Factors and loose Hamilton cycles in sparse pseudo-random hypergraphs
Abstract
We investigate the emergence of spanning structures in sparse pseudo-random -uniform hypergraphs, using the following comparatively weak notion of pseudo-randomness. A -uniform hypergraph on vertices is called -pseudo-random if for all (not necessarily disjoint) vertex subsets with we have For any linear -uniform we provide a bound on in terms of and , such that (under natural divisibility assumptions on ) any -uniform -pseudo-random -vertex hypergraph with a mild minimum vertex degree condition contains an -factor. The approach also enables us to establish the existence of loose Hamilton cycles in sufficiently pseudo-random hypergraphs and all results imply corresponding bounds for stronger notions of hypergraph pseudo-randomness such as jumbledness or large spectral gap. As a consequence, -pseudo-random -graphs as above contain: a perfect matching if and a loose Hamilton cycle if . This extends the works of Lenz--Mubayi, and Lenz--Mubayi--Mycroft who studied the analogous problems in the dense setting.
Cite
@article{arxiv.2001.07254,
title = {Factors and loose Hamilton cycles in sparse pseudo-random hypergraphs},
author = {Hiep Hàn and Jie Han and Patrick Morris},
journal= {arXiv preprint arXiv:2001.07254},
year = {2021}
}
Comments
Updated according to reviewer comments, to appear in RSA (Random Structures & Algorithms), 23 pages, 3 figures, an extended abstract appeared in the conference proceedings of SODA 2020, pp. 702-717