An extension procedure for the constraint equations
Abstract
Let be a solution to the maximal constraint equations of general relativity on the unit ball of . We prove that if is sufficiently close to the initial data for Minkowski space, then there exists an asymptotically flat solution on that extends . Moreover, is bounded by and has the same regularity. Our proof uses a new method of solving the prescribed divergence equation for a tracefree symmetric -tensor, and a geometric variant of the conformal method to solve the prescribed scalar curvature equation for a metric. Both methods are based on the implicit function theorem and an expansion of tensors based on spherical harmonics. They are combined to define an iterative scheme that is shown to converge to a global solution of the maximal constraint equations which extends .
Cite
@article{arxiv.1609.08814,
title = {An extension procedure for the constraint equations},
author = {Stefan Czimek},
journal= {arXiv preprint arXiv:1609.08814},
year = {2017}
}
Comments
122 pages; corrected typos, improved higher regularity estimates. All comments welcome!