Finite- Size Scaling of Correlation Function

Abstract

We propose the finite-size scaling of correlation function in a finite system near its critical point. At a distance r in the finite system with size L, the correlation function can be written as the product of | r|-(d-2+η) and its finite-size scaling function of variables r/L and tL1/, where t=(T-Tc)/Tc. The directional dependence of correlation function is nonnegligible only when | r| becomes compariable with L. This finite-size scaling of correlation function has been confirmed by correlation functions of the Ising model and the bond percolation in two-diemnional lattices, which are calculated by Monte Carlo simulation. We can use the finite-size scaling of correlation function to determine the critical point and the critical exponent η.