English

Discontinuous BBP transitions

Disordered Systems and Neural Networks 2026-05-01 v1 Statistical Mechanics

Abstract

The Baik-Ben Arous-Peche (BBP) transition sets fundamental limits for detecting low-rank structure in noisy high-dimensional data and underlies a wide range of spectral methods in many fields from physics to statistics and data sciences. In standard settings, this transition is continuous, implying that signal recovery emerges gradually above a sharp threshold. We show that BBP transitions can instead be discontinuous in very general settings and provide a full theory of this phenomenon. When the eigenvalue density vanishes faster than linearly at the spectral edge, the overlap between the leading eigenvector and the signal jumps discontinuously at the critical point. We study this mechanism in deformed Gaussian and reweighted Wishart ensembles. We analyze in detail the finite-size effects, which play a central and qualitatively new role in the discontinuous BBP transition. Unlike the continuous BBP transition, we establish the existence of an extended pre-critical region where informative eigenvectors emerge well before the asymptotic threshold. The main consequence-and difference from the continuous BBP transition-is that signal recovery can occur at significantly lower signal-to-noise ratio and it is accompanied by strong sample-to-sample variability. Our results show the relevance and the novelty of the discontinuous BBP transition, and highlight the practical implications for signal detection.

Cite

@article{arxiv.2604.27992,
  title  = {Discontinuous BBP transitions},
  author = {Dario Bocchi and Giulio Biroli and Chiara Cammarota and Federico Ricci-Tersenghi},
  journal= {arXiv preprint arXiv:2604.27992},
  year   = {2026}
}

Comments

16 pages, 6 figures

R2 v1 2026-07-01T12:43:48.958Z