Ergodicity Properties of Stress Release, Repairable System and Workload Models

In this paper we derive some of the main ergodicity properties of a class of Markov renewal processes and the associated marked point processes. This class represents a generic model of applied probability and is of importance in earthquake modeling, reliability theory and queueing.

Bibliographische Detailangaben
Veröffentlicht in:	Advances in Applied Probability. - Applied Probability Trust. - 36(2004), 2, Seite 471-498
1. Verfasser:	Last, Günter (VerfasserIn)
Format:	Online-Aufsatz
Sprache:	English
Veröffentlicht:	2004
Zugriff auf das übergeordnete Werk:	Advances in Applied Probability
Schlagworte:	Markov process Point process Ergodicity Stochastic intensity Palm probability Reliability theory Stress release process Repairable system Work-modulated queueing system Applied sciences mehr... Mathematics Business Biological sciences Philosophy


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520			\|a In this paper we derive some of the main ergodicity properties of a class of Markov renewal processes and the associated marked point processes. This class represents a generic model of applied probability and is of importance in earthquake modeling, reliability theory and queueing.
540			\|a Copyright 2004 Applied Probability Trust
650		4	\|a Markov process
650		4	\|a Point process
650		4	\|a Ergodicity
650		4	\|a Stochastic intensity
650		4	\|a Palm probability
650		4	\|a Reliability theory
650		4	\|a Stress release process
650		4	\|a Repairable system
650		4	\|a Work-modulated queueing system
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