Global existence and asymptotics for quasi-linear one-dimensional Klein-Gordon equations with mildly decaying Cauchy data

Abstract

Let u be a solution to a quasi-linear Klein-Gordon equation in one-space dimension, u + u = P (u, ∂\t u, ∂\x u; ∂\t ∂\x u, ∂2\x u) , where P is a homogeneous polynomial of degree three, and with smooth Cauchy data of size ε → 0. It is known that, under a suitable condition on the nonlinearity, the solution is global-in-time for compactly supported Cauchy data. We prove in this paper that the result holds even when data are not compactly supported but just decaying as x --1 at infinity, combining the method of Klainerman vector fields with a semiclassical normal forms method introduced by Delort. Moreover, we get a one term asymptotic expansion for u when t → +∞.