On the largest component in the subcritical regime of the Bohman-Frieze process

Abstract

Kang, Perkins and Spencer showed that the size of the largest component of the Bohman-Frieze process at a fixed time t smaller than tc, the critical time for the process is L1(t)=( n/(tc-t)2) with high probability. They also conjectured that this is the correct order, that is L1(t)=O( n/(tc-t)2) with high probability for fixed t smaller than tc. Using a different approach, Bhamidi, Budhiraja and Wang showed that L1(tn)=O(( n)4/(tc-tn)2) with high probability for tn≤ tc-n-γ where γ∈(0,1/4). In this paper, we improve their result by showing that for any fixed λ>0, L1(tn)=O( n/(tc-tn)2) with high probability for tn≤ tc-λ n-1/3. In particular, this settles the conjecture of Kang, Perkins and Spencer. We also prove some generalizations for general bounded size rules.