Convergence rates in the nonrelativistic limit of the cubic Klein-Gordon equation

Abstract

In this paper, we study the nonrelativistic limit of the cubic nonlinear Klein-Gordon equation in R3 with a small parameter 0< 1, which is inversely proportional to the speed of light. We show that the cubic nonlinear Klein-Gordon equation converges to the cubic nonlinear Schr\"odinger equation with a convergence rate of order 2. In particular, for the defocusing case and smooth initial data, we prove error estimates of the form (1+t)2 at time t which is valid up to long time of order -1; while for nonsmooth initial data, we prove error estimates of the form (1+t) at time t which is valid up to long time of order -12. These specific forms of error estimates coincide with the numerical results obtained in BZ19,SZ20.