Size dependence of the largest distance between random points
Abstract
A set of N points is chosen randomly in a D-dimensional volume V=aD, with periodic boundary conditions. For each point i, its distance di is found to its nearest neighbour. Then, the maximal value is found, dmax=max(di, i=1,...,N). Our numerical calculations indicate, that when the density N/V=const, dmax scales with the linear system size as d2max aφ, with φ=0.240.04 for D=1,2,3,4.
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