The planted matching problem: Sharp threshold and infinite-order phase transition
Abstract
We study the problem of reconstructing a perfect matching hidden in a randomly weighted bipartite graph. The edge set includes every node pair in and each of the node pairs not in independently with probability . The weight of each edge is independently drawn from the distribution if and from if . We show that if , where stands for the Bhattacharyya coefficient, the reconstruction error (average fraction of misclassified edges) of the maximum likelihood estimator of converges to as . Conversely, if for an arbitrarily small constant , the reconstruction error for any estimator is shown to be bounded away from under both the sparse and dense model, resolving the conjecture in [Moharrami et al. 2019, Semerjian et al. 2020]. Furthermore, in the special case of complete exponentially weighted graph with , , and , for which the sharp threshold simplifies to , we prove that when , the optimal reconstruction error is , confirming the conjectured infinite-order phase transition in [Semerjian et al. 2020].
Cite
@article{arxiv.2103.09383,
title = {The planted matching problem: Sharp threshold and infinite-order phase transition},
author = {Jian Ding and Yihong Wu and Jiaming Xu and Dana Yang},
journal= {arXiv preprint arXiv:2103.09383},
year = {2021}
}