2020
DOI: 10.1017/s0963548320000231
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Ramsey properties of randomly perturbed graphs: cliques and cycles

Abstract: Given graphs H1, H2, a graph G is (H1, H2) -Ramsey if, for every colouring of the edges of G with red and blue, there is a red copy of H1 or a blue copy of H2. In this paper we investigate Ramsey questions in the setting of randomly perturbed graphs. This is a random graph model introduced by Bohman, Frieze and Martin [8] in which one starts with a dense graph and then adds a given number of random edges to it. The study of Ramsey properties of randomly perturbed graphs was initiated by Krivelevich, Sudakov an… Show more

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Cited by 20 publications
(16 citation statements)
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References 40 publications
(76 reference statements)
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“…In most of these cases a G α , that is responsible for the lower bound, is the complete imbalanced bipartite graph K αn,(1−α)n . In this model there are also results with lower bounds on α [6,16,23,38] and for Ramsey-type problems [13,14].…”
Section: Introduction and Resultsmentioning
confidence: 97%
“…In most of these cases a G α , that is responsible for the lower bound, is the complete imbalanced bipartite graph K αn,(1−α)n . In this model there are also results with lower bounds on α [6,16,23,38] and for Ramsey-type problems [13,14].…”
Section: Introduction and Resultsmentioning
confidence: 97%
“…In recent years, a range of results have been obtained concerning embedding spanning subgraphs into a randomly perturbed graph, as well as other properties of the model; see, for example, [2,3,5,6,8,9,13,14,26,30,35,36]. The model has also been investigated in the setting of directed graphs and hypergraphs (see e.g., [4,23,34,41]).…”
Section: The Model Of Randomly Perturbed Graphsmentioning
confidence: 99%
“…In 2006, Krivelevich, Sudakov and Tetali [19] initiated the study of (edge) Ramsey properties of randomly perturbed graphs. Combining their work with recent results of the first and third authors [7] and of Powierski [23], we now know the number of random edges one needs to add to an n-vertex graph of positive density to w.h.p. ensure the resulting graph is (K r , K s )-Ramsey for all values of (r, s), except for the case when r = 4 and s ≥ 5.…”
Section: 2mentioning
confidence: 94%
“…ensure the resulting graph is ( K r , K s )‐Ramsey for all values of ( r , s ), except for the case when r = 4 and s ≥ 5. See 7 for other results on this topic.…”
Section: Introductionmentioning
confidence: 99%