Christopher Hoffman, Tobias Johnson, Matthew Junge
Published 2014-04-24, updated 2015-06-04Version 5
The frog model is a growing system of random walks where a particle is added whenever a new site is visited. A longstanding open question is how often the root is visited on the infinite $d$-ary tree. We prove the model undergoes a phase transition, finding it recurrent for $d=2$ and transient for $d\geq 5$. Simulations suggest strong recurrence for $d=2$, weak recurrence for $d=3$, and transience for $d\geq 4$. Additionally, we prove a 0-1 law for all $d$-ary trees, and we exhibit a graph on which a 0-1 law does not hold.
Comments: 23 pages, 8 figures
The critical density for the frog model is the degree of the tree
Recurrence and Transience of Frogs with Drift on $\mathbb{Z}^d$
Monotone interaction of walk and graph: recurrence versus transience
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