English

MaxCut in graphs with sparse neighborhoods

Combinatorics 2023-08-22 v2

Abstract

Let GG be a graph with mm edges and let mc(G)\mathrm{mc}(G) denote the size of a largest cut of GG. The difference mc(G)m/2\mathrm{mc}(G)-m/2 is called the surplus sp(G)\mathrm{sp}(G) of GG. A fundamental problem in MaxCut is to determine sp(G)\mathrm{sp}(G) for GG without specific structure, and the degree sequence d1,,dnd_1,\ldots,d_n of GG plays a key role in getting lower bounds of sp(G)\mathrm{sp}(G). A classical example, given by Shearer, is that sp(G)=Ω(i=1ndi)\mathrm{sp}(G)=\Omega(\sum_{i=1}^n\sqrt d_i) for triangle-free graphs GG, implying that sp(G)=Ω(m3/4)\mathrm{sp}(G)=\Omega(m^{3/4}). It was extended to graphs with sparse neighborhoods by Alon, Krivelevich and Sudakov. In this paper, we establish a novel and stronger result for a more general family of graphs with sparse neighborhoods. Our result can derive many well-known bounds on surplus of HH-free graphs for different HH, such as triangles, even cycles, graphs having a vertex whose removal makes them acyclic, or complete bipartite graphs Ks,tK_{s,t} with s{2,3}s\in \{2,3\}. It can also deduce many new (tight) bounds on sp(G)\mathrm{sp}(G) in HH-free graphs GG when HH is any graph having a vertex whose removal results in a bipartite graph with relatively small Tur\'{a}n number, especially the even wheel. This contributes to a conjecture raised by Alon, Krivelevich and Sudakov. Moreover, we obtain new families of graphs HH such that sp(G)=Ω(m3/4+ϵ(H))\mathrm{sp}(G)=\Omega(m^{3/4+\epsilon(H)}) for some constant ϵ(H)>0\epsilon(H)>0 in HH-free graphs GG, giving evidences to a conjecture suggested by Alon, Bollob\'as, Krivelevich and Sudakov.

Keywords

Cite

@article{arxiv.2307.09309,
  title  = {MaxCut in graphs with sparse neighborhoods},
  author = {Jinghua Deng and Jianfeng Hou and Siwei Lin and Qinghou Zeng},
  journal= {arXiv preprint arXiv:2307.09309},
  year   = {2023}
}
R2 v1 2026-06-28T11:33:39.357Z