Abstract
Several zero-augmented models exist for estimation involving outcomes with large numbers of zero. Two of such models for handling count endpoints are zero-inflated and hurdle regression models. In this article, we apply the extreme ranked set sampling (ERSS) scheme in estimation using zero-inflated and hurdle regression models. We provide theoretical derivations showing superiority of ERSS compared to simple random sampling (SRS) using these zero-augmented models. A simulation study is also conducted to compare the efficiency of ERSS to SRS and lastly, we illustrate applications with real data sets.
Original language | English |
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Journal | Computational Statistics |
DOIs | |
State | Accepted/In press - 2024 |
Scopus Subject Areas
- Statistics and Probability
- Statistics, Probability and Uncertainty
- Computational Mathematics
Keywords
- Fisher’s information
- Hurdle regression model
- Ranked set sampling
- Zero-inflated regression model