English

Graphs With Minimal Strength

Combinatorics 2021-03-02 v1

Abstract

For any graph GG of order pp, a bijection f:V(G)[1,p]f: V(G)\to [1,p] is called a numbering of the graph GG of order pp. The strength strf(G)str_f(G) of a numbering f:V(G)[1,p]f: V(G)\to [1,p] of GG is defined by strf(G)=max{f(u)+f(v)    uvE(G)},str_f(G) = \max\{f(u)+f(v)\; |\; uv\in E(G)\}, and the strength str(G)str(G) of a graph GG itself is str(G)=min{strf(G)    f\mboxisanumberingofG}.str(G) = \min\{str_f(G)\;|\; f \mbox{ is a numbering of } G\}. A numbering ff is called a strength labeling of GG if strf(G)=str(G)str_f(G)=str(G). In this paper, we obtained a sufficient condition for a graph to have str(G)=V(G)+\d(G)str(G)=|V(G)|+\d(G). Consequently, many questions raised in [Bounds for the strength of graphs, {\it Aust. J. Combin.} {\bf72(3)}, (2018) 492--508] and [On the strength of some trees, {\it AKCE Int. J. Graphs Comb.} (Online 2019) doi.org/10.1016/j.akcej.2019.06.002] are solved. Moreover, we showed that every graph GG either has str(G)=V(G)+\d(G)str(G)=|V(G)|+\d(G) or is a proper subgraph of a graph HH that has str(H)=V(H)+\d(H)str(H) = |V(H)| + \d(H) with \d(H)=\d(G)\d(H)=\d(G). Further, new good lower bounds of str(G)str(G) are also obtained. Using these, we determined the strength of 2-regular graphs and obtained new lower bounds of str(Qn)str(Q_n) for various nn, where QnQ_n is the nn-regular hypercube.

Keywords

Cite

@article{arxiv.2103.00724,
  title  = {Graphs With Minimal Strength},
  author = {Zhen-Bin Gao and Gee-Choon Lau and Wai-Chee Shiu},
  journal= {arXiv preprint arXiv:2103.00724},
  year   = {2021}
}

Comments

Submitted to Special Issue "Graph Labelings and Their Applications" to be published by Symmetry

R2 v1 2026-06-23T23:36:01.050Z