Asymptotic behavior of the critical density of activated random walk
Abstract
We study the asymptotic behavior of the critical density of the activated random walk model as the sleep rate λ tends to 0 and ∞. For large λ, we prove new lower bounds in dimensions 1 and 2, showing that in one dimension the critical density approaches 1 superpolynomially fast. For small λ, we prove a new lower bound in two dimensions for how fast the critical density vanishes. We also obtain the first-order approximation for transient walks in both regimes.
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