English

Decomposing $C_4$-free graphs under degree constraints

Combinatorics 2017-06-23 v1

Abstract

A celebrated theorem of Stiebitz asserts that any graph with minimum degree at least s+t+1s+t+1 can be partitioned into two parts which induce two subgraphs with minimum degree at least ss and tt, respectively. This resolved a conjecture of Thomassen. In this paper, we prove that for s,t2s,t\geq 2, if a graph GG contains no cycle of length four and has minimum degree at least s+t1s+t-1, then GG can be partitioned into two parts which induce two subgraphs with minimum degree at least ss and tt, respectively. This improves the result of Diwan, who proved the same statement for graphs of girth at least five. Our proof also works for the case of variable functions, in which the bounds are sharp as showing by some polarity graphs. As a corollary, it follows that any graph containing no cycle of length four with minimum degree at least k+1k+1 contains kk vertex-disjoint cycles.

Keywords

Cite

@article{arxiv.1706.07292,
  title  = {Decomposing $C_4$-free graphs under degree constraints},
  author = {Jie Ma and Tianchi Yang},
  journal= {arXiv preprint arXiv:1706.07292},
  year   = {2017}
}
R2 v1 2026-06-22T20:26:35.481Z