Distribution Theory of Runs: A Markov Chain Approach

Distribution Theory of Runs: A Markov Chain Approach

The statistics of the number of success runs in a sequence of Bernoulli trials have been used in many statistical areas. For almost a century, even in the simplest case of independent and identically distributed Bernoulli trials, the exact distributions of many run statistics still remain unknown. D...

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Veröffentlicht in:Journal of the American Statistical Association 1994-09, Vol.89 (427), p.1050-1058
Hauptverfasser: Fu, J. C., Koutras, M. V.
Format: Artikel
Sprache:eng
Schlagworte:
Bernoulli Hypothesis
Bernoulli random variables
Binomial distributions
Distribution theory
Exact sciences and technology
Markov analysis
Markov chains
Mathematical moments
Mathematics
Matrices
Patterns
Probabilities
Probability and statistics
Quality assurance
Random variables
Reliability
Sciences and techniques of general use
Statistical theories
Statistics
Theory and Methods
Transition probabilities
Transition probability matrix
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Beschreibung
Zusammenfassung:The statistics of the number of success runs in a sequence of Bernoulli trials have been used in many statistical areas. For almost a century, even in the simplest case of independent and identically distributed Bernoulli trials, the exact distributions of many run statistics still remain unknown. Departing from the traditional combinatorial approach, in this article we present a simple unified approach for the distribution theory of runs based on a finite Markov chain imbedding technique. Our results cover not only the identical Bernoulli trials, but also the nonidentical Bernoulli trials. As a byproduct, our results also yield the exact distribution of the waiting time for the mth occurrence of a specific run.
ISSN:0162-1459
1537-274X
DOI:10.1080/01621459.1994.10476841