Inspired by partial differential equation models of homogeneous convection possessing heteroclinic connections to infinity, we study a two dimensional system of ordinary differential equat ions whose solutions diverge exponentially for almost all initial conditions. Random perturbations of the dynamical system destabilize the divergences resulting in stochastic oscillations. Stochastic Lyapunov function methods are used to prove the existence of a statistically stationary state. A novel Monte-Carlo method is implemented to measure the extreme statistics associated with the stochastic oscillations, and a WKB analysis at low noise amplitude is carried out to corroborate the simulations.

• 出版日期2012-3