A dynamical system that undergoes a supercritical Hopf's bifurcation is perturbed by a multiplicative Brownian motion that scales with a small parameter ɛ. The random fluctuations of the system at the critical point are studied when the dynamics starts near equilibrium, in the limit as ɛ goes to zero. Under a space–time scaling the system can be approximated by a 2-dimensional process lying on the center manifold of the Hopf's bifurcation and a slow radial component together with a fast angular component are identified. Then the critical fluctuations are described by a “universal” stochastic differential equation whose coefficients are obtained taking the average with respect to the fast variable.
Long time fluctuations at critical parameter of Hopf’s bifurcation / Aleandri, M., Pra, P.D.. - In: STOCHASTIC PROCESSES AND THEIR APPLICATIONS. - ISSN 0304-4149. - 192:(2026). [10.1016/j.spa.2025.104785]
Long time fluctuations at critical parameter of Hopf’s bifurcation
Aleandri, M.;
2026
Abstract
A dynamical system that undergoes a supercritical Hopf's bifurcation is perturbed by a multiplicative Brownian motion that scales with a small parameter ɛ. The random fluctuations of the system at the critical point are studied when the dynamics starts near equilibrium, in the limit as ɛ goes to zero. Under a space–time scaling the system can be approximated by a 2-dimensional process lying on the center manifold of the Hopf's bifurcation and a slow radial component together with a fast angular component are identified. Then the critical fluctuations are described by a “universal” stochastic differential equation whose coefficients are obtained taking the average with respect to the fast variable.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
