English

On zero-sum spanning trees and zero-sum connectivity

Combinatorics 2020-07-17 v1

Abstract

We consider 22-colourings f:E(G){1,1}f : E(G) \rightarrow \{ -1 ,1 \} of the edges of a graph GG with colours 1-1 and 11 in Z\mathbb{Z}. A subgraph HH of GG is said to be a zero-sum subgraph of GG under ff if f(H):=eE(H)f(e)=0f(H) := \sum_{e\in E(H)} f(e) =0. We study the following type of questions, in several cases obtaining best possible results: Under which conditions on f(G)|f(G)| can we guarantee the existence of a zero-sum spanning tree of GG? The types of GG we consider are complete graphs, K3K_3-free graphs, dd-trees, and maximal planar graphs. We also answer the question of when any such colouring contains a zero-sum spanning path or a zero-sum spanning tree of diameter at most 33, showing in passing that the diameter-33 condition is best possible. Finally, we give, for G=KnG = K_n, a sharp bound on f(Kn)|f(K_n)| by which an interesting zero-sum connectivity property is forced, namely that any two vertices are joined by a zero-sum path of length at most 44. One feature of this paper is the proof of an Interpolation Lemma leading to a Master Theorem from which many of the above results follow and which can be of independent interest.

Keywords

Cite

@article{arxiv.2007.08240,
  title  = {On zero-sum spanning trees and zero-sum connectivity},
  author = {Yair Caro and Adriana Hansberg and Josef Lauri and Christina Zarb},
  journal= {arXiv preprint arXiv:2007.08240},
  year   = {2020}
}
R2 v1 2026-06-23T17:09:50.881Z