Title :
The asymptotic distribution of the number of failures of a separately maintained system
Author :
Baxter, Laurence A. ; Marlow, Norman A.
Author_Institution :
Dept. of Appl. Math. & Stat., State Univ. of New York, Stony Brook, NY, USA
Abstract :
Markov models are commonly used to analyze the reliability of complex systems with separately maintained components that operate and are restored independently. In such a model, a system failure occurs whenever a given class of states is entered from outside the class. This paper derives expressions for the expected value and variance of the number of system failures during a given time interval together with their asymptotic forms. Using these results, a central limit theorem for regenerative processes is applied to show that the number of system failures is asymptotically normally distributed. As an application of the results, a telecommunications system is considered, e.g., a switching system, of n components modeled by a binary structure
Keywords :
Markov processes; failure analysis; maintenance engineering; stochastic processes; telecommunication network reliability; telecommunication switching; Markov models; asymptotic distribution; central limit theorem; complex systems; failures; regenerative processes; reliability; separately maintained system; switching system; telecommunications system; variance; Analysis of variance; Failure analysis; Independent component analysis; Maintenance; Mathematical model; Mathematics; Statistical analysis; Statistical distributions; Switching systems; Telecommunications;
Conference_Titel :
Communications, 1995. ICC '95 Seattle, 'Gateway to Globalization', 1995 IEEE International Conference on
Conference_Location :
Seattle, WA
Print_ISBN :
0-7803-2486-2
DOI :
10.1109/ICC.1995.525159
