Maximum Frustration in Signed Generalized Petersen Graphs
Combinatorics
2021-10-12 v1
Abstract
A \textit{signed graph} is a simple graph whose edges are labelled with positive or negative signs. A cycle is \textit{positive} if the product of its edge signs is positive. A signed graph is \textit{balanced} if every cycle in the graph is positive. The \textit{frustration index} of a signed graph is the minimum number of edges whose deletion makes the graph balanced. The \textit{maximum frustration} of a graph is the maximum frustration index over all sign labellings. In this paper, first, we prove that the maximum frustration of generalized Petersen graphs is bounded above by for , and this bound is achieved for . Second, we prove that the maximum frustration of is bounded above by , where .
Keywords
Cite
@article{arxiv.1905.05548,
title = {Maximum Frustration in Signed Generalized Petersen Graphs},
author = {Deepak Sehrawat and Bikash Bhattacharjya},
journal= {arXiv preprint arXiv:1905.05548},
year = {2021}
}