Recovery thresholds in the sparse planted matching problem
Abstract
We consider the statistical inference problem of recovering an unknown perfect matching, hidden in a weighted random graph, by exploiting the information arising from the use of two different distributions for the weights on the edges inside and outside the planted matching. A recent work has demonstrated the existence of a phase transition, in the large size limit, between a full and a partial recovery phase for a specific form of the weights distribution on fully connected graphs. We generalize and extend this result in two directions: we obtain a criterion for the location of the phase transition for generic weights distributions and possibly sparse graphs, exploiting a technical connection with branching random walk processes, as well as a quantitatively more precise description of the critical regime around the phase transition.
Cite
@article{arxiv.2005.11274,
title = {Recovery thresholds in the sparse planted matching problem},
author = {Guilhem Semerjian and Gabriele Sicuro and Lenka Zdeborová},
journal= {arXiv preprint arXiv:2005.11274},
year = {2020}
}
Comments
19 pages, 8 figures