The eccentric Kozai-Lidov effect as a resonance phenomenon

TL;DR

This paper interprets the eccentric Kozai-Lidov effect as a resonance phenomenon in celestial mechanics, revealing complex dynamics including orbit flips and bifurcations through advanced mathematical analysis.

Contribution

It introduces a novel resonance perspective on the EKL-effect, extending the classical model to include octupole terms and analyzing the resulting bifurcations and flip times.

Findings

EKL-effect can be viewed as a resonance phenomenon.

Resonance degeneracy affects the evolution of orbital flips.

Bifurcation analysis estimates flip times across phase space.

Abstract

Exploring weakly perturbed Keplerian motion within the restricted three-body problem, Lidov (1962) and, independently, Kozai (1962) discovered coupled oscillations of eccentricity and inclination (the KL-cycles). Their classical studies were based on an integrable model of the secular evolution, obtained by double averaging of the disturbing function approximated with its first non-trivial term. This was the quadrupole term in the series expansion with respect to the ratio of the semimajor axis of the disturbed body to that of the disturbing body. If the next (octupole) term is kept in the expression for the disturbing function, long-term modulation of the KL-cycles can established (Ford et al., 2000, Naoz et al., 2011, Katz et al., 2011). Specifically, flips between the prograde and retrograde orbits become possible. Since such flips are observed only when the perturber has a non-zero eccentricity, the term "Eccentric Kozai-Lidov Effect" (or EKL-effect) was proposed by Lithwick and Naoz (2011) to specify such behaviour. We demonstrate that the EKL-effect can be interpreted as a resonance phenomenon. To this end, we write down the equations of motion in terms of "action-angle" variables emerging in the integrable Kozai-Lidov model. It turns out that for some initial values the resonance is degenerate and the usual "pendulum" approximation is insufficient to describe the evolution of the resonance phase. Analysis of the related bifurcations allows us to estimate the typical time between the successive flips for different parts of the phase space.