English

Ordered and convex geometric trees with linear extremal function

Combinatorics 2019-02-04 v2

Abstract

The extremal functions ex(n,F)ex_{\rightarrow}(n,F) and ex\cir(n,F)ex_{\cir}(n,F) for ordered and convex geometric acyclic graphs FF have been extensively investigated by a number of researchers. Basic questions are to determine when ex(n,F)ex_{\rightarrow}(n,F) and ex\cir(n,F)ex_{\cir}(n,F) are linear in nn, the latter posed by Bra\ss-K\'arolyi-Valtr in 2003. In this paper, we answer both these questions for every tree FF. We give a forbidden subgraph characterization for a family T\cal T of ordered trees with kk edges, and show that ex(n,T)=(k1)n(k2)ex_{\rightarrow}(n,T) = (k - 1)n - {k \choose 2} for all nk+1n \geq k + 1 when TTT \in {\cal T} and ex(n,T)=Ω(nlogn)ex_{\rightarrow}(n,T) = \Omega(n\log n) for T∉TT \not\in {\cal T}. We also describe the family of the convex geometric trees with linear Tur\' an number and show that for every convex geometric tree FF not in this family, ex\cir(n,F)=Ω(nloglogn)ex_{\cir}(n,F)= \Omega(n\log \log n).

Keywords

Cite

@article{arxiv.1812.05750,
  title  = {Ordered and convex geometric trees with linear extremal function},
  author = {Zoltán Füredi and Alexandr Kostochka and Dhruv Mubayi and Jacques Verstraëte},
  journal= {arXiv preprint arXiv:1812.05750},
  year   = {2019}
}

Comments

14 pages, 9 figures. Same as the first version. Only metadata has been changed

R2 v1 2026-06-23T06:42:11.647Z