English

Stars on trees

Combinatorics 2016-03-17 v1

Abstract

For a positive integer rr and a vertex vv of a graph GG, let IG(r)(v)\mathcal{I}_G^{(r)}(v) denote the set of all independent sets of GG that have exactly rr elements and contain vv. Hurlbert and Kamat conjectured that for any rr and any tree TT, there exists a leaf zz of TT such that IT(r)(v)IT(r)(z)|\mathcal{I}_T^{(r)}(v)| \leq |\mathcal{I}_T^{(r)}(z)| for each vertex vv of TT. They proved the conjecture for r4r \leq 4. For any k3k \geq 3, we construct a tree TkT_k that has a vertex xx such that xx is not a leaf of TkT_k, ITk(r)(z)<ITk(r)(x)|\mathcal{I}_{T_k}^{(r)}(z)| < |\mathcal{I}_{T_k}^{(r)}(x)| for any leaf zz of TkT_k and any 5r2k+15 \leq r \leq 2k+1, and 2k+12k+1 is the largest integer ss for which ITk(s)(x)\mathcal{I}_{T_k}^{(s)}(x) is non-empty. Therefore, the conjecture is not true for r5r \geq 5.

Keywords

Cite

@article{arxiv.1603.04916,
  title  = {Stars on trees},
  author = {Peter Borg},
  journal= {arXiv preprint arXiv:1603.04916},
  year   = {2016}
}

Comments

5 pages

R2 v1 2026-06-22T13:11:53.880Z