Abstract
This paper reports algorithms for: (a) computing the coordinates of the vortices in two-dimensional Penrose tilings of arbitrary size; (b) Monte Carlo calculation of the threshold probability and cluster statistics in percolation on such tilings (quasilattices). Results of implementing these algorithms into programmes are given relative to maximum cluster density ( M), mean cluster size ( S), and the finite-size scaling plots for M and S obtained directly from the cumulative distribution function of clusters.
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