Unique continuation for the gradient of eigenfunctions and Wegner estimates for random divergence-type operators
Functional Analysis
2023-11-08 v2 Analysis of PDEs
Spectral Theory
Abstract
We prove a scale-free quantitative unique continuation estimate for the gradient of eigenfunctions of divergence-type operators, i.e. operators of the form , where the matrix function is uniformly elliptic. The proof uses a unique continuation principle for elliptic second order operators and a lower bound on the -norm of the gradient of eigenfunctions corresponding to strictly positive eigenvalues. As an application, we prove an eigenvalue lifting estimate that allows us to prove a Wegner estimate for random divergence-type operators. Here our approach allows us to get rid of a restrictive covering condition that was essential in previous proofs of Wegner estimates for such models.
Keywords
Cite
@article{arxiv.2003.09849,
title = {Unique continuation for the gradient of eigenfunctions and Wegner estimates for random divergence-type operators},
author = {Alexander Dicke and Ivan Veselic},
journal= {arXiv preprint arXiv:2003.09849},
year = {2023}
}
Comments
24 pages, major revisions