Planted Bipartite Graph Detection
February 07, 2023 Β· Declared Dead Β· π IEEE Transactions on Information Theory
"No code URL or promise found in abstract"
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Authors
Asaf Rotenberg, Wasim Huleihel, Ofer Shayevitz
arXiv ID
2302.03658
Category
cs.DS: Data Structures & Algorithms
Cross-listed
cs.IT,
cs.LG,
math.ST
Citations
2
Venue
IEEE Transactions on Information Theory
Last Checked
4 months ago
Abstract
We consider the task of detecting a hidden bipartite subgraph in a given random graph. This is formulated as a hypothesis testing problem, under the null hypothesis, the graph is a realization of an ErdΕs-RΓ©nyi random graph over $n$ vertices with edge density $q$. Under the alternative, there exists a planted $k_{\mathsf{R}} \times k_{\mathsf{L}}$ bipartite subgraph with edge density $p>q$. We characterize the statistical and computational barriers for this problem. Specifically, we derive information-theoretic lower bounds, and design and analyze optimal algorithms matching those bounds, in both the dense regime, where $p,q = Ξ\left(1\right)$, and the sparse regime where $p,q = Ξ\left(n^{-Ξ±}\right), Ξ±\in \left(0,2\right]$. We also consider the problem of testing in polynomial-time. As is customary in similar structured high-dimensional problems, our model undergoes an "easy-hard-impossible" phase transition and computational constraints penalize the statistical performance. To provide an evidence for this statistical computational gap, we prove computational lower bounds based on the low-degree conjecture, and show that the class of low-degree polynomials algorithms fail in the conjecturally hard region.
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