Linear cycles of consecutive lengths

TL;DR

This paper extends Verstra"ete's result on cycles of consecutive lengths from graphs to linear r-uniform hypergraphs, establishing degree conditions for the existence of such cycles with bounds on their lengths.

Contribution

It provides new degree conditions for linear cycles of consecutive lengths in hypergraphs, improving bounds on the linear Turán number and shortest cycle length.

Findings

Hypergraph degree conditions guarantee cycles of consecutive lengths.

Bounds on shortest cycle length are tight up to constants.

Improved coefficients for Turán number bounds.

Abstract

A well-known result of Verstra\"ete \cite{V00} shows that for each integer $k\geq 2$ every graph $G$ with average degree at least $8k$ contains cycles of $k$ consecutive even lengths, the shortest of which is at most twice the radius of $G$. We establish two extensions of Verstra\"ete's result for linear cycles in linear $r$-uniform hypergraphs. We show that for any fixed integers $r\geq 3,k\geq 2$, there exist constants $c_1=c_1(r)$ and $c_2=c_2(r,k)$, such that every linear $r$-uniform hypergraph $G$ with average degree $d(G)\geq c_1 k$ contains linear cycles of $k$ consecutive even lengths, the shortest of which is at most $2\lceil \frac{ \log n}{\log (d(G)/k)-c_2}\rceil$. In particular, as an immediate corollary, we retrieve the current best known upper bound on the linear Tur\'an number of $C^r_{2k}$ with improved coefficients. Furthermore, we show that for any fixed integers $r\geq 3,k\geq 2$, there exist constants $c_3=c_3(r)$ and $c_4=c_4(r)$ such that every $n$-vertex linear $r$-uniform graph with average degree $d(G)\geq c_3k$, contains linear cycles of $k$ consecutive lengths, the shortest of which has length at most $6\lceil \frac{\log n}{\log (d(G)/k)-c_4} \rceil +6$. Both the degree condition and the shortest length among the cycles guaranteed are best possible up to a constant factor.