Maximum density of induced 5-cycle is achieved by an iterated blow-up of 5-cycle

Balogh, József; Hu, Ping; Lidický, Bernard; Pfender, Florian

doi:10.1016/j.ejc.2015.08.006

Cited by 52 publications

(113 citation statements)

References 25 publications

(38 reference statements)

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“…Our proof makes essential use of flag algebras. This powerful tool, introduced by Razborov [38], has been the basis of several recent groundbreaking results in a variety of combinatorial and geometric problems, such as [10,12,13,19,25,27,37,39], to name just a few.…”

Section: An Overview Of Our Strategymentioning

confidence: 99%

Closing in on Hill's Conjecture

Balogh¹,

Lidický²,

Salazar³

2019

SIAM J. Discrete Math.

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Section: An Overview Of Our Strategymentioning

confidence: 99%

Closing in on Hill's Conjecture

Balogh¹,

Lidický²,

Salazar³

2019

SIAM J. Discrete Math.

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“…The concept of inducibility is still gaining consideration from several research groups; see [13] and [9] for some recent results on blow-up of graphs and graphs on four vertices, respectively. The language of flag algebra was also employed recently in [1] to derive the inducibility of the cycle on five vertices, thereby settling a particular case of a conjecture formulated in [16].…”

Section: Introductionmentioning

confidence: 99%

Inducibility of d-ary trees

Czabarka

Dossou-Olory

Székely

et al. 2020

Discrete Mathematics

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“…Under the above conventions, consider the problem of maximising Λ(G) over admissible graphs G of given order n. Namely, we define the extremal function Λ(n, G) := max{Λ(G) : G ∈ G, v(G) = n} (2) and its density version λ(n, G) := Λ(n, G)/ n κ . It is not hard to show (see Lemma 2.2) that the sequence (λ(n, G)) ∞ n=κ is non-increasing and therefore the following limit exists:…”

Section: Introductionmentioning

confidence: 99%

“…For a family H of graphs we define ∆ edit (G, H) := min{∆ edit (G, H) : H ∈ H 0 n } and δ edit (G, H) := min{δ edit (G, H) : H ∈ H 0 n }. We say that our problem (2) is robustly B-stable (resp. perfectly B-stable) if there is C > 0 such that for every graph G ∈ G of order n C we have δ edit (G, B()) C max (1/n, λ(n, G) − λ(G)) , (resp.…”

Section: Introductionmentioning

confidence: 99%

Strong forms of stability from flag algebra calculations

Pikhurko

Sliacan

Tyros

2019

Journal of Combinatorial Theory, Series B

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Given a hereditary family G of admissible graphs and a function λ(G) that linearly depends on the statistics of order-κ subgraphs in a graph G, we consider the extremal problem of determining λ(n, G), the maximum of λ(G) over all admissible graphs G of order n. We call the problem perfectly B-stable for a graph B if there is a constant C such that every admissible graph G of order n C can be made into a blow-up of B by changing at most C(λ(n, G)−λ(G)) n 2 adjacencies. As special cases, this property describes all almost extremal graphs of order n within o(n 2 ) edges and shows that every extremal graph of order n n 0 is a blow-up of B.We develop general methods for establishing stability-type results from flag algebra computations and apply them to concrete examples. In fact, one of our sufficient conditions for perfect stability is stated in a way that allows automatic verification by a computer. This gives a unifying way to obtain computer-assisted proofs of many new results.

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Maximum density of induced 5-cycle is achieved by an iterated blow-up of 5-cycle

Cited by 52 publications

References 25 publications

Closing in on Hill's Conjecture

Closing in on Hill's Conjecture

Inducibility of d-ary trees

Strong forms of stability from flag algebra calculations

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