Critical Dynamics: multiplicative noise fixed point in two dimensional systems

We study the critical dynamics of a real scalar field in two dimensions near a continuous phase transition. We have built up and solved Dynamical Renormalization Group equations at one-loop approximation. We have found that, different form the case $d\lesssim 4$, characterized by a Wilson-Fisher fixed point with dynamical critical exponent $z=2+ O(\epsilon^2)$, the critical dynamics is dominated by a novel multiplicative noise fixed point. The zeroes of the beta function depend on the stochastic prescription used to define the Wiener integrals. However, the critical exponents and the anomalous dimension do not depend on the prescription used. Thus, even though each stochastic prescription produces different dynamical evolutions, all of them are in the same universality class.