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Title: Simple Point Process -- from Wolfram MathWorld

Open Graph Title: Simple Point Process -- from Wolfram MathWorld

X Title: Simple Point Process -- from Wolfram MathWorld

Description: A simple point process (or SPP) is an almost surely increasing sequence of strictly positive, possibly infinite random variables which are strictly increasing as long as they are finite and whose almost sure limit is infty. Symbolically, then, an SPP is a sequence T=(T_n)_(n>=1) of R^^_0-valued random variables defined on a probability space (Omega,F,P) such that 1. P(0infty)T_n=infty)=1. ...

Open Graph Description: A simple point process (or SPP) is an almost surely increasing sequence of strictly positive, possibly infinite random variables which are strictly increasing as long as they are finite and whose almost sure limit is infty. Symbolically, then, an SPP is a sequence T=(T_n)_(n>=1) of R^^_0-valued random variables defined on a probability space (Omega,F,P) such that 1. P(0infty)T_n=infty)=1. ...

X Description: A simple point process (or SPP) is an almost surely increasing sequence of strictly positive, possibly infinite random variables which are strictly increasing as long as they are finite and whose almost sure limit is infty. Symbolically, then, an SPP is a sequence T=(T_n)_(n>=1) of R^^_0-valued random variables defined on a probability space (Omega,F,P) such that 1. P(0infty)T_n=infty)=1. ...

Opengraph URL: https://mathworld.wolfram.com/SimplePointProcess.html

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DC.TitleSimple Point Process
DC.CreatorWeisstein, Eric W.
DC.DescriptionA simple point process (or SPP) is an almost surely increasing sequence of strictly positive, possibly infinite random variables which are strictly increasing as long as they are finite and whose almost sure limit is infty. Symbolically, then, an SPP is a sequence T=(T_n)_(n>=1) of R^^_0-valued random variables defined on a probability space (Omega,F,P) such that 1. P(0infty)T_n=infty)=1. ...
DC.Date.Created2014-05-30
DC.Subject60
DC.RightsCopyright 1999-2026 Wolfram Research, Inc. See https://mathworld.wolfram.com/about/terms.html for a full terms of use statement.
DC.Formattext/html
DC.Identifierhttps://mathworld.wolfram.com/SimplePointProcess.html
DC.Languageen
DC.PublisherWolfram Research, Inc.
DC.Relation.IsPartOfhttps://mathworld.wolfram.com/
DC.TypeText
Last-Modified2014-05-30
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