English

On Mean Distance and Girth

Discrete Mathematics 2013-01-07 v2

Abstract

We bound the mean distance in a connected graph which is not a tree in function of its order nn and its girth gg. On one hand, we show that mean distance is at most n+13g(g24)12n(n1)\frac{n+1}{3}-\frac{g(g^2-4)}{12n(n-1)} if gg is even and at most n+13g(g21)12n(n1)\frac{n+1}{3}-\frac{g(g^2-1)}{12n(n-1)} if gg is odd. On the other hand, we prove that mean distance is at least ng4(n1)\frac{ng}{4(n-1)} unless GG is an odd cycle.

Cite

@article{arxiv.0806.1438,
  title  = {On Mean Distance and Girth},
  author = {Siham Bekkai and Mekkia Kouider},
  journal= {arXiv preprint arXiv:0806.1438},
  year   = {2013}
}

Comments

this paper has been withdrawn because it has been published

R2 v1 2026-06-21T10:48:43.994Z