On the Growth of a Ballistic Deposition Model on Finite Graphs

Abstract

We revisit a ballistic deposition process introduced by Atar, Athreya and Kang. Let G=(V,E) be a finite connected graph. We choose independently and uniformly vertices in G. If a vertex x is chosen and the previous height configuration is given by h=(hy)y ∈ V ∈ N0V, the height hx is replaced by \[ hx := 1 + y x hy. \] We study asymptotic properties of this growth model. We determine the asymptotic growth parameter γ(G ) for some graphs and prove a central limit theorem for the fluctuations around γ ( G). We also give a new graph-theoretic interpretation of an inequality obtained by Atar et al..