Abstract
In the present paper, based on the concept of the pth moment Lyapunov exponent, the stochastic stability of a typical co-dimension two bifurcation system, that is on a three-dimensional center manifold and possesses two pure imaginary eigenvalues and one zero-eigenvalue and is excited by a non-Gaussian colored noise, is investigated. The non-Gaussian colored noise is treated as an Ornstein–Uhlenbeck process by means of the path-integral approach. Based on the perturbation approach and the Green's functions method, the second differential eigenvalue equation which governing the moment Lyapunov exponent is established. By solving the eigenvalue problem, the weak noise asymptotic expansions for the finite pth moment Lyapunov exponent are obtained, and which matches the approximation of the numerical Monte Carlo simulations. Finally, the conclusions are given.
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