All-or-Nothing Phenomena: From Single-Letter to High Dimensions

Abstract

We consider the linear regression problem of estimating a p-dimensional vector β from n observations Y = X β + W, where βj i.i.d. π for a real-valued distribution π with zero mean and unit variance, Xij i.i.d. N(0,1), and Wii.i.d. N(0, σ2). In the asymptotic regime where n/p δ and p/ σ2 snr for two fixed constants δ, snr∈ (0, ∞) as p ∞, the limiting (normalized) minimum mean-squared error (MMSE) has been characterized by the MMSE of an associated single-letter (additive Gaussian scalar) channel. In this paper, we show that if the MMSE function of the single-letter channel converges to a step function, then the limiting MMSE of estimating β in the linear regression problem converges to a step function which jumps from 1 to 0 at a critical threshold. Moreover, we establish that the limiting mean-squared error of the (MSE-optimal) approximate message passing algorithm also converges to a step function with a larger threshold, providing evidence for the presence of a computational-statistical gap between the two thresholds.