English

On determinism and well-posedness in multiple time dimensions

Mathematical Physics 2015-05-13 v3 math.MP

Abstract

We study the initial value problem for the wave equation and the ultrahyperbolic equation for data posed on initial surface of mixed signature (both spacelike and timelike). Under a nonlocal constraint, we show that the Cauchy problem on codimension-one hypersurfaces has global unique solutions in the Sobolev spaces HmH^{m}, thus it is well-posed. In contrast, we show that the initial value problem on higher codimension hypersurfaces is ill-posed, at least when specifying a finite number of derivatives of the data, due to the failure of uniqueness. This is in contrast to a uniqueness result which Courant and Hilbert deduce from Asgeirsson's mean value theorem, for which we give an independent derivation. The proofs use Fourier synthesis and the Holmgren-John uniqueness theorem.

Keywords

Cite

@article{arxiv.0812.0210,
  title  = {On determinism and well-posedness in multiple time dimensions},
  author = {Walter Craig and Steven Weinstein},
  journal= {arXiv preprint arXiv:0812.0210},
  year   = {2015}
}
R2 v1 2026-06-21T11:46:57.350Z