Internal aggregation models with multiple sources and obstacle problems on Sierpinski gaskets

Abstract

We consider the doubly infinite Sierpinski gasket graph SG0, rescale it by factor 2-n, and on the rescaled graphs SGn=2-nSG0, for every n∈ N, we investigate the limit shape of three aggregation models with initial configuration σn of particles supported on multiple vertices. The models under consideration are: divisible sandpile in which the excess mass is distributed among the vertices until each vertex is stable and has mass less or equal to one, internal DLA in which particles do random walks until finding an empty site, and rotor aggregation in which particles perform deterministic counterparts of random walks until finding an empty site. We denote by SG=cl(n=0∞ SGn) the infinite Sierpinski gasket, which is a closed subset of R2, for which SGn represents the level-n approximating graph, and we consider a continuous function σ:SG. For σ we solve the obstacle problem and we describe the noncoincidence set D⊂ SG as the solution of a free boundary problem on the fractal SG. If the discrete particle configurations σn on the approximating graphs SGn converge pointwise to the continuous function σ on the limit set SG, we prove that, as n∞, the scaling limits of the three aforementioned models on SGn starting with initial particle configuration σn converge to the deterministic solution D of the free boundary problem on the limit set SG⊂R2. For D we also investigate boundary regularity properties.

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