Scattering results for Dirac Hartree-type equations with small initial data
Analysis of PDEs
2018-06-20 v3
Abstract
We consider the Dirac equation with cubic Hartree-type nonlinearity derived by uncoupling the Dirac-Klein-Gordon systems. We prove small data scattering result in full subcritical range. Main ingredients of the proof are the localized Strichartz estimates, improved bilinear estimates thanks to null-structure hidden in Dirac operator and function spaces. We apply the projection operator and get a system which of linear part is the Klein-Gordon type. It enables us to exploit the null-structures in equation. This result is shown to be almost optimal by showing that iteration method based on Duhamel's formula over supercritical range fails.
Cite
@article{arxiv.1710.11524,
title = {Scattering results for Dirac Hartree-type equations with small initial data},
author = {Changhun Yang},
journal= {arXiv preprint arXiv:1710.11524},
year = {2018}
}
Comments
v2; 18 pages, The error was corrected