Estimating moments of a selected Pareto population under asymmetric scale invariant loss function
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Publication:1706468
DOI10.1007/S00362-016-0758-7zbMath1393.62010OpenAlexW2279483276MaRDI QIDQ1706468
Riyadh Rustam Al-Mosawi, Shahjahan Khan
Publication date: 22 March 2018
Published in: Statistical Papers (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00362-016-0758-7
Pareto distributionadmissibilityBrewster-Zidek techniqueestimation following selectionrisk-unbiasedness
Point estimation (62F10) Statistical ranking and selection procedures (62F07) Admissibility in statistical decision theory (62C15)
Related Items (2)
Estimating the parameter of selected uniform population under the squared log error loss function ⋮ Estimating a function of scale parameter of an exponential population with unknown location under general loss function
Cites Work
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- Estimating the shape parameter of a Pareto distribution under restrictions
- Estimation after selection from exponential populations with unequal scale parameters
- Estimation of the parameter of the selected uniform population under the entropy loss function
- A note on unbiased estimation following selection
- Estimating parameters of a selected Pareto population
- Drop-the-losers design: binomial case
- Simultaneous estimation of Poisson means of the selected subset
- Reliability estimation of the selected exponential populations
- On estimating the mean of the selected normal population under the LINEX loss function
- Bootstrap corrections of treatment effect estimates following selection
- Improving on equivariant estimators
- Estimation of the shape parameter of a generalized Pareto distribution based on a transformation to Pareto distributed variables
- Estimation after selection from gamma populations with unequal known shape parameters
- On some inadmissibility results for the scale parameters of selected gamma populations
- Optimal rules and robust Bayes estimation of a gamma scale parameter
- On estimating the scale parameter of the selected gamma population under the scale invariant squared error loss function
- Average worth estimation of the selected subset of Poisson populations
- Extension of a Two-Stage Conditionally Unbiased Estimator of the Selected Population to the Bivariate Normal Case
- Observed Data Based Estimator and Both Observed Data and Prior Information Based Estimator Under Asymmetric Losses
- Bayesian Estimation and Prediction Using Asymmetric Loss Functions
- ON ESTIMATION FOLLOWING SELECTION FROM NONREGULAR DISTRIBUTIONS
- Estimation of the Scale Parameter of the Selected Gamma Population Under the Entropy Loss Function
- On a Theorem of Bahadur and Goodman
- A General Concept of Unbiasedness
- Impartial Decision Rules and Sufficient Statistics
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