Regenerative processes for Poisson zero polytopes

Let (Mt:t>0) be a Markov process of tessellations of ℝℓ, and let ( t:t>0) be the process of their zero cells (zero polytopes), which has the same distribution as the corresponding process for Poisson hyperplane tessellations. In the present paper we describe the stationary zero cell process (a...

Full description

Saved in:
Bibliographic Details
Published inAdvances in applied probability Vol. 50; no. 4; pp. 1217 - 1226
Main Authors Martínez, Servet, Nagel, Werner
Format Journal Article
LanguageEnglish
Published Cambridge, UK Cambridge University Press 01.12.2018
Applied Probability Trust
Subjects
Hyperplanes
Markov processes
Mathematical analysis
Original Article
Poisson distribution
Polytopes
Probability
Tessellation
Stochastic geometry
Primary 60D05
60J75
zero polytope
Bernoulli flow
37A35
random tessellation
STIT tessellation
37A25
Poisson hyperplane tessellation
regenerative process
60J25
Online AccessGet full text
ISSN0001-8678
1475-6064
DOI10.1017/apr.2018.57

Cover

More Information
Summary:Let (Mt:t>0) be a Markov process of tessellations of ℝℓ, and let ( t:t>0) be the process of their zero cells (zero polytopes), which has the same distribution as the corresponding process for Poisson hyperplane tessellations. In the present paper we describe the stationary zero cell process (at at:t∈ℝ),a>1, in terms of some regenerative structure and we show that it is a Bernoulli flow. An important application is to STIT tessellation processes.
Bibliography:ObjectType-Article-1
SourceType-Scholarly Journals-1
ObjectType-Feature-2
content type line 14
ISSN:0001-8678
1475-6064
DOI:10.1017/apr.2018.57