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 -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 dependent on space dimension, , and a control parameter of the interaction decay, , 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 as a three loop -expansion. We provide numerical values for applying series resummation methods. Our results show that not only the Ising systems () can belong to the new disorder-induced long-range universality class at and .
Cite
@article{arxiv.2208.07136,
title = {On the new universality class in structurally disordered $n$-vector model with long-range interactions},
author = {Dmytro Shapoval and Maxym Dudka and Yurij Holovatch},
journal= {arXiv preprint arXiv:2208.07136},
year = {2022}
}
Comments
13 pages, 1 figure, submitted to the Festschrift on the occasion of A. S. Davydov's 110th anniversary