The Global well-posedness for Klein-Gordon-Hartree equation in modulation spaces

Abstract

Modulation spaces have received considerable interest recently as it is the natural function spaces to consider low regularity Cauchy data for several nonlinear evolution equations. We establish global well-posedness for 3D Klein-Gordon-Hartree equation utt- u+u + ( |·|-γ |u|2)u=0 with initial data in modulation spaces Mp, p'1 × Mp,p for p∈ (2, 54 27-2γ ), 2<γ<3. We implement Bourgain's high-low frequency decomposition method to establish global well-posedness, which was earlier used for classical Klein-Gordon equation. This is the first result on low regularity for Klein-Gordon-Hartree equation with large initial data in modulation spaces (which do not coincide with Sobolev spaces).