论文信息 - UNIVERSAL SCALING FUNCTIONS FOR SITE AND BOND PERCOLATIONS ON PLANAR LATTICES

UNIVERSAL SCALING FUNCTIONS FOR SITE AND BOND PERCOLATIONS ON PLANAR LATTICES

Universality and scaling are two important concepts in the theory of critical phenomena. It is generally believed that site and bond percolations on lattices of the same dimensions have the same set of critical exponents, but they have different scaling functions. In this paper, we briefly review our recent Monte Carlo results about universal scaling functions for site and bond percolation on planar lattices. We find that, by choosing an aspect ratio for each lattice and a very small number of non-universal metric factors, all scaled data of the existence probability Ep and the percolation probability P for site and bond percolations on square, plane triangular, and honeycomb lattices may fall on the same universal scaling functions. We also find that free and periodic boundary conditions share the same non-universal metric factors. When the aspect ratio of each lattice is reduced by the same factor, the non-universal metric factors remain the same. The implications of such results are discussed.

[1] Chin-Kun Hu. Site-bond-correlated percolation and a sublattice dilute Potts model at finite temperatures , 1984 .

[2] Chin-Kun Hu,et al. Percolation, clusters, and phase transitions in spin models , 1984 .

[3] Blöte,et al. Comment on "Histogram Monte Carlo renormalization group method for phase transition models without critical slowing down" , 1993, Physical review letters.

[4] Leo P. Kadanoff,et al. Scaling and universality in statistical physics , 1990 .

[5] R. Ziff,et al. Spanning probability in 2D percolation. , 1992, Physical review letters.

[6] Hu. Histogram Monte Carlo renormalization-group method for percolation problems. , 1992, Physical review. B, Condensed matter.

[7] Harvey Gould,et al. An introduction to computer simulation methods , 1988 .

[8] R. P. Langlands,et al. On the universality of crossing probabilities in two-dimensional percolation , 1992 .

[9] Vladimir Privman,et al. Finite Size Scaling and Numerical Simulation of Statistical Systems , 1990 .

[10] M. Fisher,et al. Universal critical amplitudes in finite-size scaling , 1984 .

[11] S. Redner,et al. Introduction To Percolation Theory , 2018 .

[12] Chen,et al. Universal scaling functions in critical phenomena. , 1995, Physical review letters.

[13] H. Stanley,et al. Introduction to Phase Transitions and Critical Phenomena , 1972 .