Competing frogs on Zd

Abstract

A two-type version of the frog model on Zd is formulated, where active type i particles move according to lazy random walks with probability pi of jumping in each time step (i=1,2). Each site is independently assigned a random number of particles. At time 0, the particles at the origin are activated and assigned type 1 and the particles at one other site are activated and assigned type 2, while all other particles are sleeping. When an active type i particle moves to a new site, any sleeping particles there are activated and assigned type i, with an arbitrary tie-breaker deciding the type if the site is hit by particles of both types in the same time step. We show that the event Gi that type i activates infinitely many particles has positive probability for all p1,p2∈(0,1] (i=1,2). Furthermore, if p1=p2, then the types can coexist in the sense that P(G1 G2)>0. We also formulate several open problems. For instance, we conjecture that, when the initial number of particles per site has a heavy tail, the types can coexist also when p1≠ p2.