order fractional dynamic system,in which the differential-order of a fractional dynamic system is determined by the output signal of another dynamic system.The concept offers an explanation for the physical mechanism of variable-order fractional dynamic systems and multi-system interaction.The properties and potential applications of dynamic-order fractional dynamic systems are further explored by analyzing anomalous relaxation and diffusion processes.
引用
收藏
页码:158 / 161
页数:4
相关论文
共 50 条
  • [1] A Dynamic-Order Fractional Dynamic System
    Sun Hong-Guang
    Sheng Hu
    Chen Yang-Quan
    Chen Wen
    Yu Zhong-Bo
    CHINESE PHYSICS LETTERS, 2013, 30 (04)
  • [2] Constitutive dynamic-order model for nonlinear contact phenomena
    Ingman, D
    Suzdalnitsky, J
    Zeifman, M
    JOURNAL OF APPLIED MECHANICS-TRANSACTIONS OF THE ASME, 2000, 67 (02): : 383 - 390
  • [3] Constitutive dynamic-order model for nonlinear contact phenomena
    Ingman, D., 1600, ASME, Fairfield, NJ, United States (67):
  • [4] Dynamic analysis of a fractional order system
    Javidi, M.
    Nyamoradi, N.
    INTERNATIONAL JOURNAL OF BIOMATHEMATICS, 2015, 8 (06)
  • [5] Dynamic characteristics analysis of time-delay fractional order dynamic system
    Dong Jun
    Xiao Yao
    Ma Hu
    Zhang Guangjun
    2020 3RD INTERNATIONAL CONFERENCE ON COMPUTER INFORMATION SCIENCE AND APPLICATION TECHNOLOGY (CISAT) 2020, 2020, 1634
  • [6] Gramian for control of fractional order multivariate dynamic system
    Das, Shantanu
    International Journal of Applied Mathematics and Statistics, 2013, 37 (07): : 71 - 96
  • [7] Gramian for Control of Fractional Order Multivariate Dynamic System
    Das, Shantanu
    INTERNATIONAL JOURNAL OF APPLIED MATHEMATICS & STATISTICS, 2013, 37 (07): : 71 - 96
  • [8] Dynamic Analysis for a Fractional-Order Autonomous Chaotic System
    Zhang, Jiangang
    Nan, Juan
    Du, Wenju
    Chu, Yandong
    Luo, Hongwei
    DISCRETE DYNAMICS IN NATURE AND SOCIETY, 2016, 2016
  • [9] System Identification of Fractional Order Dynamic Models for Electrochemical Systems
    Su, Ming
    Niu, Ran
    Zheng, Yi
    2011 IEEE INTERNATIONAL CONFERENCE ON ROBOTICS AND AUTOMATION (ICRA), 2011,
  • [10] Dynamic analysis of a fractional-order Lorenz chaotic system
    Yu, Yongguang
    Li, Han-Xiong
    Wang, Sha
    Yu, Junzhi
    CHAOS SOLITONS & FRACTALS, 2009, 42 (02) : 1181 - 1189
12345