Counting eigenvalues of Schr\"odinger operators using the landscape function
Abstract
We prove an upper and a lower bound on the rank of the spectral projections of the Schr\"odinger operator in terms of the volume of the sublevel sets of an effective potential . Here, is the `landscape function' of [(David, G., Filoche, M., & Mayboroda, S. (2021) Advances in Mathematics, 390, 107946)], namely a solution of in . We prove the result for non-negative potentials satisfying a Kato-type and a doubling condition, in all spatial dimensions, in infinite volume, and show that no coarse graining is required. Our result yields in particular a necessary and sufficient condition for discreteness of the spectrum. In the case of polynomial potentials, we prove that the spectrum is discrete if and only if no directional derivative vanishes identically.
Cite
@article{arxiv.2306.03936,
title = {Counting eigenvalues of Schr\"odinger operators using the landscape function},
author = {Sven Bachmann and Richard Froese and Severin Schraven},
journal= {arXiv preprint arXiv:2306.03936},
year = {2023}
}
Comments
To appear in Journal of Spectral Theory