English

On Chromatic Number and Minimum Cut

Combinatorics 2015-12-01 v2

Abstract

For a graph GG, the tree graph TG,t{\cal T}_{G,t} has all tree subgraphs of GG with tt vertices as vertex set and two tree subgraphs are neighbors if they are edge-disjoint. Also, the rthr^{th} cut number of GG is the minimum number of edges between parts of a partition of vertex set of GG into two parts such that each part has size at least rr. We show that if t=(1o(1))nt=(1-o(1))n and nn is large enough, then for any dense graph GG with nn vertices, the chromatic number of the tree graph TG,t{\cal T}_{G,t} is equal to the (nt+1)th(n-t+1)^{th} cut number of GG. In particular, as a consequence, we prove that if nn is large enough and GG is a dense graph, then the chromatic number of the spanning tree graph TG,n{\cal T}_{G,n} is equal to the size of the minimum cut of GG. The proof method is based on alternating Tur\'an number inspired by Tucker's lemma, an equivalent combinatorial version of the Borsuk-Ulam theorem.

Keywords

Cite

@article{arxiv.1407.8035,
  title  = {On Chromatic Number and Minimum Cut},
  author = {Meysam Alishahi and Hossein Hajiabolhassan},
  journal= {arXiv preprint arXiv:1407.8035},
  year   = {2015}
}
R2 v1 2026-06-22T05:16:38.346Z