English

A simple upper bound for trace function of a hypergraph with applications

Data Structures and Algorithms 2019-03-08 v2

Abstract

Let H=(V,E){H}=(V, {E}) be a hypergraph on the vertex set VV and edge set E2V{E}\subseteq 2^V. We show that number of distinct {\it traces} on any kk- subset of VV, is most k.α^(H)k.{\hat \alpha}(H), where α^(H){\hat \alpha}(H) is the {\it degeneracy} of HH. The result significantly improves/generalizes some of related results. For instance, the vcvc dimension HH (or vc(H)vc(H)) is shown to be at most log(α^(H))+1\log({\hat \alpha}(H))+1 which was not known before. As a consequence vc(H)vc(H) can be computed in computed in nO(log(δ^(H)))n^{O( {\rm log}({\hat \delta}(H)))} time. When applied to the neighborhood systems of a graphs excluding a fixed minor, it reduces the known linear upper bound on the VCVC dimension to a logarithmic one, in the size of the minor. When applied to the location domination and identifying code numbers of any nn vertex graph GG, one gets the new lower bound of Ω(n/(α^(G))\Omega(n/({\hat \alpha}(G)), where α^(G){\hat \alpha}(G) is the degeneracy of GG.

Keywords

Cite

@article{arxiv.1902.08366,
  title  = {A simple upper bound for trace function of a hypergraph with applications},
  author = {Farhad Shahrokhi},
  journal= {arXiv preprint arXiv:1902.08366},
  year   = {2019}
}

Comments

One of lemmas 2.2 is wrong

R2 v1 2026-06-23T07:47:54.174Z