A new quantile regression model with application to human development index
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Publication:6661244
DOI10.1007/S00180-023-01413-WMaRDI QIDQ6661244
Edwin M. M. Ortega, Fábio Prataviera, Author name not available (Why is that?), Gauss M. Cordeiro
Publication date: 13 January 2025
Published in: Computational Statistics (Search for Journal in Brave)
Cites Work
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- Beta Regression for Modelling Rates and Proportions
- Semiparametric quantile regression using family of quantile-based asymmetric densities
- A quantile parametric mixed regression model for bounded response variables
- The Log-Lindley distribution as an alternative to the beta regression model with applications in insurance
- On the unit Burr-XII distribution with the quantile regression modeling and applications
- On the unit-Chen distribution with associated quantile regression and applications
- Simultaneous multiple non-crossing quantile regression estimation using kernel constraints
- Regression Quantiles
- Goodness of Fit and Related Inference Processes for Quantile Regression
- On the one parameter unit-Lindley distribution and its associated regression model for proportion data
- The unit-Weibull distribution as an alternative to the Kumaraswamy distribution for the modeling of quantiles conditional on covariates
- Regression analysis of variates observed on (0, 1): percentages, proportions and fractions
- Generalized Additive Models for Location, Scale and Shape
- The unit-inverse Gaussian distribution: A new alternative to two-parameter distributions on the unit interval
- An extended logit-normal regression with application to human development index data
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