The Cauchy problem for parallel spinors as first-order symmetric hyperbolic system
Abstract
We prove that a smooth Riemannian manifold admitting an imaginary generalized Killing spinor whose Dirac current satisfies an additional algebraic constraint condition can be embedded as spacelike Cauchy hypersurface in a smooth Lorentzian manifold on which the given spinor extends to a null parallel spinor. This is in contrast to a corresponding Cauchy problem for real generalized Killing spinors into Riemannian manifolds. The construction is based on first order symmetric hyperbolic PDE-methods. In fact, the coupled evolution equations for metric and spinor as considered here extend and generalize the well known PDE-system appearing in the Cauchy problem for the vacuum Einstein equations. Special cases are discussed and the statement is compared with a similar result obtained recently for the analytic category.
Cite
@article{arxiv.1503.04946,
title = {The Cauchy problem for parallel spinors as first-order symmetric hyperbolic system},
author = {Andree Lischewski},
journal= {arXiv preprint arXiv:1503.04946},
year = {2015}
}
Comments
21 pages