Action minimizing orbits in the 2-center problems with simple choreography constraint

Abstract

The aim of this paper is to study the motion of 2+n-body problem where two equal masses are assumed to be fixed. We assume that the value of each fixed mass is equal to M>0 and the remaining n moving particles have equal masses m>0. According to Newton's second law and the universal gravitation law, the n particles move under the interaction of each other and the affection of the two fixed particles. Also, this motion has a natural variational structure. Under the simple choreography constraint, we show that the Lagrangian action functional attains its absolute minimum on a uniform circular motion.