English

Large subgraphs without short cycles

Combinatorics 2015-04-13 v2

Abstract

We study two extremal problems about subgraphs excluding a family \F\F of graphs. i) Among all graphs with mm edges, what is the smallest size f(m,\F)f(m,\F) of a largest \F\F--free subgraph? ii) Among all graphs with minimum degree δ\delta and maximum degree Δ\Delta, what is the smallest minimum degree h(δ,Δ,\F)h(\delta,\Delta,\F) of a spanning \F\F--free subgraph with largest minimum degree? These questions are easy to answer for families not containing any bipartite graph. We study the case where \F\F is composed of all even cycles of length at most 2r2r, r2r\geq 2. In this case, we give bounds on f(m,\F)f(m,\F) and h(δ,Δ,\F)h(\delta,\Delta,\F) that are essentially asymptotically tight up to a logarithmic factor. In particular for every graph GG, we show the existence of subgraphs with arbitrarily high girth, and with either many edges or large minimum degree. These subgraphs are created using probabilistic embeddings of a graph into extremal graphs.

Keywords

Cite

@article{arxiv.1401.4928,
  title  = {Large subgraphs without short cycles},
  author = {Florent Foucaud and Michael Krivelevich and Guillem Perarnau},
  journal= {arXiv preprint arXiv:1401.4928},
  year   = {2015}
}

Comments

14 pages

R2 v1 2026-06-22T02:49:57.470Z