Zhao Jun-san. A Criterion for the Stability of Motion of Nonlinear Systems[J]. Applied Mathematics and Mechanics, 1988, 9(11): 1033-1036.
Citation: Zhao Jun-san. A Criterion for the Stability of Motion of Nonlinear Systems[J]. Applied Mathematics and Mechanics, 1988, 9(11): 1033-1036.

A Criterion for the Stability of Motion of Nonlinear Systems

  • Received Date: 1985-07-02
  • Publish Date: 1988-11-15
  • As to an autonomous nonlinear system, the stability of the equilibrium slate in a sufficiently small neighborhood of the equilibrium state can be determined by eigen values of the linear pan of the nonlinear system provided that the eigenvalues are not in a critical case.Many methods may be used to detect the stability for a linear system.A lot of researches for determining the stability of a nonlinear system are completed by mathematicians and mechanicians but most of them are methods for the special forms of nonlinear systems.Till now.none of these methods can be conveniently applied to all nonlinear systems.The method introduced by this paper gives the necessary and sufficient conditions of the stability of a nonlinear system.The familiar Krasoyski's method is a special case of this method[1],[2].
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  • [1]
    秦元勋、王慕秋、王联,《运动稳定性理论与应用》,科学出版社(1981),234-352
    [2]
    绪方胜彦,《现代控制工程》,科学出版社(1978),550-570.
    [3]
    廿特马赫尔Ф.P.,《矩阵论》(上),高等教育出版ft(1957),293-336.
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