English

Overlap Number of Graphs

Combinatorics 2012-11-13 v1

Abstract

An {\it overlap representation} of a graph GG assigns sets to vertices so that vertices are adjacent if and only if their assigned sets intersect with neither containing the other. The {\it overlap number} \ol(G)\ol(G) (introduced by Rosgen) is the minimum size of the union of the sets in such a representation. We prove the following: (1) An optimal overlap representation of a tree can be produced in linear time, and its size is the number of vertices in the largest subtree in which the neighbor of any leaf has degree 2. (2) If δ(G)2\delta(G)\ge 2 and GK3G\ne K_3, then \ol(G)E(G)1\ol(G)\le |E(G)|-1, with equality when GG is connected and triangle-free and has no star-cutset. (3) If GG is an nn-vertex plane graph with n5n\ge5, then \ol(G)2n5\ol(G)\le 2n-5, with equality when every face has length 4 and there is no star-cutset. (4) If GG is an nn-vertex graph with n14n\ge 14, then \ol(G)\floorn2/4n/21\ol(G)\le \floor{n^2/4-n/2-1}, and this is sharp (for even nn, equality holds when GG arises from Kn/2,n/2K_{n/2,n/2} by deleting a perfect matching).

Keywords

Cite

@article{arxiv.1007.0804,
  title  = {Overlap Number of Graphs},
  author = {Daniel W. Cranston and Nitish Korula and Timothy D. LeSaulnier and Kevin Milans and Christopher Stocker and Jennifer Vandenbussche and Douglas B. West},
  journal= {arXiv preprint arXiv:1007.0804},
  year   = {2012}
}

Comments

21 pages

R2 v1 2026-06-21T15:44:46.093Z