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Svante Janson, Tail bounds for sums of geometric, exponential variables, Statistics & Probability Letters 135 ( · 2018

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Scaling limit and density conjecture for activated random walk on the complete graph

math.PR · 2026-04-06 · unverdicted · novelty 7.0 · 2 refs

Activated random walk on the complete graph has a Gumbel scaling limit for sleeping particles and hyperuniform stationary law when the sink probability satisfies exp(-n^{1/3}) ≪ q_n ≪ n^{-1/2}.

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Scaling limit and density conjecture for activated random walk on the complete graph math.PR · 2026-04-06 · unverdicted · none · ref 13 · 2 links
Activated random walk on the complete graph has a Gumbel scaling limit for sleeping particles and hyperuniform stationary law when the sink probability satisfies exp(-n^{1/3}) ≪ q_n ≪ n^{-1/2}.

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