English

Detecting weighted hidden cliques

Statistics Theory 2026-05-29 v2 Information Theory math.IT Probability Statistics Theory

Abstract

We study a generalization of the classical hidden clique problem to graphs with real-valued edge weights. Formally, we define a hypothesis testing problem. Under the null hypothesis, edges of a complete graph on nn vertices are associated with independent and identically distributed edge weights from a distribution PP. Under the alternate hypothesis, kk vertices are chosen at random and the edge weights between them are drawn from a distribution QQ, while the remaining are sampled from PP. The goal is to decide, upon observing the edge weights, which of the two hypotheses they were generated from. We investigate the problem under two different scenarios: (1) when PP and QQ are completely known, and (2) when there is only partial information of PP and QQ. In the first scenario, we obtain statistical limits on kk when the two hypotheses are distinguishable, and when they are not. Additionally, in each of the scenarios, we provide bounds on the minimal risk of the hypothesis testing problem when QQ is not absolutely continuous with respect to PP. We also provide computationally efficient spectral tests that can distinguish the two hypotheses as long as k=Ω(n)k=\Omega(\sqrt{n}) in both the scenarios.

Keywords

Cite

@article{arxiv.2506.21543,
  title  = {Detecting weighted hidden cliques},
  author = {Urmisha Chatterjee and Karissa Huang and Ritabrata Karmakar and B. R. Vinay Kumar and Gábor Lugosi and Nandan Malhotra and Anirban Mandal and Maruf Alam Tarafdar},
  journal= {arXiv preprint arXiv:2506.21543},
  year   = {2026}
}

Comments

Revision with organised references

R2 v1 2026-07-01T03:35:00.272Z