Fires on trees

Abstract

We consider random dynamics on the edges of a uniform Cayley tree with n vertices, in which edges are either inflammable, fireproof, or burt. Every inflammable edge is replaced by a fireproof edge at unit rate, while fires start at smaller rate n-α on each inflammable edge, then propagate through the neighboring inflammable edges and are only stopped at fireproof edges. A vertex is called fireproof when all its adjacent edges are fireproof. We show that as n ∞, the density of fireproof vertices converges to 1 when α>1/2, to 0 when α<1/2, and to some non-degenerate random variable when α=1/2. We further study the connectivity of the fireproof forest, in particular the existence of a giant component.