Daniel Hug, Günter Last, Wolfgang Weil
Published 2023-08-10Version 1
The topic of this survey are geometric functionals of a Boolean model (in Euclidean space) governed by a stationary Poisson process of convex grains. The Boolean model is a fundamental benchmark of stochastic geometry and continuum percolation. Moreover, it is often used to model amorphous connected structures in physics, materials science and biology. Deeper insight into the geometric and probabilistic properties of Boolean models and the dependence on the underlying Poisson process can be gained by considering various geometric functionals of Boolean models. Important examples are the intrinsic volumes and Minkowski tensors. We survey here local and asymptotic density (mean value) formulas as well as second order properties and central limit theorems.
Comments: This survey is a preliminary version of a chapter of the forthcoming book "Geometry and Physics of Spatial Random Systems'' edited and partially written by Daniel Hug, Michael Klatt, Klaus Mecke, Gerd Schr\"oder Turk and Wolfgang Weil
Second order properties and central limit theorems for geometric functionals of Boolean models
Boolean models in hyperbolic space
Concentration inequalities for measures of a Boolean model
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