English

Semiclassical resolvent estimates for bounded potentials

Analysis of PDEs 2018-11-28 v2 Mathematical Physics math.MP Spectral Theory

Abstract

We study the cut-off resolvent of semiclassical Schr{\"o}dinger operators on Rd\mathbb{R}^d with bounded compactly supported potentials VV. We prove that for real energies λ2\lambda^2 in a compact interval in R+\mathbb{R}_+ and for any smooth cut-off function χ\chi supported in a ball near the support of the potential VV, for some constant C>0C>0, one has \begin{equation*} \| \chi (-h^2\Delta + V-\lambda^2)^{-1} \chi \|_{L^2\to H^1} \leq C \,\mathrm{e}^{Ch^{-4/3}\log \frac{1}{h} }. \end{equation*} This bound shows in particular an upper bound on the imaginary parts of the resonances λ\lambda, defined as a pole of the meromorphic continuation of the resolvent (h2Δ+Vλ2)1(-h^2\Delta + V-\lambda^2)^{-1} as an operator Lcomp2Hloc2L^2_{\mathrm{comp}}\to H^2_{\mathrm{loc}}: any resonance λ\lambda with real part in a compact interval away from 00 has imaginary part at most \begin{equation*} \mathrm{Im} \lambda \leq - C^{-1} \,\mathrm{e}^{Ch^{-4/3}\log \frac{1}{h} }. \end{equation*} This is related to a conjecture by Landis: The principal Carleman estimate in our proof provides as well a lower bound on the decay rate of L2L^2 solutions uu to Δu=Vu-\Delta u = Vu with 0≢VL(Rd)0\not\equiv V\in L^{\infty}(\mathbb{R}^d). We show that there exist a constant M>0M>0 such that for any such uu, for R>0R>0 sufficiently large, one has \begin{equation*} \int_{B(0,R+1)\backslash \overline{B(0,R)}}|u(x)|^2 dx \geq M^{-1}R^{-4/3} \mathrm{e}^{-M \|V\|_{\infty}^{2/3} R^{4/3}}\|u\|^2_2. \end{equation*}

Keywords

Cite

@article{arxiv.1803.02450,
  title  = {Semiclassical resolvent estimates for bounded potentials},
  author = {Frédéric Klopp and Martin Vogel},
  journal= {arXiv preprint arXiv:1803.02450},
  year   = {2018}
}

Comments

21 pages

R2 v1 2026-06-23T00:44:35.308Z