Critical dynamics of non-conserved strongly anisotropic permutation symmetric three-vector model

Abstract

We explore, employing the renormalization-group theory, the critical scaling behavior of the permutation symmetric three-vector model that obeys non-conserving dynamics and has a relevant anisotropic perturbation which drives the system into a non-equilibrium steady state. We explicitly find the independent critical exponents with corrections up to two loops. They include the static exponents and η, the off equilibrium exponent η, the dynamic exponent z and the strong anisotropy exponent . We also express the other anisotropy exponents in terms of these.