On the stress transit function
Abstract
The stress interval between is the set of all vertices in a graph that lie on every shortest -path. A set is stress convex if for any . A vertex is s-extreme if is a stress convex set in . The stress number of is the minimum cardinality of a set where . The stress hull number of is the minimum cardinality of a set whose stress convex hull is . In this paper, we present many basic properties of stress intervals. We characterize s-extreme vertices of a graph and construct graphs with arbitrarily large difference between the number of s-extreme vertices, and . Then we study these three invariants for some special graph families, such as graph products, split graphs, and block graphs. We show that in any split graph , , where is the set of s-extreme vertices of . Finally, we show that for , deciding whether is NP-complete problem, even when restricted to bipartite graphs.
Keywords
Cite
@article{arxiv.2502.09153,
title = {On the stress transit function},
author = {Arun Anil and Manoj Changat and Tanja Dravec and Jeny Jacob and Lekshmi Kamal K. Sheela and Iztok Peterin and Polona Repolusk and Rishi Ranjan Singh},
journal= {arXiv preprint arXiv:2502.09153},
year = {2025}
}