Title of article
Heavy-tailed longitudinal data modeling using copulas
Author/Authors
Sun، نويسنده , , Jiafeng and Frees، نويسنده , , Edward W. and Rosenberg، نويسنده , , Marjorie A.، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2008
Pages
14
From page
817
To page
830
Abstract
In this paper, we consider “heavy-tailed” data, that is, data where extreme values are likely to occur. Heavy-tailed data have been analyzed using flexible distributions such as the generalized beta of the second kind, the generalized gamma and the Burr. These distributions allow us to handle data with either positive or negative skewness, as well as heavy tails. Moreover, it has been shown that they can also accommodate cross-sectional regression models by allowing functions of explanatory variables to serve as distribution parameters.
jective of this paper is to extend this literature to accommodate longitudinal data, where one observes repeated observations of cross-sectional data. Specifically, we use copulas to model the dependencies over time, and heavy-tailed regression models to represent the marginal distributions. We also introduce model exploration techniques to help us with the initial choice of the copula and a goodness-of-fit test of elliptical copulas for model validation. In a longitudinal data context, we argue that elliptical copulas will be typically preferred to the Archimedean copulas. To illustrate our methods, Wisconsin nursing homes utilization data from 1995 to 2001 are analyzed. These data exhibit long tails and negative skewness and so help us to motivate the need for our new techniques. We find that time and the nursing home facility size as measured through the number of beds and square footage are important predictors of future utilization. Moreover, using our parametric model, we provide not only point predictions but also an entire predictive distribution.
Keywords
primaryI110 , secondaryC200 , healthcare costs , Predictive modeling
Journal title
Insurance Mathematics and Economics
Serial Year
2008
Journal title
Insurance Mathematics and Economics
Record number
1543510
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