Some Properties of Order Statistics When the Sample Size Is Random
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Publication:5704559
DOI10.1080/STA-200066382zbMath1080.62026MaRDI QIDQ5704559
Neeraj Misra, Asok K. Nanda, Prasanta Paul, Harshinder Singh
Publication date: 15 November 2005
Published in: Communications in Statistics - Theory and Methods (Search for Journal in Brave)
Inequalities; stochastic orderings (60E15) Order statistics; empirical distribution functions (62G30) Queueing theory (aspects of probability theory) (60K25)
Related Items (5)
A new stochastic order based on discrete Laplace transform and some ordering results of the order statistics ⋮ Partial Ordering and Aging Properties of Order Statistics When the Sample Size is Random: A Brief Review ⋮ Exact distribution of random order statistics and applications in risk management ⋮ A discrete distribution including the Poisson ⋮ On Relative Reversed Hazard Rate Order
Cites Work
- Unnamed Item
- Dispersivity and stochastic majorization
- On likelihood-ratio ordering of order statistics
- The hazard rate and the reversed hazard rate orders, with applications to order statistics
- ON PARTIAL ORDERINGS BETWEEN COHERENT SYSTEMS WITH DIFFERENT STRUCTURES
- Characteristic properties of order statistics based on random sample size from an exponential distribution
- ON THE DISTRIBUTION OF ORDER STATISTICS FOR A RANDOM SAMPLE SIZE
- ON THE DISTRIBUTIONS OF ORDER STATISTICS FOR A RANDOM SAMPLE SIZE
- Distribution of order statistics with random sample size
- Applications of the hazard rate ordering in reliability and order statistics
- Stochastic comparisons of random minima and maxima
- Some ideas and models in reliability theory
- The Reversed Hazard Rate Function
- On order statistics when the sample size has a binomial distribution
- On order statistics for random sample size
- On a New Class of "Contagious" Distributions, Applicable in Entomology and Bacteriology
- Stochastic comparisons of random minima and maxima from life distributions
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