Fiducial predictive densities and econometric duration analysis

Fiducial predictive densities and econometric duration analysis

In this article, we propose using fiducial predictive density (FPD) as a density estimate, which leads naturally to estimators of survivor and hazard functions and provides a simple way of constructing shortest prediction intervals. This approach is studied in detail in the context of two flexible d...

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Main Author: YANG, Zhenlin
Format: text
Language:English
Published: Institutional Knowledge at Singapore Management University 2003
Subjects:
Bayesian correspondence
Censored data
Fiducial prediction
Hazard estimate
Shortestprediction interval
Survivor function
Trans-exponential
Trans-normal
Econometrics
Online Access:https://ink.library.smu.edu.sg/soe_research/2063
https://ink.library.smu.edu.sg/context/soe_research/article/3062/viewcontent/Yang2003Fiducial.pdf
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spelling sg-smu-ink.soe_research-30622017-08-31T02:58:21Z Fiducial predictive densities and econometric duration analysis YANG, Zhenlin In this article, we propose using fiducial predictive density (FPD) as a density estimate, which leads naturally to estimators of survivor and hazard functions and provides a simple way of constructing shortest prediction intervals. This approach is studied in detail in the context of two flexible duration models proposed in this paper, namely the trans-normal and trans-exponential families, by presenting the FPDs, their basic properties, their Bayesian correspondence and their applications in econometric duration analysis. Empirical evidences show that the FPD method provides better estimates of survivor and hazard functions, particularly the latter, than does the usual maximum likelihood method. It provides shortest prediction intervals for a future duration, which can be much shorter than the regular equitailed prediction intervals. The trans-normal model has an easy extension to include exogenous variables, whereas the trans-exponential model allows for the analysis of censored data. Finally, when the transformation function is indexed by unknown parameter(s), the FPD method still provides asymptotically correct inference when the transformation parameter is replaced by its estimator. 2003-12-01T08:00:00Z text application/pdf https://ink.library.smu.edu.sg/soe_research/2063 https://ink.library.smu.edu.sg/context/soe_research/article/3062/viewcontent/Yang2003Fiducial.pdf http://creativecommons.org/licenses/by-nc-nd/4.0/ Research Collection School Of Economics eng Institutional Knowledge at Singapore Management University Bayesian correspondence Censored data Fiducial prediction Hazard estimate Shortestprediction interval Survivor function Trans-exponential Trans-normal Econometrics
institution Singapore Management University
building SMU Libraries
continent Asia
country Singapore
Singapore
content_provider SMU Libraries
collection InK@SMU
language English
topic Bayesian correspondence
Censored data
Fiducial prediction
Hazard estimate
Shortestprediction interval
Survivor function
Trans-exponential
Trans-normal
Econometrics
spellingShingle Bayesian correspondence
Censored data
Fiducial prediction
Hazard estimate
Shortestprediction interval
Survivor function
Trans-exponential
Trans-normal
Econometrics
YANG, Zhenlin
Fiducial predictive densities and econometric duration analysis
description In this article, we propose using fiducial predictive density (FPD) as a density estimate, which leads naturally to estimators of survivor and hazard functions and provides a simple way of constructing shortest prediction intervals. This approach is studied in detail in the context of two flexible duration models proposed in this paper, namely the trans-normal and trans-exponential families, by presenting the FPDs, their basic properties, their Bayesian correspondence and their applications in econometric duration analysis. Empirical evidences show that the FPD method provides better estimates of survivor and hazard functions, particularly the latter, than does the usual maximum likelihood method. It provides shortest prediction intervals for a future duration, which can be much shorter than the regular equitailed prediction intervals. The trans-normal model has an easy extension to include exogenous variables, whereas the trans-exponential model allows for the analysis of censored data. Finally, when the transformation function is indexed by unknown parameter(s), the FPD method still provides asymptotically correct inference when the transformation parameter is replaced by its estimator.
format text
author YANG, Zhenlin
author_facet YANG, Zhenlin
author_sort YANG, Zhenlin
title Fiducial predictive densities and econometric duration analysis
title_short Fiducial predictive densities and econometric duration analysis
title_full Fiducial predictive densities and econometric duration analysis
title_fullStr Fiducial predictive densities and econometric duration analysis
title_full_unstemmed Fiducial predictive densities and econometric duration analysis
title_sort fiducial predictive densities and econometric duration analysis
publisher Institutional Knowledge at Singapore Management University
publishDate 2003
url https://ink.library.smu.edu.sg/soe_research/2063
https://ink.library.smu.edu.sg/context/soe_research/article/3062/viewcontent/Yang2003Fiducial.pdf
_version_ 1770573647893757952

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