On the new universality class in structurally disordered n-vector model with long-range interactions

Abstract

We study a stability border of a region where nontrivial critical behaviour of an n-vector model with long-range power-law decaying interactions is induced by the presence of a structural disorder (e.g. weak quenched dilution). This border is given by the marginal dimension of the order parameter nc dependent on space dimension, d, and a control parameter of the interaction decay, σ, below which the model belongs to the new dilution-induced universality class. Exploiting the Harris criterion and recent field-theoretical renormalization group results for the pure model with long-range interactions we get nc as a three loop ε=2σ-d-expansion. We provide numerical values for nc applying series resummation methods. Our results show that not only the Ising systems (n=1) can belong to the new disorder-induced long-range universality class at d=2 and d=3.