English

On Ryser's Conjecture for Linear Intersecting Multipartite Hypergraphs

Combinatorics 2016-11-17 v3

Abstract

Ryser conjectured that τ(r1)ν\tau\le(r-1)\nu for rr-partite hypergraphs, where τ\tau is the covering number and ν\nu is the matching number. We prove this conjecture for r9r\le9 in the special case of linear intersecting hypergraphs, in other words where every pair of lines meets in exactly one vertex. Aharoni formulated a stronger version of Ryser's conjecture which specified that each rr-partite hypergraph should have a cover of size (r1)ν(r-1)\nu of a particular form. We provide a counterexample to Aharoni's conjecture with r=13r=13 and ν=1\nu=1. We also report a number of computational results. For r=7r=7, we find that there is no linear intersecting hypergraph that achieves the equality τ=r1\tau=r-1 in Ryser's conjecture, although non-linear examples are known. We exhibit intersecting non-linear examples achieving equality for r{9,13,17}r\in\{9,13,17\}. Also, we find that r=8r=8 is the smallest value of rr for which there exists a linear intersecting rr-partite hypergraph that achieves τ=r1\tau=r-1 and is not isomorphic to a subhypergraph of a projective plane.

Keywords

Cite

@article{arxiv.1508.00951,
  title  = {On Ryser's Conjecture for Linear Intersecting Multipartite Hypergraphs},
  author = {Nevena Francetić and Sarada Herke and Brendan D. McKay and Ian M. Wanless},
  journal= {arXiv preprint arXiv:1508.00951},
  year   = {2016}
}

Comments

Submitted for peer review in August 2015. An ancillary has been added. Otherwise, the results in all versions are identical

R2 v1 2026-06-22T10:26:39.950Z