English

Girth, minimum degree, independence, and broadcast independence

Combinatorics 2018-09-26 v1

Abstract

An independent broadcast on a connected graph GG is a function f:V(G)N0f:V(G)\to \mathbb{N}_0 such that, for every vertex xx of GG, the value f(x)f(x) is at most the eccentricity of xx in GG, and f(x)>0f(x)>0 implies that f(y)=0f(y)=0 for every vertex yy of GG within distance at most f(x)f(x) from xx. The broadcast independence number αb(G)\alpha_b(G) of GG is the largest weight xV(G)f(x)\sum\limits_{x\in V(G)}f(x) of an independent broadcast ff on GG. It is known that α(G)αb(G)4α(G)\alpha(G)\leq \alpha_b(G)\leq 4\alpha(G) for every connected graph GG, where α(G)\alpha(G) is the independence number of GG. If GG has girth gg and minimum degree δ\delta, we show that αb(G)2α(G)\alpha_b(G)\leq 2\alpha(G) provided that g6g\geq 6 and δ3\delta\geq 3 or that g4g\geq 4 and δ5\delta\geq 5. Furthermore, we show that, for every positive integer kk, there is a connected graph GG of girth at least kk and minimum degree at least kk such that αb(G)2(11k)α(G)\alpha_b(G)\geq 2\left(1-\frac{1}{k}\right)\alpha(G). Our results imply that lower bounds on the girth and the minimum degree of a connected graph GG can lower the fraction αb(G)α(G)\frac{\alpha_b(G)}{\alpha(G)} from 44 below 22, but not any further.

Keywords

Cite

@article{arxiv.1809.09565,
  title  = {Girth, minimum degree, independence, and broadcast independence},
  author = {Stéphane Bessy and Dieter Rautenbach},
  journal= {arXiv preprint arXiv:1809.09565},
  year   = {2018}
}
R2 v1 2026-06-23T04:18:00.814Z