Hypertree shrinking avoiding low degree vertices
Abstract
The shrinking operation converts a hypergraph into a graph by choosing, from each hyperedge, two endvertices of a corresponding graph edge. A hypertree is a hypergraph which can be shrunk to a tree on the same vertex set. Klimo\v{s}ov\'{a} and Thomass\'{e} [J. Combin. Theory Ser. B 156 (2022), 250--293] proved (as a tool to obtain their main result on edge-decompositions of graphs into paths of equal length) that any rank hypertree can be shrunk to a tree where the degree of each vertex is at least times its degree in . We prove a stronger and a more general bound, replacing the constant with when the rank is . In place of entropy compression (used by Klimo\v{s}ov\'{a} and Thomass\'{e}), we use a hypergraph orientation lemma combined with a characterisation of edge-coloured graphs admitting rainbow spanning trees.
Keywords
Cite
@article{arxiv.2405.02049,
title = {Hypertree shrinking avoiding low degree vertices},
author = {Karolína Hylasová and Tomáš Kaiser},
journal= {arXiv preprint arXiv:2405.02049},
year = {2025}
}