In this paper we establish an almost optimal well-posedness and regularity theory for the Klein-Gordon-Schr\"odinger system on the half line. In particular we prove local-in-time well-posedness for rough initial data in Sobolev spaces of negative indices. Our results are consistent with the sharp well-posedness results that exist in the full line case and in this sense appear to be sharp. Finally we prove a global well-posedness result by combining the $L^2$ conservation law of the Schr\"odinger part with a careful iteration of the rough wave part in lower order Sobolev norms.
Some new well-posedness results for the Klein-Gordon-Schrödinger system
Dispersive estimates and generalized Boussinesq equation on hyperbolic spaces with rough initial data
Global strong solvability of the Navier-Stokes equations in exterior domains for rough initial data in critical spaces
![QR code for arXiv:1803.05057 [math.AP]](http://oss.arxitics.com/images/favicon.svg)