Long time solutions of quasilinear Klein-Gordon equations with small weakly decaying initial data

Abstract

It is well known that for the quasilinear Klein-Gordon equation with quadratic nonlinearity and sufficiently decaying small initial data, there exists a global smooth solution if the space dimensions d≥2. When the initial data are of size >0 in the Sobolev space, for the semilinear Klein-Gordon equation satisfying the null condition, the authors in the article (J.-M. Delort, Daoyuan Fang, Almost global existence for solutions of semilinear Klein-Gordon equations with small weakly decaying Cauchy data, Comm. Partial Differential Equations 25 (2000), no. 11-12, 2119--2169) prove that the solution exists in time [0,T) with T CeC-μ (μ=1 if d3, μ=2/3 if d=2). In the present paper, we will focus on the general quasilinear Klein-Gordon equation without the null condition and further show that the existence time of the solution can be improved to T=+∞ if d≥3 and T eC-2 if d=2. In addition, for d=2 and any fixed number α>0, if the weighted L2 norm of the initial data with the weight (1+|x|)α is small, then the solution exists globally and scatters to a free solution. The arguments are based on the introduction of a good unknown, the Strichartz estimate, the weighted L2-norm estimate and the resonance analysis.