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Main Authors: Alaluusua, Kalle, Kumar, B. R. Vinay
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2604.08691
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author Alaluusua, Kalle
Kumar, B. R. Vinay
author_facet Alaluusua, Kalle
Kumar, B. R. Vinay
contents Hypergraph data are often projected onto a weighted graph by constructing an adjacency matrix whose $(i,j)$ entry counts the number of hyperedges containing both nodes $i$ and $j$. This reduction is computationally convenient, but it can lose information: distinct hypergraphs may induce the same matrix, and the matrix entries are generally dependent because each hyperedge contributes to multiple pairs. We study the planted clique problem under this matrix-only observation model. For detection, we show that a spectral norm test is asymptotically powerful at the $\sqrt{n}$ scale, with explicit dependence on the background hyperedge probability $p$. For recovery, we analyze a polynomial-time spectral method based on the leading eigenvector and prove exact recovery at the canonical $\sqrt{n}$ scale, again with explicit dependence on $p$. We also extend both results to sparse regimes in which the hyperedge probability may depend on \(n\). Our analysis adapts a leave--one--out eigenvector framework to this setting. These results provide rigorous detection and recovery guarantees when only the adjacency matrix is observed.
format Preprint
id arxiv_https___arxiv_org_abs_2604_08691
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Planted clique detection and recovery from the hypergraph adjacency matrix
Alaluusua, Kalle
Kumar, B. R. Vinay
Statistics Theory
Computational Complexity
Probability
05C80, 05C65, 05C69, 60B20, 62F03
Hypergraph data are often projected onto a weighted graph by constructing an adjacency matrix whose $(i,j)$ entry counts the number of hyperedges containing both nodes $i$ and $j$. This reduction is computationally convenient, but it can lose information: distinct hypergraphs may induce the same matrix, and the matrix entries are generally dependent because each hyperedge contributes to multiple pairs. We study the planted clique problem under this matrix-only observation model. For detection, we show that a spectral norm test is asymptotically powerful at the $\sqrt{n}$ scale, with explicit dependence on the background hyperedge probability $p$. For recovery, we analyze a polynomial-time spectral method based on the leading eigenvector and prove exact recovery at the canonical $\sqrt{n}$ scale, again with explicit dependence on $p$. We also extend both results to sparse regimes in which the hyperedge probability may depend on \(n\). Our analysis adapts a leave--one--out eigenvector framework to this setting. These results provide rigorous detection and recovery guarantees when only the adjacency matrix is observed.
title Planted clique detection and recovery from the hypergraph adjacency matrix
topic Statistics Theory
Computational Complexity
Probability
05C80, 05C65, 05C69, 60B20, 62F03
url https://arxiv.org/abs/2604.08691