A large deviation approach to super-critical bootstrap percolation on the random graph Gn,p

Abstract

We consider the Erd\"os--R\'enyi random graph Gn,p and we analyze the simple irreversible epidemic process on the graph, known in the literature as bootstrap percolation. We give a quantitative version of some results by Janson et al. (2012), providing a fine asymptotic analysis of the final size An* of active nodes, under a suitable super-critical regime. More specifically, we establish large deviation principles for the sequence of random variables \n- An*f(n)\n≥ 1 with explicit rate functions and allowing the scaling function f to vary in the widest possible range.