Semiclassical estimates for measure potentials on the real line
Andrés Larraín-Hubach
University of Dayton, Dayton, USAJacob Shapiro
University of Dayton, Dayton, USA
Abstract
We prove an explicit weighted estimate for the semiclassical Schrödinger operator on , with a finite signed measure, and where is the semiclassical parameter. The proof is a one-dimensional instance of the spherical energy method, which has been used to prove Carleman estimates in higher dimensions and in more complicated geometries. The novelty of our result is that the potential need not be absolutely continuous with respect to Lebesgue measure. Two consequences of the weighted estimate are the absence of positive eigenvalues for , and a limiting absorption resolvent estimate with sharp -dependence. The resolvent estimate implies exponential time-decay of the local energy for solutions to the corresponding wave equation with a compactly supported measure potential, provided there are no negative eigenvalues and no zero resonance, and provided the initial data have compact support.
Cite this article
Andrés Larraín-Hubach, Jacob Shapiro, Semiclassical estimates for measure potentials on the real line. J. Spectr. Theory 14 (2024), no. 3, pp. 1033–1062
DOI 10.4171/JST/500