Dynamics of the nonlinear Klein-Gordon equation in the nonrelativistic limit, I

Abstract

The nonlinear Klein-Gordon (NLKG) equation on a manifold M in the nonrelativistic limit, namely as the speed of light c tends to infinity, is considered. In particular, a higher-order normalized approximation of NLKG (which corresponds to the NLS at order r=1) is constructed, and when M is a smooth compact manifold or Rd it is proved that the solution of the approximating equation approximates the solution of the NLKG locally uniformly in time. When M=Rd, d ≥ 3, it is proved that solutions of the linearized order r normalized equation approximate solutions of linear Klein-Gordon equation up to times of order O(c2(r-1)) for any r>1.