English

Turan Problems and Shadows II: Trees

Combinatorics 2014-02-05 v1

Abstract

The expansion G+G^+ of a graph GG is the 3-uniform hypergraph obtained from GG by enlarging each edge of GG with a vertex disjoint from V(G)V(G) such that distinct edges are enlarged by distinct vertices. Let exr(n,F)_r(n,F) denote the maximum number of edges in an rr-uniform hypergraph with nn vertices not containing any copy of FF. The authors \cite{KMV} recently determined ex3(n,G+)_3(n,G^+) more generally, namely when GG is a path or cycle, thus settling conjectures of F\"uredi-Jiang \cite{FJ} (for cycles) and F\"uredi-Jiang-Seiver \cite{FJS} (for paths). Here we continue this project by determining the asymptotics for ex3(n,G+)_3(n,G^+) when GG is any fixed forest. This settles a conjecture of F\"uredi \cite{Furedi}. Using our methods, we also show that for any graph GG, either ex3(n,G+)(12+o(1))n2_3(n,G^{+}) \leq \left(\frac{1}{2} + o(1)\right)n^2 or ex3(n,G+)(1+o(1))n2,_3(n,G^{+}) \geq (1 + o(1))n^2, thereby exhibiting a jump for the Tur\'an number of expansions.

Keywords

Cite

@article{arxiv.1402.0544,
  title  = {Turan Problems and Shadows II: Trees},
  author = {Alexandr Kostochka and Dhruv Mubayi and Jacques Verstraete},
  journal= {arXiv preprint arXiv:1402.0544},
  year   = {2014}
}
R2 v1 2026-06-22T03:00:20.602Z