数学物理学报(英文版) ›› 2012, Vol. 32 ›› Issue (4): 1391-1398.doi: 10.1016/S0252-9602(12)60107-6

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ELEMENTARY BIFURCATIONS FOR A SIMPLE DYNAMICAL SYSTEM UNDER NON-GAUSSIAN LÉVY NOISES

陈慧琴1,2*|段金桥3|张诚坚1   

  1. 1. School of Mathematics and Statistics, Huazhong University of Science and Technology, Wuhan 430074, China;
    2. School of Mathematics and Computer Science, Jianghan University, Wuhan 430056, China;
    3. Department of Applied Mathematics, Illinois Institute of Technology, Chicago, IL 60616, USA
  • 收稿日期:2010-12-10 修回日期:2011-04-15 出版日期:2012-07-20 发布日期:2012-07-20
  • 通讯作者: 陈慧琴,chenhuiqin111@yahoo.com.cn E-mail:chenhuiqin111@yahoo.com.cn; duan@iit.edu; cjzhang@mail.hust.edu.cn
  • 基金资助:

    This work was partly supported by the NSFC(10971225, 11171125, 91130003 and 11028102), the NSFH (2011CDB289), HPDEP (20114503 and 2011B400), the Cheung Kong Scholars Program and the Fundamental Research Funds for the Central Universities, HUST
    (2010ZD037).

ELEMENTARY BIFURCATIONS FOR A SIMPLE DYNAMICAL SYSTEM UNDER NON-GAUSSIAN LÉVY NOISES

 CHEN Hui-Qin1,2*, DUAN Jin-Qiao3, ZHANG Cheng-Jian1   

  1. 1. School of Mathematics and Statistics, Huazhong University of Science and Technology, Wuhan 430074, China;
    2. School of Mathematics and Computer Science, Jianghan University, Wuhan 430056, China;
    3. Department of Applied Mathematics, Illinois Institute of Technology, Chicago, IL 60616, USA
  • Received:2010-12-10 Revised:2011-04-15 Online:2012-07-20 Published:2012-07-20
  • Contact: CHEN Hui-Qin,chenhuiqin111@yahoo.com.cn E-mail:chenhuiqin111@yahoo.com.cn; duan@iit.edu; cjzhang@mail.hust.edu.cn
  • Supported by:

    This work was partly supported by the NSFC(10971225, 11171125, 91130003 and 11028102), the NSFH (2011CDB289), HPDEP (20114503 and 2011B400), the Cheung Kong Scholars Program and the Fundamental Research Funds for the Central Universities, HUST
    (2010ZD037).

摘要:

Nonlinear dynamical systems are sometimes under the influence of random fluctuations. It is desirable to examine possible bifurcations for stochastic dynamical sys-tems when a parameter varies.
A computational analysis is conducted to investigate bifurcations of a simple dynamical system under non-Gaussian α-stable L´evy motions, by examining the changes in station-ary probability density functions for the solution orbits of this stochastic system. The
stationary probability density functions are obtained by solving a nonlocal Fokker-Planck equation numerically. This allows numerically investigating phenomenological bifurcation, or P-bifurcation, for stochastic differential equations with non-Gaussian L´evy noises.

关键词: stochastic dynamical systems, non-Gaussian Lévy motion, Lévy jump mea-sure, stochastic bifurcation, impact of non-Gaussian noises

Abstract:

Nonlinear dynamical systems are sometimes under the influence of random fluctuations. It is desirable to examine possible bifurcations for stochastic dynamical sys-tems when a parameter varies.
A computational analysis is conducted to investigate bifurcations of a simple dynamical system under non-Gaussian α-stable L´evy motions, by examining the changes in station-ary probability density functions for the solution orbits of this stochastic system. The
stationary probability density functions are obtained by solving a nonlocal Fokker-Planck equation numerically. This allows numerically investigating phenomenological bifurcation, or P-bifurcation, for stochastic differential equations with non-Gaussian L´evy noises.

Key words: stochastic dynamical systems, non-Gaussian Lévy motion, Lévy jump mea-sure, stochastic bifurcation, impact of non-Gaussian noises

中图分类号: 

  • 37H20