Linear cycles of consecutive lengths

Abstract

A well-known result of Verstra\"ete V00 shows that for each integer k≥ 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≥ 3,k≥ 2, there exist constants c1=c1(r) and c2=c2(r,k), such that every linear r-uniform hypergraph G with average degree d(G)≥ c1 k contains linear cycles of k consecutive even lengths, the shortest of which is at most 2 n (d(G)/k)-c2. In particular, as an immediate corollary, we retrieve the current best known upper bound on the linear Tur\'an number of Cr2k with improved coefficients. Furthermore, we show that for any fixed integers r≥ 3,k≥ 2, there exist constants c3=c3(r) and c4=c4(r) such that every n-vertex linear r-uniform graph with average degree d(G)≥ c3k, contains linear cycles of k consecutive lengths, the shortest of which has length at most 6 n (d(G)/k)-c4 +6. Both the degree condition and the shortest length among the cycles guaranteed are best possible up to a constant factor.