Threshold numbers of some graphs
Abstract
A graph is called a \emph{-threshold graph} with \emph{thresholds} if we can assign a real number to each vertex , such that for any , we have if and only if holds true for an odd number of elements in . The smallest integer such that is a -threshold graph is called the \emph{threshold number} of . For the complete multipartite graphs and the cluster graphs, Kittipassorn and Sumalroj determined the exact threshold numbers of and . In this paper, first we determine the threshold numbers of some path-related graphs, including linear forests, ladders, and tents. Then, on the basis of Kittipassorn and Sumalroj's results, we determine the exact threshold numbers of and , which solve a problem proposed by Sumalroj.
Keywords
Cite
@article{arxiv.2406.12063,
title = {Threshold numbers of some graphs},
author = {Runze Wang},
journal= {arXiv preprint arXiv:2406.12063},
year = {2024}
}
Comments
title changed, new content added; v2: more succinct