How to clean a dirty floor: Probabilistic potential theory and the Dobrushin uniqueness theorem

Abstract

Motivated by the Dobrushin uniqueness theorem in statistical mechanics, we consider the following situation: Let α be a nonnegative matrix over a finite or countably infinite index set X, and define the "cleaning operators" βh = I1-h + Ih α for h: X [0,1] (here If denotes the diagonal matrix with entries f). We ask: For which "cleaning sequences" h1, h2, ... do we have c βh1 ... βhn 0 for a suitable class of "dirt vectors" c? We show, under a modest condition on α, that this occurs whenever Σi hi = ∞ everywhere on X. More generally, we analyze the cleaning of subsets ⊂eq X and the final distribution of dirt on the complement of . We show that when supp(hi) ⊂eq with Σi hi = ∞ everywhere on , the operators βh1 ... βhn converge as n ∞ to the "balayage operator" = Σk=0∞ (I α)k Ic). These results are obtained in two ways: by a fairly simple matrix formalism, and by a more powerful tree formalism that corresponds to working with formal power series in which the matrix elements of α are treated as noncommuting indeterminates.