English

Largest eigenvalue statistics of sparse random adjacency matrices

Statistical Mechanics 2023-06-14 v2 Mathematical Physics math.MP

Abstract

We investigate the statistics of the largest eigenvalue, λmax\lambda_{\rm max}, in an ensemble of N×NN\times N large (N1N\gg 1) sparse adjacency matrices, ANA_N. The most attention is paid to the distribution and typical fluctuations of λmax\lambda_{\rm max} in the vicinity of the percolation threshold, pc=1Np_c=\frac{1}{N}. The overwhelming majority of subgraphs representing ANA_N near pcp_c 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 pcp_c 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 λmax\lambda_{\rm max} is indeed Gumbel-distributed and the leading finite-size corrections in the vicinity of pcp_c scale with NN as ln2N\sim \ln^{-2}N. 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

R2 v1 2026-06-28T10:42:05.481Z