Asymptotic shape in a continuum growth model

Abstract

A continuum growth model is introduced. The state at time t, St, is a subset of Rd and consists of a connected union of randomly sized Euclidean balls, which emerge from outbursts at their center points. An outburst occurs somewhere in St after an exponentially distributed time with expected value |St|-1 and the location of the outburst is uniformly distributed over St. The main result is that if the distribution of the radii of the outburst balls has bounded support, then St grows linearly and St/t has a non-random shape as t→ ∞. Due to rotation invariance the asymptotic shape must be a Euclidean ball.