2-universality in randomly perturbed graphs
Abstract
A graph is called universal for a family of graphs if it contains every element as a subgraph. Let be the family of all graphs with maximum degree . Ferber, Kronenberg, and Luh [Optimal Threshold for a Random Graph to be 2-Universal, to appear in Transactions of the American Mathematical Society] proved that there exists a such that for the random graph a.a.s is -universal, which is asymptotically optimal. For any -vertex graph with minimum degree Aigner and Brandt [Embedding arbitrary graphs of maximum degree two, Journal of the London Mathematical Society 48 (1993), 39-51] proved that is -universal for an optimal . In this note, we consider the model of randomly perturbed graphs, which is the union . We prove that is a.a.s. -universal provided that and . This is asymptotically optimal and improves on both results from above in the respective parameter. Furthermore, this extends a result of B\"ottcher, Montgomery, Parczyk, and Person [Embedding spanning bounded degree subgraphs in randomly perturbed graphs, arXiv:1802.04603 (2018)], who embed a given at these values. We also prove variants with universality for the family , all graphs from with girth at least . For example, there exists an depending only on such that for all already is sufficient for -universality.
Cite
@article{arxiv.1902.01823,
title = {2-universality in randomly perturbed graphs},
author = {Olaf Parczyk},
journal= {arXiv preprint arXiv:1902.01823},
year = {2019}
}
Comments
13 pages