A Nearly Tight Sum-of-Squares Lower Bound for the Planted Clique Problem

Abstract

We prove that with high probability over the choice of a random graph G from the Erdos-R\'enyi distribution G(n,1/2), the nO(d)-time degree d Sum-of-Squares semidefinite programming relaxation for the clique problem will give a value of at least n1/2-c(d/ n)1/2 for some constant c>0. This yields a nearly tight n1/2 - o(1) bound on the value of this program for any degree d = o( n). Moreover we introduce a new framework that we call pseudo-calibration to construct Sum of Squares lower bounds. This framework is inspired by taking a computational analog of Bayesian probability theory. It yields a general recipe for constructing good pseudo-distributions (i.e., dual certificates for the Sum-of-Squares semidefinite program), and sheds further light on the ways in which this hierarchy differs from others.