Goldstone mode singularities in O(n) models

Abstract

Monte Carlo (MC) analysis of the Goldstone mode singularities for the transverse and the longitudinal correlation functions, behaving as G(k) ak-λ and G(k) bk-λ in the ordered phase at k -> 0, is performed in the three-dimensional O(n) models with n=2, 4, 10. Our aim is to test some challenging theoretical predictions, according to which the exponents λ and λ are non-trivial (3/2<λ<2 and 0<λ<1 in three dimensions) and the ratio bM2/a2 (where M is a spontaneous magnetization) is universal. The trivial standard-theoretical values are λ=2 and λ=1. Our earlier MC analysis gives λ=1.955 0.020 and λ about 0.9 for the O(4) model. A recent MC estimation of λ, assuming corrections to scaling of the standard theory, yields λ = 0.69 0.10 for the O(2) model. Currently, we have performed a similar MC estimation for the O(10) model, yielding λ = 1.9723(90). We have observed that the plot of the effective transverse exponent for the O(4) model is systematically shifted down with respect to the same plot for the O(10) model by λ = 0.0121(52). It is consistent with the idea that 2-λ decreases for large n and tends to zero at n -> ∞. We have also verified and confirmed the expected universality of bM2/a2 for the O(4) model, where simulations at two different temperatures (couplings) have been performed.