Finite-Size Scaling and Power Law Relations for Dipol-Quadrupol Interaction on Blume-Emery-Griffiths Model

Abstract

The Blume-Emery-Griffiths model with the dipol-quadrupol interaction () has been simulated using a cellular automaton algorithm improved from the Creutz cellular automaton (CCA) on the face centered cubic (fcc) lattice. The finite-size scaling relations and the power laws of the order parameter (M) and the susceptibility () are proposed for the dipol-quadrupol interaction (). The dipol-quadrupol critical exponent δ has been estimated from the data of the order parameter (M) and the susceptibility (). The simulations have been done in the interval 0≤ =L/J≤ 0.01 for d=D/J=0, k=K/J=0 and h=H/J=0 parameter values on a face centered cubic (fcc) lattice with periodic boundary conditions. The results indicates that the effect of the parameter is similar to the external magnetic field (h). The critical exponent δ$ are in good agreement with the universal value (δh=5) of the external magnetic field.