English

More on foxes

Combinatorics 2016-10-31 v1 Discrete Mathematics

Abstract

An edge in a kk-connected graph GG is called {\em kk-contractible} if the graph G/eG/e obtained from GG by contracting ee is kk-connected. Generalizing earlier results on 33-contractible edges in spanning trees of 33-connected graphs, we prove that (except for the graphs Kk+1K_{k+1} if k{1,2}k \in \{1,2\}) (a) every spanning tree of a kk-connected triangle free graph has two kk-contractible edges, (b) every spanning tree of a kk-connected graph of minimum degree at least 32k1\frac{3}{2}k-1 has two kk-contractible edges, (c) for k>3k>3, every DFS tree of a kk-connected graph of minimum degree at least 32k32\frac{3}{2}k-\frac{3}{2} has two kk-contractible edges, (d) every spanning tree of a cubic 33-connected graph nonisomorphic to K4K_4 has at least 13V(G)1\frac{1}{3}|V(G)|-1 many 33-contractible edges, and (e) every DFS tree of a 33-connected graph nonisomorphic to K4K_4, the prism, or the prism plus a single edge has two 3-contractible edges. We also discuss in which sense these theorems are best possible.

Keywords

Cite

@article{arxiv.1610.09093,
  title  = {More on foxes},
  author = {Matthias Kriesell and Jens M. Schmidt},
  journal= {arXiv preprint arXiv:1610.09093},
  year   = {2016}
}

Comments

17 pages, 6 figures

R2 v1 2026-06-22T16:34:56.181Z