Abstract
A scaling limit for the simple random walk on the largest connected component of the Erd\H{o}s-R\'{e}nyi random graph G(n,p) in the critical window, p=n^{-1}+\lambda n^{-4/3} , is deduced. The limiting diffusion is constructed using resistance form techniques, and is shown to satisfy the same quenched short-time heat kernel asymptotics as the Brownian motion on the continuum random tree.
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