Upper and lower bounds for the correlation ratio of order statistics from a sample without replacement
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Publication:2581798
DOI10.1016/j.jspi.2004.06.025zbMath1082.62042OpenAlexW2007120292MaRDI QIDQ2581798
Antonia Castaño-Martínez, Fernando López-Blázquez
Publication date: 10 January 2006
Published in: Journal of Statistical Planning and Inference (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jspi.2004.06.025
Inequalities; stochastic orderings (60E15) Measures of association (correlation, canonical correlation, etc.) (62H20) Sampling theory, sample surveys (62D05) Order statistics; empirical distribution functions (62G30)
Related Items (9)
Automatic differentiation and maximal correlation of order statistics from discrete parents ⋮ A simple method for obtaining the maximal correlation coefficient and related characterizations ⋮ Maximal correlation in a non-diagonal case ⋮ A discrete analogue of Terrell's characterization of rectangular distributions ⋮ Some counterexamples concerning maximal correlation and linear regression ⋮ Extreme variances of order statistics in dependent samples ⋮ Characterizations based on order statistics under sampling without replacement ⋮ A Note on the Upper Bound to Variance of the Sample Extreme from a Finite Population ⋮ Measures of association for nominal categorical variables
Cites Work
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- A characterization of rectangular distributions
- An extremal property of rectangular distributions
- Dependence between order statistics in samples from finite population and its application to ranked set sampling
- Bounds on expectation of order statistics from a finite population
- Bounds on expectations of \(L\)-statistics from without replacement samples
- An upper bound for the correlation ratio of records.
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