How often can two independent elephant random walks on $\mathbb{Z}$ meet?

Published 21 Apr 2024 in math.PR | (2404.13490v1)

Abstract: We show that two independent elephant random walks on the integer lattice $\mathbb{Z}$ meet each other finitely often or infinitely often depends on whether the memory parameter $p$ is strictly larger than $3/4$ or not. Asymptotic results for the distance between them are also obtained.

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References (1)

Pólya, G. (1919). Quelques problèmes de probabilité se rapportant à la “promenade au hasard”, Ens. math., 20, 444–445.

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