Stochastic Hopf bifurcation in quasi-integrable-Hamiltonian systems

An n-degree-of-freedom quasi-non-integrable-Hamiltonian system is first reduced to an Itoˆequation of one-dimensional averaged Hamiltonian by using the stochastic averaging method developed by the first author and his coworkers. The necessary and sufficient conditions for the asymptotic stability in

A nonlinear stochastic optimal time-delay control strategy for quasi-integrable Hamiltonian systems is proposed. First, a stochastic optimal control problem of quasi-integrable Hamiltonian system with time-delay in feedback control subjected to Gaussian white noise is formulated. Then, the time-dela

A stochastic averaging method for predicting the response of multi-degree-of-freedom (MDOF) quasi-integrable Hamiltonian systems to external and/or parametric wide-band random excitations is proposed. The motion equations governing a MDOF quasi-integrable Hamiltonian system is reduced to a set of av

The Hamiltonian Hopf bifurcation has an integrable normal form that describes the passage of the eigenvalues of an equilibrium through the 1 : -1 resonance. At the bifurcation the pure imaginary eigenvalues of the elliptic equilibrium turn into a complex quadruplet of eigenvalues and the equilibrium