High-order asymptotic expansion for the nonlinear Klein-Gordon equation in the non-relativistic limit regime

Abstract

This paper presents an investigation into the high-order asymptotic expansion for 2D and 3D cubic nonlinear Klein-Gordon equations in the non-relativistic limit regime. There are extensive numerical and analytic results concerning that the solution of NLKG can be approximated by first-order modulated Schr\"odinger profiles in terms of ei t 2v + c.c. , where v is the solution of related NLS and ``c.c." denotes the complex conjugate. Particularly, the best analytic result up to now is given in lei, which proves that the Lx2 norm of the error can be controlled by 2 +(2t) α 4 for Hαx-data, α ∈ [1, 4]. As for the high-order expansion, to our best knowledge, there are only numerical results, while the theoretical one is lacking. In this paper, we extend this study further and give the first high-order analytic result. We introduce the high-order expansion inspired by the numerical experiments in schratz2020, faou2014a: \[ ei t 2v +2 ( 18 e3i t 2 v3 +ei t 2 w ) +c.c., \] where w is the solution to some specific Schr\"odinger-type equation. We show that the Lx2 estimate of the error is of higher order 4+(2t)α4 for Hαx-data, α ∈ [4, 8].

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