Frequency regulators for the nonperturbative renormalization group: A general study and the model A as a benchmark

Abstract

We derive the necessary conditions for implementing a regulator that depends on both momentum and frequency in the nonperturbative renormalization group flow equations of out-of-equilibrium statistical systems. We consider model A as a benchmark and compute its dynamical critical exponent z. This allows us to show that frequency regulators compatible with causality and the fluctuation-dissipation theorem can be devised. We show that when the Principle of Minimal Sensitivity (PMS) is employed to optimize the critical exponents η, and z, the use of frequency regulators becomes necessary to make the PMS a self-consistent criterion.