English

Note on Path-Connectivity of Complete Bipartite Graphs

Combinatorics 2020-08-11 v1

Abstract

For a graph G=(V,E)G=(V,E) and a set SV(G)S\subseteq V(G) of size at least 22, a path in GG is said to be an SS-path if it connects all vertices of SS. Two SS-paths P1P_1 and P2P_2 are said to be internally disjoint if E(P1)E(P2)=E(P_1)\cap E(P_2)=\emptyset and V(P1)V(P2)=SV(P_1)\cap V(P_2)=S. Let πG(S)\pi_G (S) denote the maximum number of internally disjoint SS-paths in GG. The kk-path-connectivity πk(G)\pi_k(G) of GG is then defined as the minimum πG(S)\pi_G (S), where SS ranges over all kk-subsets of V(G)V(G). In [M. Hager, Path-connectivity in graphs, Discrete Math. 59(1986), 53--59], the kk-path-connectivity of the complete bipartite graph Ka,bK_{a,b} was calculated, where k2k\geq 2. But, from his proof, only the case that 2kmin{a,b}2\leq k\leq min\{a,b\} was considered. In this paper, we calculate the the situation that min{a,b}+1ka+bmin\{a,b\}+1\leq k\leq a+b and complete the result.

Keywords

Cite

@article{arxiv.2008.04051,
  title  = {Note on Path-Connectivity of Complete Bipartite Graphs},
  author = {Shasha Li and Yan Zhao},
  journal= {arXiv preprint arXiv:2008.04051},
  year   = {2020}
}
R2 v1 2026-06-23T17:44:50.218Z