Matching Algorithms in the Sparse Stochastic Block Model
March 04, 2024 · Declared Dead · 🏛 International Conference on Probabilistic, Combinatorial and Asymptotic Methods for the Analysis of Algorithms
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Authors
Anna Brandenberger, Byron Chin, Nathan S. Sheffield, Divya Shyamal
arXiv ID
2403.02140
Category
cs.DS: Data Structures & Algorithms
Cross-listed
cs.DM
Citations
2
Venue
International Conference on Probabilistic, Combinatorial and Asymptotic Methods for the Analysis of Algorithms
Last Checked
4 months ago
Abstract
The stochastic block model (SBM) is a generalization of the Erdős--Rényi model of random graphs that describes the interaction of a finite number of distinct communities. In sparse Erdős--Rényi graphs, it is known that a linear-time algorithm of Karp and Sipser achieves near-optimal matching sizes asymptotically almost surely, giving a law-of-large numbers for the matching sizes of such graphs in terms of solutions to an ODE. We provide an extension of this analysis, identifying broad ranges of stochastic block model parameters for which the Karp--Sipser algorithm achieves near-optimal matching sizes, but demonstrating that it cannot perform optimally on general SBM instances. We also consider the problem of constructing a matching online, in which the vertices of one half of a bipartite stochastic block model arrive one-at-a-time, and must be matched as they arrive. We show that the competitive ratio lower bound of 0.837 found by Mastin and Jaillet for the Erdős--Rényi case is tight whenever the expected degrees in all communities are equal. We propose several linear-time algorithms for online matching in the general stochastic block model, but prove that despite very good experimental performance, none of these achieve online asymptotic optimality.
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