Near-resonant motions in systems with random perturbations (Q2714636)

The author investigates the system of the type NEWLINE\[NEWLINE \begin{aligned} &\dot x = \varepsilon f(x, \theta_1,\theta_2) + \varepsilon F(x,\theta_1,\theta_2)\xi(t),\\ &\dot\theta_i = \omega_i(x) + \varepsilon g_i(x,\theta_1,\theta_2) + \varepsilon G_i(x,\theta_1,\theta_2) \xi(t),\quad i=1,2,\end{aligned} \tag{1} NEWLINE\]NEWLINE as \( \varepsilon\to 0\), where \(x\) and \(\theta_i\) are scalars, \(\xi(t)\) is a stationary random process with zero mean satisfying some conditions of mixing. By means of successive averaging the slow variable is obtained. The zone of vibration and rotation motion is established. Necessary conditions for ``sticking in resonance'' of system (1) are established. The example of the second order system is considered.