English

On the stress transit function

Combinatorics 2025-02-14 v1

Abstract

The stress interval S(u,v)S(u,v) between u,vV(G)u,v\in V(G) is the set of all vertices in a graph GG that lie on every shortest u,vu,v-path. A set UV(G)U \subseteq V(G) is stress convex if S(u,v)US(u,v) \subseteq U for any u,vUu,v\in U. A vertex vV(G)v \in V(G) is s-extreme if V(G)vV(G)-v is a stress convex set in GG. The stress number sn(G)sn(G) of GG is the minimum cardinality of a set UU where u,vUS(u,v)=V(G)\bigcup_{u,v \in U}S(u,v)=V(G). The stress hull number sh(G)sh(G) of GG is the minimum cardinality of a set whose stress convex hull is V(G)V(G). In this paper, we present many basic properties of stress intervals. We characterize s-extreme vertices of a graph GG and construct graphs GG with arbitrarily large difference between the number of s-extreme vertices, sh(G)sh(G) and sn(G)sn(G). 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 GG, sh(G)=sn(G)=Exts(G)sh(G)=sn(G)=|Ext_s(G)|, where Exts(G)Ext_s(G) is the set of s-extreme vertices of GG. Finally, we show that for kNk \in \mathbb{N}, deciding whether sn(G)ksn(G) \leq k 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}
}
R2 v1 2026-06-28T21:42:52.320Z