English

Semiclassical resolvent bounds for long range Lipschitz potentials

Analysis of PDEs 2022-01-11 v2

Abstract

We give an elementary proof of weighted resolvent estimates for the semiclassical Schr\"odinger operator h2Δ+V(x)E-h^2 \Delta + V(x) - E in dimension n2n \neq 2, where h,E>0h, \, E > 0. The potential is real-valued, VV and rV\partial_r V exhibit long range decay at infinity, and may grow like a sufficiently small negative power of rr as r0r \to 0. The resolvent norm grows exponentially in h1h^{-1}, but near infinity it grows linearly. When VV is compactly supported, we obtain linear growth if the resolvent is multiplied by weights supported outside a ball of radius CE1/2CE^{-1/2} for some C>0C > 0. This EE-dependence is sharp and answers a question of Datchev and Jin.

Keywords

Cite

@article{arxiv.2010.01166,
  title  = {Semiclassical resolvent bounds for long range Lipschitz potentials},
  author = {Jeffrey Galkowski and Jacob Shapiro},
  journal= {arXiv preprint arXiv:2010.01166},
  year   = {2022}
}

Comments

Update includes new section 5 and estimates when the potential may blow-up near 0

R2 v1 2026-06-23T18:59:06.359Z