English

Localization-delocalization transition for a random block matrix model at the edge

Probability 2025-07-14 v2

Abstract

Consider a random block matrix model consisting of DD random systems arranged along a circle, where each system is modeled by an independent N×NN\times N complex Hermitian Wigner matrix. Neighboring systems interact via an arbitrary deterministic N×NN\times N matrix AA. In this paper, we extend the localization-delocalization transition previously established in arxiv:2312.07297 for the bulk eigenvalue spectrum to the entire spectrum, including the spectral edges. Let [E,E+][E^-,E^+] denote the support of the limiting spectral density, and define κE:=EE+EE\kappa_E:=|E-E^+|\wedge |E-E^-| as the distance from a given energy E[E,E+]E \in [E^-, E^+] to the spectral edges. We show that for eigenvalues near EE, the corresponding eigenvectors undergo a localization-delocalization transition when AHS\|A\|_{\mathrm{HS}} crosses the critical threshold (κE+N2/3)1/2(\kappa_E + N^{-2/3})^{-1/2}. In the delocalized phase, the extreme eigenvalues asymptotically follow the Tracy-Widom distribution, while in the localized phase, the edge eigenvalue statistics asymptotically match those of DD independent GUE ensembles, up to a deterministic shift. Our results recover those of arxiv:2312.07297 in the bulk regime, where κE1\kappa_E \asymp 1, and further reveal the presence of mobility edges near E±E^\pm when 1AHSN1/31 \ll \|A\|_{\mathrm{HS}} \ll N^{1/3}. Specifically, bulk eigenvectors corresponding to energies EE with κEAHS2\kappa_E \gg \|A\|_{\mathrm{HS}}^{-2} are delocalized, while those with κEAHS2\kappa_E \ll \|A\|_{\mathrm{HS}}^{-2} are localized.

Keywords

Cite

@article{arxiv.2504.00512,
  title  = {Localization-delocalization transition for a random block matrix model at the edge},
  author = {Jiaqi Fan and Bertrand Stone and Fan Yang and Jun Yin},
  journal= {arXiv preprint arXiv:2504.00512},
  year   = {2025}
}

Comments

65 pages, 5 figures. Minor updates

R2 v1 2026-06-28T22:41:57.117Z