Regenerative processes for Poisson zero polytopes
Abstract
Let (Mt: t > 0) be a Markov process of tessellations of R and ( Ct:\, t > 0) the process of their zero cells (zero polytopes) which has the same distribution as the corresponding process for Poisson hyperplane tessellations. Let a>1. Here we describe the stationary zero cell process (at Cat:\, t∈ R) in terms of some regenerative structure and we prove that it is a Bernoulli flow. An important application are the STIT tessellation processes.
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