Zero-Hopf Bifurcation of Qi hyperchaotic Systems

Abstract

In this paper, we show a zero-Hopf bifurcations in a four-dimensional hyperchaotic Qi system. While the hyperchaotic dynamics of this model have been extensively investigated, the existence and bifurcation of zero-Hopf equilibria have not been previously analyzed. We first characterize the equilibrium points and determine the parameter conditions under which the origin becomes a zero-Hopf equilibrium. Using second-order averaging theory, we establish the existence of up to four small amplitude periodic solutions bifurcating from the origin under suitable parameter perturbations. We also provide analytical expressions for the initial conditions of these solutions.