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A general family of distributions for longitudinal dependence with special reference to event histories
Author(s) -
Lindsey J. K.
Publication year - 2001
Publication title -
statistics in medicine
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 1.996
H-Index - 183
eISSN - 1097-0258
pISSN - 0277-6715
DOI - 10.1002/sim.934
Subject(s) - event (particle physics) , laplace transform , gamma distribution , multivariate statistics , distribution (mathematics) , pareto principle , statistics , mathematics , econometrics , computer science , statistical physics , mathematical analysis , physics , quantum mechanics
Event histories play an increasingly important role in medical studies. Examples include times between recurrences of tumours, as with bladder cancer, and between repeated infections, as with chronic granulotomous disease. A general method for generating new distributions is proposed by introducing an intensity function into a density. This procedure yields, as special cases, several distributions already proposed in the literature. The families of distributions based on the Pareto distribution are of particular interest for event history analysis because of their relationship to the Laplace transform of a gamma distribution. They can yield multivariate distributions, with longitudinal (serial) dependence by a procedure similar to updating in the Kalman filter and with uniform dependence in a similar way to copulas. For longitudinal dependence, several such updating procedures are proposed. Copyright © 2001 John Wiley & Sons, Ltd.