摘要
用推广了的等效线性化法,计算具有泊松分布的随机脉冲过程(非高斯)激励的非线性系统的随机响应.将传统的Ito随机微分方程中的Wiener过程增量,用复合泊松过程增量代替,得到矩方程,再用线性系统的随机微分方程替代非线性系统的随机微分方程,以使两系统的矩方程在四阶矩上具有最小误差,用Dufing振子作算例。
The method of generalized equivalent linearization can calculate the response statistics ofdynamics systems to Poisson distributed (non Gaussian) pulse process. The procedure to be followed is based on an extension of the traditional method of the Ito stochastic differential equation, in which the increment of the Wiener process associated with the Ito stochastic differential equation has been substituted by the increment of a compound Poisson process. With the new linearization equations the errors of the approximate differential equations for the forth moment are minimal.
出处
《四川大学学报(自然科学版)》
CAS
CSCD
北大核心
1999年第2期258-261,共4页
Journal of Sichuan University(Natural Science Edition)
关键词
随机响应
非高斯激励
非线性振动
随机振动
moment equation
stochastic pulse process
equivalent linearization
