English

Spanning Trees and Domination in Hypercubes

Combinatorics 2019-06-03 v1

Abstract

Let L(G)L(G) denote the maximum number of leaves in any spanning tree of a connected graph GG. We show the (known) result that for the nn-cube QnQ_n, L(Qn)2n=V(Qn)L(Q_n) \sim 2^n = |V(Q_n)| as nn\rightarrow \infty. Examining this more carefully, consider the minimum size of a connected dominating set of vertices γc(Qn)\gamma_c(Q_n), which is 2nL(Qn)2^n-L(Q_n) for n2n\ge2. We show that γc(Qn)2n/n\gamma_c(Q_n)\sim 2^n/n. We use Hamming codes and an "expansion" method to construct leafy spanning trees in QnQ_n.

Keywords

Cite

@article{arxiv.1905.13292,
  title  = {Spanning Trees and Domination in Hypercubes},
  author = {Jerrold R. Griggs},
  journal= {arXiv preprint arXiv:1905.13292},
  year   = {2019}
}
R2 v1 2026-06-23T09:34:03.058Z