English

Global uniqueness theorems for linear and nonlinear waves

Analysis of PDEs 2016-09-14 v2

Abstract

We prove a unique continuation from infinity theorem for regular waves of the form [+V(t,x)]ϕ=0[ \Box + \mathcal{V} (t, x) ]\phi=0. Under the assumption of no incoming and no outgoing radiation on specific halves of past and future null infinities, we show that the solution must vanish everywhere. The "no radiation" assumption is captured in a specific, finite rate of decay which in general depends on the LL^\infty-profile of the potential V\mathcal{V}. We show that the result is optimal in many regards. These results are then extended to certain power-law type nonlinear wave equations, where the order of decay one must assume is independent of the size of the nonlinear term. These results are obtained using a new family of global Carleman-type estimates on the exterior of a null cone. A companion paper to this one explores further applications of these new estimates to such nonlinear waves.

Keywords

Cite

@article{arxiv.1412.1537,
  title  = {Global uniqueness theorems for linear and nonlinear waves},
  author = {Spyros Alexakis and Arick Shao},
  journal= {arXiv preprint arXiv:1412.1537},
  year   = {2016}
}

Comments

31 pages; some minor corrections, additional clarifications in theorem statements and surrounding discussions

R2 v1 2026-06-22T07:19:54.263Z