Non-Collision singularities in the Planar two-Center-two-Body problem

Abstract

In this paper, we study a model of simplified four-body problem called planar two-center-two-body problem. In the plane, we have two fixed centers Q1=(-,0), Q2=(0,0) of masses 1, and two moving bodies Q3 and Q4 of masses μ 1. They interact via Newtonian potential. Q3 is captured by Q2, and Q4 travels back and forth between two centers. Based on a model of Gerver, we prove that there is a Cantor set of initial conditions which lead to solutions of the Hamiltonian system whose velocities are accelerated to infinity within finite time avoiding all early collisions. We consider this model as a simplified model for the planar four-body problem case of the Painlev\'e conjecture.