Dimensional reduction and its breakdown in the driven random field O(N) model

Abstract

The critical behavior of the random field O(N) model driven at a uniform velocity is investigated at zero-temperature. From naive phenomenological arguments, we introduce a dimensional reduction property, which relates the large-scale behavior of the D-dimensional driven random field O(N) model to that of the (D-1)-dimensional pure O(N) model. This is an analogue of the dimensional reduction property in equilibrium cases, which states that the large-scale behavior of D-dimensional random field models is identical to that of (D-2)-dimensional pure models. However, the dimensional reduction property breaks down in low enough dimensions due to the presence of multiple meta-stable states. By employing the non-perturbative renormalization group approach, we calculate the critical exponents of the driven random field O(N) model near three-dimensions and determine the range of N in which the dimensional reduction breaks down.