Nonlinear friction as a mechanism of directed motion

被引:0
|
作者
Yu. L. Bolotin
A. V. Tur
V. V. Yanovsky
机构
[1] National Scientific Center Kharkov Institute of Physics and Technology,Institute of Theoretical Physics
[2] Center D’etude Spatiale Des Rayonnements,Institute of Single Crystals
[3] National Academy of Sciences of Ukraine,undefined
来源
Technical Physics | 2002年 / 47卷
关键词
Simple Model; Directed Motion; Velocity Space; Existence Condition; Random Force;
D O I
暂无
中图分类号
学科分类号
摘要
A simple model (ratchet model) of occurrence of directed motion under the action of a zero-mean fluctuating force is proposed. The motion arises when the symmetry in the velocity space is violated by nonlinear friction. The mechanism of the directed motion is discussed qualitatively. Existence conditions of the motion are derived. The efficiency of conversion of the fluctuating random force to the directed motion is estimated.
引用
收藏
页码:803 / 806
页数:3
相关论文
共 50 条
  • [21] Adaptive Motion and Posture Control of Inverted Pendulums with Nonlinear Friction Compensation
    Chaoui, Hicham
    Yadav, Sumit
    [J]. PROCEEDINGS 2016 IEEE 25TH INTERNATIONAL SYMPOSIUM ON INDUSTRIAL ELECTRONICS (ISIE), 2016, : 344 - 349
  • [22] Stick–Slip Motion and Static Friction in a Nonlinear Deformable Substrate Potential
    M. Motchongom-Tingue
    G. Djuidjé Kenmoé
    T. C. Kofané
    [J]. Tribology Letters, 2011, 43 : 65 - 72
  • [23] Identification and adaptive robust precision motion control of systems with nonlinear friction
    Chao Li
    Zheng Chen
    Bin Yao
    [J]. Nonlinear Dynamics, 2019, 95 : 995 - 1007
  • [24] Significant influence of nonlinear friction torque on motion performance of tracking turntables
    Xu, Jimin
    Li, Zhi
    Tang, Huohong
    Zheng, Wenying
    Yuan, Xiaoyang
    [J]. TRIBOLOGY INTERNATIONAL, 2019, 136 : 148 - 154
  • [25] Motion and Balance Neural Control of Inverted Pendulums with Nonlinear Friction and Disturbance
    Chaoui, Hicham
    Sicard, Pierre
    [J]. 2011 24TH CANADIAN CONFERENCE ON ELECTRICAL AND COMPUTER ENGINEERING (CCECE), 2011, : 1222 - 1227
  • [26] Nonlinear friction in the periodic stick-slip motion of coupled oscillators
    Braiman, Y
    Family, F
    Hentschel, HGE
    [J]. PHYSICAL REVIEW B, 1997, 55 (08) : 5491 - 5504
  • [27] On break-away forces in actuated motion systems with nonlinear friction
    Ruderman, Michael
    [J]. MECHATRONICS, 2017, 44 : 1 - 5
  • [28] Friction Dynamics of Human Skin Treated with Oil under Nonlinear Motion
    Sakata, Yuka
    Mayama, Hiroyuki
    Nonomura, Yoshimune
    [J]. JOURNAL OF OLEO SCIENCE, 2024, 73 (02) : 177 - 186
  • [29] BIFURCATION ANALYSIS OF A PD CONTROLLED MOTION STAGE WITH A NONLINEAR FRICTION ISOLATOR
    Basta, Ehab E.
    Gupta, Sunit K.
    Barry, Oumar R.
    [J]. PROCEEDINGS OF ASME 2022 INTERNATIONAL DESIGN ENGINEERING TECHNICAL CONFERENCES AND COMPUTERS AND INFORMATION IN ENGINEERING CONFERENCE, IDETC-CIE2022, VOL 9, 2022,
  • [30] Identification and adaptive robust precision motion control of systems with nonlinear friction
    Li, Chao
    Chen, Zheng
    Yao, Bin
    [J]. NONLINEAR DYNAMICS, 2019, 95 (02) : 995 - 1007
12345