Algorithms approaching the threshold for semi-random planted clique

TL;DR

This paper introduces new polynomial-time algorithms that recover semi-random planted cliques in graphs approaching the theoretical size threshold of $n^{1/2}$, significantly improving upon previous methods.

Contribution

The authors develop algorithms based on higher degree sum-of-squares relaxations that nearly reach the information-theoretic limit for planted clique detection in semi-random graphs.

Findings

Algorithms succeed for clique sizes approaching $n^{1/2}$

Basic SDP cannot detect cliques smaller than $n^{2/3}$

Lower bounds suggest the current algorithms are near optimal

Abstract

We design new polynomial-time algorithms for recovering planted cliques in the semi-random graph model introduced by Feige and Kilian 2001. The previous best algorithms for this model succeed if the planted clique has size at least $n^{2/3}$ in a graph with $n$ vertices (Mehta, Mckenzie, Trevisan 2019 and Charikar, Steinhardt, Valiant 2017). Our algorithms work for planted-clique sizes approaching $n^{1/2}$ -- the information-theoretic threshold in the semi-random model (Steinhardt 2017) and a conjectured computational threshold even in the easier fully-random model. This result comes close to resolving open questions by Feige 2019 and Steinhardt 2017. Our algorithms are based on higher constant degree sum-of-squares relaxation and rely on a new conceptual connection that translates certificates of upper bounds on biclique numbers in unbalanced bipartite Erd\H{o}s--R\'enyi random graphs into algorithms for semi-random planted clique. The use of a higher-constant degree sum-of-squares is essential in our setting: we prove a lower bound on the basic SDP for certifying bicliques that shows that the basic SDP cannot succeed for planted cliques of size $k =o(n^{2/3})$. We also provide some evidence that the information-computation trade-off of our current algorithms may be inherent by proving an average-case lower bound for unbalanced bicliques in the low-degree-polynomials model.