The Normalized Matching Property in Random and Pseudorandom Bipartite Graphs
Abstract
A simple generalization of the Hall's condition in bipartite graphs, the Normalized Matching Property (NMP) in a graph with vertex partition states that for any subset , we have . In this paper, we show the following results about having the Normalized Matching Property in random and pseudorandom graphs. 1. We establish as a sharp threshold for having NMP in , which is the graph with (assuming ), and in which each pair is an edge independently with probability . This generalizes a classic result of Erd\H{o}s-R\'enyi on the threshold for having a perfect matching in . 2. We also show that a pseudorandom bipartite graph - upon deletion of a vanishingly small fraction of vertices - admits NMP, provided it is not too sparse. More precisely, a bipartite graph , with , is said to be Thomason pseudorandom (following A. Thomason (Discrete Math., 1989)) with parameters if each has degree at least and each pair of distinct has at most common neighbors. We show that for any large enough -Thomason pseudorandom graph , there are "tiny" subsets such that the subgraph has NMP, provided . En route, we prove an "almost" vertex decomposition theorem: Every such Thomason pseudorandom graph admits - excluding a negligible portion of its vertex set - a partition of its vertex set into graphs that we call Euclidean trees. These are trees that have NMP, and which arise organically through the Euclidean GCD algorithm.
Keywords
Cite
@article{arxiv.1908.02628,
title = {The Normalized Matching Property in Random and Pseudorandom Bipartite Graphs},
author = {Niranjan Balachandran and Deepanshu Kush},
journal= {arXiv preprint arXiv:1908.02628},
year = {2021}
}
Comments
28 pages, 3 figures; Changes from v1 to v2: improved exposition and clarity of proofs, added references. Change from v2 to v3: added one new reference for Euclidean trees