Fractal Dimension of 3-Blocks in 4d, 5d, and 6d Percolation Systems

Abstract

Using Monte Carlo simulations we study the distributions of the 3-block mass N3 in 4d, 5d, and 6d percolation systems. Because the probability of creating large 3-blocks in these dimensions is very small, we use a ``go with the winners'' method of statistical enhancement to simulate configurations having probability as small as 10-30. In earlier work, the fractal dimensions of 3-blocks, d3, in 2d and 3d were found to be 1.20 0.1 and 1.15 0.1, respectively, consistent with the possibility that the fractal dimension might be the same in all dimensions. We find that the fractal dimension of 3-blocks decreases rapidly in higher dimensions, and estimate d3=0.7 0.2 (4d) and 0.5 0.2 (5d). At the upper critical dimension of percolation, dc=6, our simulations are consistent with d3=0 with logarithmic corrections to power-law scaling.

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