Unusually large components in near-critical Erdos-R\'enyi graphs via ballot theorems
Abstract
We consider the near-critical Erdos-R\'enyi random graph G(n,p) and provide a new probabilistic proof of the fact that, when p is of the form p=p(n)=1/n+λ/n4/3 and A is large, \[P(|C|>An2/3) A-3/2e-A38+λ A22-λ2A2\] where C is the largest connected component of the graph. Our result allows A and λ to depend on n. While this result is already known, our proof relies only on conceptual and adaptable tools such as ballot theorems, whereas the existing proof relies on a combinatorial formula specific to Erdos-R\'enyi graphs, together with analytic estimates.
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