Testing Properties of Edge Distributions
Abstract
We initiate the study of distribution testing for probability distributions over the edges of a graph, motivated by the closely related question of ``edge-distribution-free'' graph property testing. The main results of this paper are nearly-tight bounds on testing bipartiteness, triangle-freeness and square-freeness of edge distributions, whose sample complexities are shown to scale as , and , respectively. The technical core of our paper lies in the proof of the upper bound for testing square-freeness, wherein we develop new techniques based on certain birthday-paradox-type lemmas that may be of independent interest. We will discuss how our techniques fit into the general framework of distribution-free property testing. We will also discuss how our results are conceptually connected with Tur\'an problems and subgraph removal lemmas in extremal combinatorics.
Keywords
Cite
@article{arxiv.2603.22702,
title = {Testing Properties of Edge Distributions},
author = {Yumou Fei},
journal= {arXiv preprint arXiv:2603.22702},
year = {2026}
}