Abstract
Average measure simulation is almost always numerical methods of mathematical problem solution by means of random set generation and statistical estimations of their average geometrical characteristics. At present average measure simulation methods of random geometry of natural processes are the most developed. Average measure set and other average geometrical characteristics of random sets, introduced by the author, are intended for the description of average geometry of random sets in probability set systems. The idea of cell analysis, having appeared within the bounds of the random finite set theory, undoubtedly lies in interval mathematics' channel.
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