The codegree Tur\'an density of tight cycles
Abstract
The codegree Tur\'an density γ(F) of a k-uniform hypergraph F is the minimum real number γ 0 such that every k-uniform hypergraph on sufficiently many n vertices, in which every set of k-1 vertices is contained in at least (γ+o(1))n edges, contains a copy of F. A recent result of Piga, Sanhueza-Matamala, and Schacht determines that γ(C3)=13 for every 3-uniform tight cycle C3 of length , where 0 and is not divisible by 3. In this paper, we investigate the codegree Tur\'an density of k-uniform tight cycles Ck. We establish improved upper and lower bounds on γ(Ck) for general not divisible by k. These results yield the following consequences: 1). For any prime k 3, we show that γ(Ck)=13 for all sufficiently large not divisible by k, generalizing the above theorem of Piga et al. 2). For all k 3, we determine the exact value of γ(Ck) for integers not divisible by k in a set of (natural) density at least (k)k, where (·) denotes Euler's totient function. 3). We give a complete answer to a question of Han, Lo, and Sanhueza-Matamala concerning the tightness of their construction for γ(Ck). Moreover, our results also determine the codegree Tur\'an density of Ck-, that is, the k-uniform tight cycle of length with one edge removed, for a new set of integers of positive density for every k 3. Our upper bound result is based on a structural characterization of Ck-free k-uniform hypergraphs with high minimum codegree, while the lower bounds are derived from a novel construction model, coupled with the arithmetic properties of the integers k and .
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