Sandpile group of infinite graphs

Abstract

For a finite connected graph G and a non-empty subset S of its vertices thought of sinks, the so-called critical group (or sandpile group) C(G, S) has been studied for a long time. We present a class of graphs where such an extension can be made in a unified way. Similar extension was made by Maes, C. and Redig, F. and Saada, E., but we propose a more algebraic point of view. Namely, consider a C-net S⊂ Z2. We define a sandpile dynamics on Z2 with the set S of sinks. For such a choice of sinks, a relaxation of any bounded state is well defined. This allows us to define a group C( Z2, S) of recurrent states of this model. We show that C( Z2, S) is isomorphic to a group of S1-valued discrete harmonic functions on Z2 S. Examples of S, for which C( Z2, S) has no torsion or has all torsions, are provided. Pontryagin dual point of view is investigated. A discussion about perspectives of a sandpile group for Z2 as a projective limit concludes this work.