2018
DOI: 10.1002/rsa.20761
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The size of the giant high‐order component in random hypergraphs

Abstract: The phase transition in the size of the giant component in random graphs is one of the most well‐studied phenomena in random graph theory. For hypergraphs, there are many possible generalizations of the notion of a connected component. We consider the following: two j‐sets (sets of j vertices) are j‐connected if there is a walk of edges between them such that two consecutive edges intersect in at least j vertices. A hypergraph is j‐connected if all j‐sets are pairwise j‐connected. In this paper, we determine t… Show more

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Cited by 15 publications
(31 citation statements)
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References 25 publications
(74 reference statements)
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“…A weaker version of this result appeared in [7] as Theorem 2, where the assumption that ε 3 n j , ε 2 n 1−δ → ∞ was replaced by the stronger condition ε 3 n 1−2δ → ∞, for some constant δ > 0. The case k = 2 and j = 1 is simply Theorem 1.…”
Section: Introduction and Main Resultsmentioning
confidence: 99%
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“…A weaker version of this result appeared in [7] as Theorem 2, where the assumption that ε 3 n j , ε 2 n 1−δ → ∞ was replaced by the stronger condition ε 3 n 1−2δ → ∞, for some constant δ > 0. The case k = 2 and j = 1 is simply Theorem 1.…”
Section: Introduction and Main Resultsmentioning
confidence: 99%
“…The proof of Theorem 2 in [7] was based on a short proof of Theorem 1 due to Bollobás and Riordan [6]. The idea is to study an exploration process modelling the growth of components and analyse this process based on a branching process approximation.…”
Section: Introduction and Main Resultsmentioning
confidence: 99%
“…We note that our proofs impose two restrictions on ε, neither of which match the critical window given by ε 3 n j → ∞, conjectured in [11].…”
Section: Concluding Remarks 71 the Critical Windowmentioning
confidence: 86%
“…When parameters are clear from the context, we use H as a shorthand for H k (n, p). The following higher-dimensional analogue of the random graph phase transition for H and j-connectedness was obtained in [11,12]. 11,12]).…”
Section: Motivationmentioning
confidence: 99%
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