Nonmonotonic External Field Dependence of the Magnetization in a Finite Ising Model: Theory and MC Simulation

Abstract

Using φ4 field theory and Monte Carlo (MC) simulation we investigate the finite-size effects of the magnetization M for the three-dimensional Ising model in a finite cubic geometry with periodic boundary conditions. The field theory with infinite cutoff gives a scaling form of the equation of state h/Mδ = f(hLβδ/, t/h1/βδ) where t=(T-Tc)/Tc is the reduced temperature, h is the external field and L is the size of system. Below Tc and at Tc the theory predicts a nonmonotonic dependence of f(x,y) with respect to x hLβδ/ at fixed y t/h1/β δ and a crossover from nonmonotonic to monotonic behaviour when y is further increased. These results are confirmed by MC simulation. The scaling function f(x,y) obtained from the field theory is in good quantitative agreement with the finite-size MC data. Good agreement is also found for the bulk value f(∞,0) at Tc.

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