English

Bounding the Mostar index

Combinatorics 2022-11-15 v1

Abstract

Do\v{s}li\'{c} et al. defined the Mostar index of a graph GG as Mo(G)=uvE(G)nG(u,v)nG(v,u)Mo(G)=\sum\limits_{uv\in E(G)}|n_G(u,v)-n_G(v,u)|, where, for an edge uvuv of GG, the term nG(u,v)n_G(u,v) denotes the number of vertices of GG that have a smaller distance in GG to uu than to vv. They conjectured that Mo(G)0.148n3Mo(G)\leq 0.\overline{148}n^3 for every graph GG of order nn. As a natural upper bound on the Mostar index, Geneson and Tsai implicitly consider the parameter Mo(G)=uvE(G)(nmin{dG(u),dG(v)})Mo^\star(G)=\sum\limits_{uv\in E(G)}\big(n-\min\{ d_G(u),d_G(v)\}\big). For a graph GG of order nn, they show that Mo(G)524(1+o(1))n3Mo^\star(G)\leq \frac{5}{24}(1+o(1))n^3. We improve this bound to Mo(G)(231)n3Mo^\star(G)\leq \left(\frac{2}{\sqrt{3}}-1\right)n^3, which is best possible up to terms of lower order. Furthermore, we show that Mo(G)(2(Δn)2+(Δn)2(Δn)(Δn)2+(Δn))n3Mo^\star(G)\leq \left(2\left(\frac{\Delta}{n}\right)^2+\left(\frac{\Delta}{n}\right)-2\left(\frac{\Delta}{n}\right)\sqrt{\left(\frac{\Delta}{n}\right)^2+\left(\frac{\Delta}{n}\right)}\right)n^3 provided that GG has maximum degree Δ\Delta.

Cite

@article{arxiv.2211.06682,
  title  = {Bounding the Mostar index},
  author = {Štefko Miklavič and Johannes Pardey and Dieter Rautenbach and Florian Werner},
  journal= {arXiv preprint arXiv:2211.06682},
  year   = {2022}
}
R2 v1 2026-06-28T05:43:49.577Z