Monte Carlo study on Heisenberg model with local dipolar interaction

Abstract

Aharony and Fisher showed that non-local dipolar effects in magnetism destabilize the Heisenberg fixed point in real ferromagnets, leading to a new fixed point, called the dipolar fixed point. The non-perturbative nature of the new fixed point, however, has not been uncovered for many decades. Inspired by the recent understanding that the dipolar fixed point is scale-invariant but not conformal invariant, we perform the Monte Carlo simulation of the local Heisenberg-dipolar model on the lattice of 403 by introducing the local cost function parameterized by a parameter λ and study its critical exponents, which should become identical to the dipolar fixed point of Aharony and Fisher in the infinite coupling limit λ = ∞. We find that the critical exponents become noticeably different from those of the Heisenberg fixed point for a finite coupling constant λ=8 (e.g. =0.601(2)(+0-2) in the local Heisenberg-dipolar model while =0.712(1)(+3-0) in the Heisenberg model), and the spin correlation function has a feature that it becomes divergence-free, implying the lack of conformal invariance.

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