Structure of eigenvectors of random regular digraphs
Abstract
Let and be integers satisfying for some universal constants , and let . Denote by the adjacency matrix of a random -regular directed graph on vertices. In this paper, we study the structure of the kernel of submatrices of , formed by removing a subset of rows. We show that with large probability the kernel consists of two non-intersecting types of vectors, which we call very steep and gradual with many levels. As a corollary, we show, in particular, that every eigenvector of , except for constant multiples of , possesses a weak delocalization property: its level sets have cardinality less than . For a large constant this provides a principally new structural information on eigenvectors, implying that the number of their level sets grows to infinity with . As a key technical ingredient of our proofs we introduce a decomposition of into vectors of different degrees of `structuredness', which is an alternative to the decomposition based on the least common denominator in the regime when the underlying random matrix is very sparse.
Cite
@article{arxiv.1801.05575,
title = {Structure of eigenvectors of random regular digraphs},
author = {Alexander Litvak and Anna Lytova and Konstantin Tikhomirov and Nicole Tomczak-Jaegermann and Pierre Youssef},
journal= {arXiv preprint arXiv:1801.05575},
year = {2018}
}
Comments
Accepted in Transactions of the American Mathematical Society