English

A Note on Threshold Dimension of Permutation Graphs

Combinatorics 2009-06-08 v1

Abstract

A graph G(V,E)G(V,E) is a threshold graph if there exist non-negative reals wv,vVw_v, v \in V and tt such that for every UVU \subseteq V, vUwvt\sum_{v \in U} w_v\leq t if and only if UU is a stable set. The {\it threshold dimension} of a graph G(V,E)G(V,E), denoted as t(G)t(G), is the smallest integer kk such that EE can be covered by kk threshold spanning subgraphs of GG. A permutation graph is a graph that can be represented as the intersection graph of a family of line segments that connect two parallel lines in the Euclidean plane. In this paper we will show that if GG is a permutation graph then t(G)α(G)t(G) \leq \alpha(G) (where α(G)\alpha(G) is the cardinality of maximum independent set in GG) and this bound is tight. As a corollary we will show that t(G)n2t(G) \leq \frac{n}{2} where nn is the number of vertices in the permutation graph GG. This bound is also tight.

Keywords

Cite

@article{arxiv.0906.1165,
  title  = {A Note on Threshold Dimension of Permutation Graphs},
  author = {Diptendu Bhowmick},
  journal= {arXiv preprint arXiv:0906.1165},
  year   = {2009}
}

Comments

8 pages, 3 figures

R2 v1 2026-06-21T13:10:09.912Z