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    Title: 雙變量脆弱性韋伯迴歸模式之研究
    Authors: 余立德
    Yu, Li-Ta
    Contributors: 陳麗霞
    余立德
    Yu, Li-Ta
    Keywords: 雙變量脆弱性
    Weibull迴歸模式
    對數常態分配
    EM法則
    bivariate frailty
    Weibull regression model
    log-normal distribution
    EM algorithm
    Date: 1998
    Issue Date: 2016-04-21 09:55:08 (UTC+8)
    Abstract: 摘要
    Abstract
    Reference: 參考文獻
    [1] Aalen, O. O., (1988). "Heterogeneity in Survival Analysis",
    Statistics in medicine, vol. 7, p. 1121-1137.
    [2] Aalen, O. O., (1992). "Modeling Heterogeneity in Survival
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    [3] Clayton, D. G., (1978). "A Model for Association in Bivariate Life
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    Tendency in Chronic Disease Incidence", Biometrika, vol. 65, p.
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    [4] Clayton, D. G., and Cuzick, J., (1985). "Multivariate Associations of
    The Proportional Hazards Model", Journal of the Royal Statistical
    Society, Ser. A vol. 148, p. 82-108.
    [5] Clayton, D. G., (1991). "A Monte Carlo Method for Binary
    Inference in Frailty Models", Biometrics, vol. 47, p. 467-485.
    [6] Gail, M. H., Wieand, S. and Piantados, S., (1984). "Biased
    Estimates of Treatment Effect in Randomized Experiments with
    Nonlinear Regression and Omitted Covariates", Biometrika, vol. 71,
    p. 431-444.
    [7] Gilks, W. R., Best, N. G., Tan, K. K. C., (1995). "Adaptive Rejection
    Metropolis Sampling within Gibbs Sampling", Applied Statistics,
    vol. 44., p.455-472.
    [8] Hougaard, P., (1986). "Survival Models for Heterogeneous
    Populations Derived from Stable Distributions", Bimoetrika, vol. 73,
    p. 387-396.
    [9] Hougaard, P., (1986). "A Class of Multivariate Failure Time
    Distributions ", Bimoetrika, vol. 73, p. 671-678.
    [10] Huster, W. J., Brookmeyer, R., and Self,,S. G., (1989). "Modeling
    Paired Survival Data with Covariates", Biometrics, vol. 45, p. 145-
    156.
    [11] Klein, J. P., and Moeschberger, M. I., (1988). "Bounds on Net
    Survival Probabilities for Dependent Competing Risks",
    Biometrics, vol. 44 ,p. 529-538.
    [12] Lancaster, T., (1990). The Econometrics Analysis of Transition Data.
    CUP, Cambridge.
    [13] Lindley, D. V., and Singpurwalla, N. D., (1986). "Multivariate
    Distributions for the Life Lengths of Components of a System
    Sharing a Common Environment", Journal of Applied Probability,
    vol. 23, p. 418-431.
    [14] Mcgilchrist, A., and Aisbett, C. W., (1991). "Regression with Frailty
    in Survival Analysis", Biometrics, vol. 47, p. 461-466.
    [15] Pickles, A., and Crouchley, R., (1995). "A Comparison of Frailty
    Models for Multivariate Survival Data", Statistics in Medicine, vol.
    14, p. 1447-1461.
    [16] Wei, L. J., Lin, D. Y., and Weissfeld, L., (1989). "Regression
    Analysis of Multivariate Incomplete Failure Time Data by
    Modeling Marginal Distributions", Journal of the American
    Statistical Association, vol. 84, p. 1065-1073.
    [17] Wei, G. C. G., Tanner, M. A., (1990). "A Monte Carlo
    Implementation of the EM algorithm and the Poor Man`s Data
    Augmentation Algorithms", Journal of the American Statistical
    Association, vol. 85, p. 699-704.
    [18] Xue, X., (1995). Analysis of Survival Data under Heterogeneity:
    Univariate and Bivariate Frailty Models. Unpublished Ph.D. Thesis,
    School of Hygiene and Public Health, Johns Hopkins University.
    [19] 陳麗霞, (民84). "脆弱性Weibull迴歸模式之貝氏推論".國科
    會計畫, NSC-84-2415-H-004-006.
    Description: 碩士
    國立政治大學
    統計學系
    86354003
    Source URI: http://thesis.lib.nccu.edu.tw/record/#B2002001563
    Data Type: thesis
    Appears in Collections:[Department of Statistics] Theses

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