Resolving the Kohayakawa--Kreuter Conjecture for Families

Abstract

A graph G is (a,b)-sparse if every nonempty subgraph H satisfies e(H) ≤ a v(H) - b. We are interested in the conditions under which an (a,b)-sparse graph can be partitioned E(G) = E(G1) E(G2) such that for i ∈ \1,2\ we have that Gi is (ai, bi)-sparse. Kuperwasser, Samotij, and Wigderson conjectured that a (m,0)-sparse graph can be partitioned into a (1,1)-sparse graph and a (m,2m-1)-sparse graph. We prove the conjecture in full. The Kohayakawa--Kreuter Conjecture for Families claims that n-1/m2 is the threshold function for the random graph being Ramsey a.a.s. for graph families H1, … Hr. Kuperwasser, Samotij, and Wigderson motivated their conjecture by proving that it is sufficient to establish the Kohayakawa--Kreuter Conjecture for Families.

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