English

Detecting localized eigenstates of linear operators

Numerical Analysis 2018-03-20 v2 Mathematical Physics math.MP Spectral Theory

Abstract

We describe a way of detecting the location of localized eigenvectors of a linear system Ax=λxAx = \lambda x for eigenvalues λ\lambda with λ|\lambda| comparatively large. We define the family of functions fα:{1.2.,n}Rf_{\alpha}: \left\{1.2. \dots, n\right\} \rightarrow \mathbb{R}_{} fα(k)=log(Aαek2), f_{\alpha}(k) = \log \left( \| A^{\alpha} e_k \|_{\ell^2} \right), where α0\alpha \geq 0 is a parameter and ek=(0,0,,0,1,0,,0)e_k = (0,0,\dots, 0,1,0, \dots, 0) is the kk-th standard basis vector. We prove that eigenvectors associated to eigenvalues with large absolute value localize around local maxima of fαf_{\alpha}: the metastable states in the power iteration method (slowing down its convergence) can be used to predict localization. We present a fast randomized algorithm and discuss different examples: a random band matrix, discretizations of the local operator Δ+V-\Delta + V and the nonlocal operator (Δ)3/4+V(-\Delta)^{3/4} + V.

Keywords

Cite

@article{arxiv.1709.03364,
  title  = {Detecting localized eigenstates of linear operators},
  author = {Jianfeng Lu and Stefan Steinerberger},
  journal= {arXiv preprint arXiv:1709.03364},
  year   = {2018}
}
R2 v1 2026-06-22T21:38:59.223Z