Edge of chaos of the classical kicked top map: Sensitivity to initial conditions

Abstract

We focus on the frontier between the chaotic and regular regions for the classical version of the quantum kicked top. We show that the sensitivity to the initial conditions is numerically well characterised by =eqλq t, where eqx [ 1+(1-q) x]11-q (e1x=ex), and λq is the q-generalization of the Lyapunov coefficient, a result that is consistent with nonextensive statistical mechanics, based on the entropy Sq=(1- Σipiq)/(q-1) (S1 =-Σi pi pi). Our analysis shows that q monotonically increases from zero to unity when the kicked-top perturbation parameter α increases from zero (unperturbed top) to αc, where αc 3.2. The entropic index q remains equal to unity for α αc, parameter values for which the phase space is fully chaotic.

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