Largest eigenvalue statistics of sparse random adjacency matrices
Abstract
We investigate the statistics of the largest eigenvalue, , in an ensemble of large () sparse adjacency matrices, . The most attention is paid to the distribution and typical fluctuations of in the vicinity of the percolation threshold, . The overwhelming majority of subgraphs representing near are exponentially distributed linear subchains, for which the statistics of the normalized largest eigenvalue can be analytically connected with the Gumbel distribution. For the ensemble of {\rm all} subgraphs near we suggest that under an appropriate modification of the normalization constant the Gumbel distribution provides a reasonably good approximation. Using numerical simulations we demonstrate that the proposed transformation of is indeed Gumbel-distributed and the leading finite-size corrections in the vicinity of scale with as . All together, our results reveal a previously unknown universality in eigenvalue statistics of sparse matrices close to the percolation threshold.
Keywords
Cite
@article{arxiv.2305.13465,
title = {Largest eigenvalue statistics of sparse random adjacency matrices},
author = {Bogdan Slavov and Kirill Polovnikov and Sergei Nechaev and Nikita Pospelov},
journal= {arXiv preprint arXiv:2305.13465},
year = {2023}
}
Comments
18 pages, 8 figures