English

On a Conjecture for a Hypergraph Edge Coloring Problem

Discrete Mathematics 2020-06-12 v1 Combinatorics

Abstract

Let H=(MJ,EE)H =(\mathcal{M} \cup \mathcal{J} ,E \cup \mathcal{E}) be a hypergraph with two hypervertices G1\mathcal{G}_1 and G2\mathcal{G}_2 where M=G1G2\mathcal{M} =\mathcal{G}_{1} \cup \mathcal{G}_{2} and G1G2=\mathcal{G}_{1} \cap \mathcal{G}_{2} =\varnothing . An edge {h,j}E\{h ,j\} \in E in a bi-partite multigraph graph (MJ,E)(\mathcal{M} \cup \mathcal{J} ,E) has an integer multiplicity bjhb_{j h}, and a hyperedge {G,j}E\{\mathcal{G}_{\ell } ,j\} \in \mathcal{E}, =1,2\ell=1,2, has an integer multiplicity aja_{j \ell }. It has been conjectured in [5] that χ(H)=χf(H)\chi \prime (H) =\lceil \chi \prime _{f} (H)\rceil , where χ(H)\chi \prime (H) and χf(H)\chi \prime _{f} (H) are the edge chromatic number of HH and the fractional edge chromatic number of HH respectively. Motivation to study this hyperedge coloring conjecture comes from the University timetabling, and open shop scheduling with multiprocessors. We prove this conjecture in this paper.

Keywords

Cite

@article{arxiv.2006.06393,
  title  = {On a Conjecture for a Hypergraph Edge Coloring Problem},
  author = {Wieslaw Kubiak},
  journal= {arXiv preprint arXiv:2006.06393},
  year   = {2020}
}
R2 v1 2026-06-23T16:14:09.349Z