Cubic fixed point in three dimensions: Monte Carlo simulations of the φ4 model on the lattice

Abstract

We study the cubic fixed point for N=3 and 4 by using finite size scaling applied to data obtained from Monte Carlo simulations of the N-component φ4 model on the simple cubic lattice. We generalize the idea of improved models to a two-parameter family of models. The two-parameter space is scanned for the point, where the amplitudes of the two leading corrections to scaling vanish. To this end, a dimensionless quantity is introduced that monitors the breaking of the O(N)-invariance. For N=4, we determine the correction exponents ω1=0.763(24) and ω2=0.082(5). In the case of N=3, we obtain Y4=0.0142(6) for the RG-exponent of the cubic perturbation at the O(3)-invariant fixed point, while the correction exponent ω2=0.0133(8) at the cubic fixed point. Simulations close to the improved point result in the estimates =0.7202(7) and η=0.0371(2) of the critical exponents of the cubic fixed point for N=4. For N=3, at the cubic fixed point, the O(3)-symmetry is only mildly broken and the critical exponents differ only by little from those of the O(3)-invariant fixed point. We find -0.00001 ηcubic- ηO(3) 0.00007 and cubic-O(3) =-0.00061(10).

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