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Quenched scaling limit for biased random walks on random, heavy tailed conductances: low dimensions
Published 23 Jul 2025 in math.PR | (2507.17583v1)
Abstract: We consider a random walk amongst positive random conductances on $\mathbb{Z}d, d \ge 2$, with directional bias. When the conductances have a stable distribution with parameter $\gamma \in (0, 1)$, the walk is sub-ballistic. In this regime Fribergh and Kious (Ann. Prob. 2018) derived an annealed scaling limit for the appropriately rescaled walk towards the Fractional Kinetics process. We prove the quenched version of this result for all $d \ge 2$.
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