Limit laws for k-coverage of paths by a Markov-Poisson-Boolean model

Abstract

Let P := Xi,i >= 1 be a stationary Poisson point process in Rd, Ci,i >= 1 be a sequence of i.i.d. random sets in Rd, and Yit; t ≥ 0, i >= 1 be i.i.d. 0,1-valued continuous time stationary Markov chains. We define the Markov-Poisson-Boolean model Ct := Yit(Xi + Ci), i >= 1. Ct represents the coverage process at time t. We first obtain limit laws for k-coverage of an area at an arbitrary instant. We then obtain the limit laws for the k-coverage seen by a particle as it moves along a one-dimensional path.