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Long-Range Correlated Random Matrices

Statistical Mechanics 2026-04-27 v1 Other Condensed Matter Mathematical Physics math.MP Data Analysis, Statistics and Probability

Abstract

Motivated by the importance ascribed to correlations in random matrices used to model phenomena in various scientific disciplines, we report how algebraic correlations between matrix elements affect the eigenvalue statistics and spectral density of random matrices. These correlations, introduced through a long-range correlated percolation model, decay as a power law r2H\propto r^{-2H}, with exponent H>0H > 0. As HH varies, both the eigenvalue distribution and excess kurtosis undergo qualitative changes. At the threshold Hc=3/4H_c = 3/4, characterized by emergent Gaussian statistics, a sign change in excess kurtosis marks a transition from a fat-tailed generalized tt-distribution to one that gradually approaches the standard semicircle law for HHcH \gg H_c. Our analytical results, based on scaling analysis and supported by extensive numerical simulations, provide clear predictions and uncover novel spectral regimes in random matrix theory. Our results connect techniques from statistical physics, percolation theory, and random matrix analysis, offering a new perspective on universality in correlated ensembles.

Keywords

Cite

@article{arxiv.2604.22447,
  title  = {Long-Range Correlated Random Matrices},
  author = {Abbas Ali Saberi and Roderich Moessner},
  journal= {arXiv preprint arXiv:2604.22447},
  year   = {2026}
}

Comments

7 pages, 5 figures

R2 v1 2026-07-01T12:33:41.519Z