Coverage of space in Boolean models

Abstract

For a marked point process \(xi,Si)i≥ 1\ with \xi∈ :i≥ 1\ being a point process on ⊂eq Rd and \Si⊂eq Rd:i≥ 1\ being random sets consider the region C=i≥ 1(xi+Si). This is the covered region obtained from the Boolean model \(xi+Si):i≥ 1\. The Boolean model is said to be completely covered if ⊂eq C almost surely. If is an infinite set such that s+ ⊂eq for all s∈ (e.g. the orthant), then the Boolean model is said to be eventually covered if t+ ⊂eq C for some t almost surely. We discuss the issues of coverage when is Rd and when is [0,∞)d.

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