Yoshiharu Kohayakawa scite author profile

The chromatic threshold δ χ (H) of a graph H is the infimum of d > 0 such that there exists C = C(H, d) for which every H-free graph G with minimum degree at least d|G| satisfies χ(G) C. We prove thatfor every graph H with χ(H) = r 3. We moreover characterise the graphs H with a given chromatic threshold, and thus determine δ χ (H) for every graph H. This answers a question of Erdős and Simonovits [Discrete Math. 5 (1973), 323-334], and confirms a conjecture of Luczak and Thomassé [preprint (2010), 18pp]. δ χ (H) := inf d : ∃ C = C(H, d) such that if G is a graph on n vertices, with δ(G) dn and H ⊆ G, then χ(G) C .

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Threshold functions for asymmetric Ramsey properties involving cycles

Kohayakawa

Kreuter

1997

Random Struct. Alg.

130

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Yoshiharu Kohayakawa

Limits of permutation sequences

OnK 4-free subgraphs of random graphs

Szemerédi’s Regularity Lemma for Sparse Graphs

The chromatic thresholds of graphs

Threshold functions for asymmetric Ramsey properties involving cycles

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