English

Exponential Independence in Subcubic Graphs

Combinatorics 2020-10-05 v1

Abstract

A set SS of vertices of a graph GG is exponentially independent if, for every vertex uu in SS, vS{u}(12)dist(G,S)(u,v)1<1,\sum\limits_{v\in S\setminus \{ u\}}\left(\frac{1}{2}\right)^{{\rm dist}_{(G,S)}(u,v)-1}<1, where dist(G,S)(u,v){\rm dist}_{(G,S)}(u,v) is the distance between uu and vv in the graph G(S{u,v})G-(S\setminus \{ u,v\}). The exponential independence number αe(G)\alpha_e(G) of GG is the maximum order of an exponentially independent set in GG. In the present paper we present several bounds on this parameter and highlight some of the many related open problems. In particular, we prove that subcubic graphs of order nn have exponentially independent sets of order Ω(n/log2(n))\Omega(n/\log^2(n)), that the infinite cubic tree has no exponentially independent set of positive density, and that subcubic trees of order nn have exponentially independent sets of order (n+3)/4(n+3)/4.

Keywords

Cite

@article{arxiv.2010.00886,
  title  = {Exponential Independence in Subcubic Graphs},
  author = {Stéphane Bessy and Johannes Pardey and Dieter Rautenbach},
  journal= {arXiv preprint arXiv:2010.00886},
  year   = {2020}
}
R2 v1 2026-06-23T18:57:46.971Z