Rolling backwards can move you forward: on embedding problems in sparse expanders
Abstract
We develop a general embedding method based on the Friedman-Pippenger tree embedding technique (1987) and its algorithmic version, essentially due to Aggarwal et al. (1996), enhanced with a roll-back idea allowing to sequentially retrace previously performed embedding steps. We use this method to obtain the following results. -We show that the size-Ramsey number of logarithmically long subdivisions of bounded degree graphs is linear in their number of vertices, settling a conjecture of Pak (2002). -We give a deterministic, polynomial time online algorithm for finding vertex-disjoint paths of prescribed length between given pairs of vertices in an expander graph. Our result answers a question of Alon and Capalbo (2007). -We show that relatively weak bounds on the spectral ratio of -regular graphs force the existence of a topological minor of where . We also exhibit a construction which shows that the theoretical maximum cannot be attained even if . This answers a question of Fountoulakis, K\"uhn and Osthus (2009).
Cite
@article{arxiv.2007.08332,
title = {Rolling backwards can move you forward: on embedding problems in sparse expanders},
author = {Nemanja Draganić and Michael Krivelevich and Rajko Nenadov},
journal= {arXiv preprint arXiv:2007.08332},
year = {2021}
}
Comments
improved exposition; typos fixed; new section and results about topological minors