A general linear birth and growth model

A general linear birth and growth model

We consider a birth and growth model where points (`seeds') arrive on a line randomly in time and space and proceed to `cover' the line by growing at a uniform rate in both directions until an opposing branch is met; points which arrive on covered parts of the line do not contribute to the...

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Veröffentlicht in:Advances in Applied Probability 2000, Vol.32 (4), p.1027-1050
Hauptverfasser: Quine, M. P., Szczotka, W.
Format: Artikel
Sprache:eng
Schlagworte:
60F17
60G55
Birth and growth on R
limit results
number of seeds
stationary simple point process
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Beschreibung
Zusammenfassung:We consider a birth and growth model where points (`seeds') arrive on a line randomly in time and space and proceed to `cover' the line by growing at a uniform rate in both directions until an opposing branch is met; points which arrive on covered parts of the line do not contribute to the process. Existing results concerning the number of seeds assume that points arrive according to a Poisson process, homogeneous on the line, but possibly inhomogeneous in time. We derive results under less stringent assumptions, namely that the arrival process be a stationary simple point process.
ISSN:1475-6064
DOI:10.1239/aap/1013540346