The Overlap Gap Property in Principal Submatrix Recovery

Abstract

We study support recovery for a k × k principal submatrix with elevated mean λ/N, hidden in an N× N symmetric mean zero Gaussian matrix. Here λ>0 is a universal constant, and we assume k = N for some constant ∈ (0,1). We establish that there exists a constant C>0 such that the MLE recovers a constant proportion of the hidden submatrix if λ ≥ C 1 1, while such recovery is information theoretically impossible if λ = o( 1 1 ). The MLE is computationally intractable in general, and in fact, for >0 sufficiently small, this problem is conjectured to exhibit a statistical-computational gap. To provide rigorous evidence for this, we study the likelihood landscape for this problem, and establish that for some >0 and 1 1 λ 11/2 + , the problem exhibits a variant of the Overlap-Gap-Property (OGP). As a direct consequence, we establish that a family of local MCMC based algorithms do not achieve optimal recovery. Finally, we establish that for λ > 1/, a simple spectral method recovers a constant proportion of the hidden submatrix.