Laplacian growth & sandpiles on the Sierpinski gasket: limit shape universality and exact solutions

Abstract: We establish quantitative spherical shape theorems for rotor-router aggregation and abelian sandpile growth on the graphical Sierpinski gasket (SG) when particles are launched from the corner vertex.In particular, the abelian sandpile growth problem is exactly solved via a recursive construction of self-similar sandpile tiles. We show that sandpile growth and patterns exhibit a (2•3 n )-periodicity as a function of the initial mass. Moreover, the cluster explodes-increments by more than 1 in radius-at periodic… Show more