Concentration inequalities for measures of a Boolean model
Abstract
We consider a Boolean model Z driven by a Poisson particle process η on a metric space Y. We study the random variable (Z), where is a (deterministic) measure on Y. Due to the interaction of overlapping particles, the distribution of (Z) cannot be described explicitly. In this note we derive concentration inequalities for (Z). To this end we first prove two concentration inequalities for functions of a Poisson process on a general phase space.
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