Mappings between reaction-diffusion and kinetically constrained systems: A+A ↔ A and the Fredrickson-Andersen model have upper critical dimension d c = 2

Abstract

We present an exact mapping between two simple spin models: the Fredrickson-Andersen (FA) model and a model of annihilating random walks with spontaneous creation from the vacuum, A + A ↔ 0. We discuss the geometric structure of the mapping and its consequences for symmetries of the models. Hence we are able to show that the upper critical dimension of the FA model is two, and that critical exponents are known exactly in all dimensions. These conclusions also generalize to a mapping between A + A ↔ 0 and the reaction-diffusion system in which the reactions are branching and coagulation, A + A ↔ A. We discuss the relation of our analysis to earlier work, and explain why the models considered do not fall into the directed percolation universality class. © IOP Publishing Ltd and SISSA.