A family of zero-velocity curves in the restricted three-body problem

Abstract

The equilibrium points and the curves of zero-velocity (Roche varieties) are analysed in the frame of the regularized circular restricted three-body problem. The coordinate transformation is done with Levi-Civita generalized method, using polynomial functions of n degree. In the parametric plane, five families of equilibrium points are identified. These families of points correspond to the five equilibrium points in the physical plane L1, L2, ..., L5. The zero-velocity curves from the physical plane are transformed in Roche varieties in the parametric plane. The properties of these varieties are analysed and the Roche varieties for n = 1,2,...,6 are plotted. The equation of the asymptotic variety is obtained and its shape is analysed. The slope of the Roche variety in L11 point is obtained. For n = 1 the slope obtained by Plavec and Kratochvil (1964) in the physical plane was found.