English

Quantitative unique continuation for Schr\"odinger operators

Analysis of PDEs 2019-03-12 v1

Abstract

We investigate the quantitative unique continuation properties of solutions to second order elliptic equations with singular lower order terms. The main theorem presents a quantification of the strong unique continuation property for Δ+V\Delta + V. That is, for any non-trivial uu that solves Δu+Vu=0\Delta u + V u = 0 in some open, connected subset of Rn\mathbb{R}^n, we estimate the vanishing order of solutions in terms of the LtL^t-norm of VV. Our results apply to all t>n2t > \frac n 2 and n3n \ge 3. With these maximal order of vanishing estimates, we employ a scaling argument to produce quantitative unique continuation at infinity estimates for global solutions to Δu+Vu=0\Delta u + V u = 0. To handle VLtV \in L^t for every t(n2,]t \in (\frac n 2, \infty], we prove a novel LpLqL^p - L^q Carleman estimate by interpolating a known LpL2L^p - L^2 estimate with a new endpoint Carleman estimate. This new Carleman estimate may also be used to establish improved order of vanishing estimates for equations with a first order term, those of the form Δu+Wu+Vu=0\Delta u + W \cdot \nabla u + V u = 0.

Keywords

Cite

@article{arxiv.1903.04021,
  title  = {Quantitative unique continuation for Schr\"odinger operators},
  author = {Blair Davey},
  journal= {arXiv preprint arXiv:1903.04021},
  year   = {2019}
}
R2 v1 2026-06-23T08:03:37.700Z