caryportraits.com




Main / Transportation / Bijective Point Maps, Point-Stationarity and Characterization of Palm Measures

Bijective Point Maps, Point-Stationarity and Characterization of Palm Measures

Bijective Point Maps, Point-Stationarity and Characterization of Palm Measures

Name: Bijective Point Maps, Point-Stationarity and Characterization of Palm Measures

File size: 804mb

Language: English

Rating: 1/10

Download

 

Bijective Point Maps, Point-Stationarity and Characterization of Palm Measures [ Matthias Heveling] on caryportraits.com *FREE* shipping on qualifying offers. Bijective Point Maps, Point-stationarity and Characterization of Palm Measures. Front Cover. Matthias Heveling. Univ.-Verlag Karlsruhe, - 82 pages. is generating (by suitable shifts) a bijective mapping on N. Mecke [Math. Nachr 65 () ] proved that the Palm measure of N is point- stationary in the.

The paper considers a stationary point process N in ℝd. A point-map picks a point of N in a measurable way. It is called bijective [Thorisson, H. (). Coupling. Our first aim in this paper is to characterize Palm measures of stationary point processes through point stationarity. This generalizes earlier results from the. 11 Jun Palm measures and point stationarity Invariance properties of Palm measures. 4. . construction of a nested family of bijective point maps.

The Palm measure P0 of a σ-finite stationary measure P is the σ-finite measure on In Section 2 we introduce bijective point maps and bijective point shifts on N . Buy Bijective Point Maps, Point-Stationarity and Characterization of Palm Measures by Matthias Heveling (ISBN: ) from Amazon's Book Store. 13 Jan nuity properties, it then provides a solution to this invariant measure problem. when F is bijective, the point-map-probability of Φ boils down to the Key words: Point process, Stationarity, Palm probability, Point-shift, Point-. It is called bijective if it is generating (by suitable shifts) a bijective mapping on $N $. Mecke proved that the Palm measure of $N$ is point--stationary in the sense. weighted transport-kernels: basic invariance properties of Palm measures are presented in classical theorem that the Palm distribution of a stationary point process . point process on G is a measurable mapping ξ:Ω → N. A random measure .. is, a bijective point-allocation for ξ satisfying τ(ω,τ∗(ω,s)) = τ∗(ω,τ(ω, s)).

More:

В© 2018 caryportraits.com - all rights reserved!