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

Abstract

We study driven-dissipative activated random walk with sleep probability p on an n-vertex complete graph with a sink that traps jumping particles with probability qn. We show that the number of sleeping particles Sn left by the stationary distribution has a Gumbel scaling limit for (-n1/3) qn n-1/2. The particular scaling implies that Sn is hyperuniform and thus the stationary configuration law has negative correlations and is not a product measure. We also prove that Sn/n converges to p if and only if qn = e-o(n), and that, when qn=0, the number of jumps to stabilization undergoes a phase transition at density p.