Hypergraph Lagrangians I: the Frankl-Füredi conjecture is false

Gruslys, Vytautas; Letzter, Shoham; Morrison, Natasha

doi:10.48550/arxiv.1807.00793

Cited by 4 publications

(13 citation statements)

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“…Subsequent progress in this conjecture were made in the papers of Tang, Peng, Zhang and Zhao [21], Tyomkyn [22], and Lei, Lu and Peng [12]. Recently, Gruslys, Letzter and Morrison [6] confirmed this conjecture for r = 3 and the number of edges is sufficiently large.…”

Section: Introductionmentioning

confidence: 92%

Lagrangian densities of short 3-uniform linear paths and Turán numbers of their extensions

Wu,

Peng

2019

Preprint

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For a fixed positive integer n and an r-uniform hypergraph H, the Turán number ex(n, H) is the maximum number of edges in an H-free r-uniform hypergraph on n vertices, and the Lagrangian density of H is defined as π λ (H) = sup{r!λ(G) : G is an H-free r-uniform hypergraph}, where). Let us say that an r-uniform hypergraph H on t vertices is perfect if π λ (H) = r!λ(K r t−1 ). A result of Motzkin and Straus imply that all graphs are perfect. It is interesting to explore what kind of hypergraphs are perfect. Let Pt = {e1, e2, . . . , et} be the linear 3-uniform path of length t, that is, |ei| = 3, |ei ∩ ei+1| = 1 and ei ∩ ej = ∅ if |i − j| ≥ 2. We show that P3 and P4 are perfect, this supports a conjecture in [24] proposing that all 3-uniform linear hypergraphs are perfect. Applying the results on Lagrangian densities, we determine the Turán numbers of their extensions.

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Section: Introductionmentioning

confidence: 92%

Lagrangian densities of short 3-uniform linear paths and Turán numbers of their extensions

Wu,

Peng

2019

Preprint

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show abstract

“…The most noteworthy such work, apart from the above progress on the r = 3 case, is a paper by Tyomkyn [24] who proved the conjecture for r ≥ 4 and 'almost all' values of m. Other relevant works on the case r ≥ 4 include Nikiforov [17], Lu [15] and Lei and Lu [13]. See [10] for a more detailed overview of their work.…”

Section: Theorem 12 ([10]mentioning

confidence: 99%

“…The proof of Theorem 1.3 relies on exploiting the relationship between the problem of maximising the Lagrangian and the problem of maximising the sum of degrees squared. We remark that this relationship is also explored in [10], where we used it to find an infinite family of counterexamples to (1.2) for r ≥ 4.…”

Section: Maximising the Sum Of Degrees Squaredmentioning

confidence: 99%

“…In Section 2.1 we provide notation and definitions, in Section 2.2 we state some relevant results from previous papers, and in Section 2.3 we provide additional preliminary results, along with their proofs. We note that all of the content of Sections 2.1 and 2.2 appears in [10] together with the proofs. We say that w is a weighting of…”

Section: Preliminariesmentioning

confidence: 99%

“…The result of Motzkin and Straus [16] confirms the truth of this conjecture when r = 2. In [10], we disproved this conjecture by finding an infinite family of counterexamples for all r ≥ 4. In this paper we resolve the remaining case, that is, when r = 3.…”

Section: Introductionmentioning

confidence: 95%

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