On the period of the periodic orbits of the restricted three body problem

Abstract

We will show that the period T of a closed orbit of the planar circular restricted three-body problem (viewed on rotating coordinates) depends on the region it encloses. Roughly speaking, we show that, 2 T=kπ+∫ g where k is an integer, is the region enclosed by the periodic orbit and g:R2 R is a function that only depends on the constant C known as the Jacobian integral; it does not depend on . This theorem has a Keplerian flavor in the sense that it relates the period with the space "swept" by the orbit. As an application, we prove that there is a neighborhood around L4 such that every periodic solution contained in this neighborhood must move clockwise. The same result holds true for L5.