A Non-Asymptotic Framework for Approximate Message Passing in Spiked Models
Abstract
Approximate message passing (AMP) emerges as an effective iterative paradigm for solving high-dimensional statistical problems. However, prior AMP theory -- which focused mostly on high-dimensional asymptotics -- fell short of predicting the AMP dynamics when the number of iterations surpasses (with the problem dimension). To address this inadequacy, this paper develops a non-asymptotic framework for understanding AMP in spiked matrix estimation. Built upon new decomposition of AMP updates and controllable residual terms, we lay out an analysis recipe to characterize the finite-sample behavior of AMP in the presence of an independent initialization, which is further generalized to allow for spectral initialization. As two concrete consequences of the proposed analysis recipe: (i) when solving synchronization, we predict the behavior of spectrally initialized AMP for up to iterations, showing that the algorithm succeeds without the need of a subsequent refinement stage (as conjectured recently by \citet{celentano2021local}); (ii) we characterize the non-asymptotic behavior of AMP in sparse PCA (in the spiked Wigner model) for a broad range of signal-to-noise ratio.
Cite
@article{arxiv.2208.03313,
title = {A Non-Asymptotic Framework for Approximate Message Passing in Spiked Models},
author = {Gen Li and Yuting Wei},
journal= {arXiv preprint arXiv:2208.03313},
year = {2023}
}