Existence and Stability the Lagrangian point L4 for the Earth-Sun system under a relativistic framework

Abstract

It is well known that, from the Newtonian point of view, the Lagrangian point L4 in the circular restricted three body is stable if μ< 118(9-19)≈ 0.03852. In this paper we will provide a formula that allows us to compute the eigenvalues of the matrix that determines the stability of the equilibrium points of a family of ordinary differential equations. As an application we will show that, under the relativistic framework, the Lagrangian point L4 is also stable for the Sun-Earth system. Similar arguments show the stability for L4 not only for the Sun-Earth system but for systems coming from a range of values for μ similar to those in the Newtonian restricted three body problem.