Dynamics of non-Gaussian fluctuations in model A

Abstract

Motivated by the experimental search for the QCD critical point we perform simulations of a stochastic field theory with purely relaxational dynamics (model A). We verify the expected dynamic scaling of correlation functions. Using a finite size scaling analysis we obtain the dynamic critical exponent z=2.026(56). We investigate time dependent correlation functions of higher moments Mn(t) of the order parameter M(t) for n=1,2,3,4. We obtain dynamic scaling with the same critical exponent z for all n, but the relaxation constant depends on n. We also study the relaxation of Mn(t) after a quench, where the simulation is initialized in the high temperature phase, and the dynamics is studied at the critical temperature Tc. We find that the evolution does not follow simple scaling with the dynamic exponent z, and that it involves an early time rise followed by late stage relaxation.