English

The Normalized Matching Property in Random and Pseudorandom Bipartite Graphs

Combinatorics 2021-06-25 v3 Discrete Mathematics Probability

Abstract

A simple generalization of the Hall's condition in bipartite graphs, the Normalized Matching Property (NMP) in a graph G(X,Y,E)G(X,Y,E) with vertex partition (X,Y)(X,Y) states that for any subset SXS\subseteq X, we have N(S)YSX\frac{|N(S)|}{|Y|}\ge\frac{|S|}{|X|}. In this paper, we show the following results about having the Normalized Matching Property in random and pseudorandom graphs. 1. We establish p=lognkp=\frac{\log n}{k} as a sharp threshold for having NMP in G(k,n,p)\mathbb{G}(k,n,p), which is the graph with X=k,Y=n|X|=k,|Y|=n (assuming knexp(o(k))k\le n\leq \exp(o(k))), and in which each pair (x,y)X×Y(x,y)\in X\times Y is an edge independently with probability pp. This generalizes a classic result of Erd\H{o}s-R\'enyi on the lognn\frac{\log n}{n} threshold for having a perfect matching in G(n,n,p)\mathbb{G}(n,n,p). 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 G(X,Y)G(X,Y), with k=XY=nk=|X|\le |Y|=n, is said to be Thomason pseudorandom (following A. Thomason (Discrete Math., 1989)) with parameters (p,ε)(p,\varepsilon) if each xXx\in X has degree at least pnpn and each pair of distinct x,xXx, x'\in X has at most (1+ε)p2n(1+\varepsilon)p^2n common neighbors. We show that for any large enough (p,ε)(p,\varepsilon)-Thomason pseudorandom graph G(X,Y)G(X,Y), there are "tiny" subsets DelXX, DelYY\mathrm{Del}_X\subset X, \ \mathrm{Del}_Y\subset Y such that the subgraph G(XDelX,YDelY)G(X\setminus \mathrm{Del}_X,Y\setminus \mathrm{Del}_Y) has NMP, provided p1kp \gg\tfrac{1}{k}. 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

R2 v1 2026-06-23T10:42:04.720Z