English

The edit distance function and symmetrization

Combinatorics 2016-05-24 v6

Abstract

The edit distance between two graphs on the same labeled vertex set is the size of the symmetric difference of the edge sets. The distance between a graph, GG, and a hereditary property, H{\cal H}, is the minimum of the distance between GG and each GHG'\in{\cal H}. The edit distance function of H{\cal H} is a function of p[0,1]p\in[0,1] and is the limit of the maximum normalized distance between a graph of density pp and H{\cal H}. This paper develops a method, called localization, for computing the edit distance function of various hereditary properties. For any graph HH, Forb(H){\rm Forb}(H) denotes the property of not having an induced copy of HH. This paper gives some results regarding estimation of the function for an arbitrary hereditary property. This paper also gives the edit distance function for Forb(H){\rm Forb}(H), where HH is a cycle on 9 or fewer vertices.

Cite

@article{arxiv.1007.1897,
  title  = {The edit distance function and symmetrization},
  author = {Ryan R. Martin},
  journal= {arXiv preprint arXiv:1007.1897},
  year   = {2016}
}

Comments

21 pages, 8 figures

R2 v1 2026-06-21T15:47:04.887Z