On Finding Randomly Planted Cliques in Arbitrary Graphs
Abstract
We study a planted clique model introduced by Feige where a complete graph of size is planted uniformly at random in an arbitrary -vertex graph. We give a simple deterministic algorithm that, in almost linear time, recovers a clique of size as long as the original graph has maximum degree at most for some fixed . The proof hinges on showing that the degrees of the final graph are correlated with the planted clique, in a way similar to (but more intricate than) the classical planted clique model. Our algorithm suggests a separation from the worst-case model, where, assuming the Unique Games Conjecture, no polynomial algorithm can find cliques of size for every fixed , even if the input graph has maximum degree . Our techniques extend beyond the planted clique model. For example, when the planted graph is a balanced biclique, we recover a balanced biclique of size larger than the best guarantees known for the worst case.
Keywords
Cite
@article{arxiv.2505.06725,
title = {On Finding Randomly Planted Cliques in Arbitrary Graphs},
author = {Francesco Agrimonti and Marco Bressan and Tommaso d'Orsi},
journal= {arXiv preprint arXiv:2505.06725},
year = {2025}
}