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dc.contributor.author江村剛志en_US
dc.contributor.authorTakeshi Emuraen_US
dc.contributor.author王維菁en_US
dc.contributor.authorWeijing Wangen_US
dc.date.accessioned2014-12-12T02:57:49Z-
dc.date.available2014-12-12T02:57:49Z-
dc.date.issued2006en_US
dc.identifier.urihttp://140.113.39.130/cdrfb3/record/nctu/#GT009326805en_US
dc.identifier.urihttp://hdl.handle.net/11536/79305-
dc.description.abstractIn this dissertation, we investigate the dependent relationship between two failure time variables which have a truncation relationship. Chaieb et al. (2006) considered semi-parametric framework under a “semi-survival” Archimedean-copula assumption and proposed estimating functions to estimate the association parameter, the truncation probability and the marginal functions. In the first project, we adopt the same model assumption but propose different estimating methods. In particular we extend Clayton’s conditional likelihood approach (1978) to dependent truncation data for estimation of the association parameter. For marginal estimation, we propose a recursive algorithm and derive explicit formula to obtain the solution. The functional delta method is applied to establish large sample properties which can handle more general estimating functions than the U-statistic approach. Simulations are performed and the proposed methods are applied to the transfusion-related AIDS data for illustrative purposes. Quasi-independence has been assumed by many inference methods for analyzing truncation data. By forming a series of tables, we also propose a weighted log-rank statisitcs for testing this assumption, which is our second project. Power improvement is possible by choosing an appropriate weight function. Here, we derive score tests when the dependence structure under the alternative hypothesis is specified semiparametrically. Asymptotic analysis and simulations are used to justify our proposed methods.zh_TW
dc.description.abstractIn this dissertation, we investigate the dependent relationship between two failure time variables which have a truncation relationship. Chaieb et al. (2006) considered semi-parametric framework under a “semi-survival” Archimedean-copula assumption and proposed estimating functions to estimate the association parameter, the truncation probability and the marginal functions. In the first project, we adopt the same model assumption but propose different estimating methods. In particular we extend Clayton’s conditional likelihood approach (1978) to dependent truncation data for estimation of the association parameter. For marginal estimation, we propose a recursive algorithm and derive explicit formula to obtain the solution. The functional delta method is applied to establish large sample properties which can handle more general estimating functions than the U-statistic approach. Simulations are performed and the proposed methods are applied to the transfusion-related AIDS data for illustrative purposes. Quasi-independence has been assumed by many inference methods for analyzing truncation data. By forming a series of tables, we also propose a weighted log-rank statisitcs for testing this assumption, which is our second project. Power improvement is possible by choosing an appropriate weight function. Here, we derive score tests when the dependence structure under the alternative hypothesis is specified semiparametrically. Asymptotic analysis and simulations are used to justify our proposed methods.en_US
dc.language.isoen_USen_US
dc.subjectsemi-survivalzh_TW
dc.subjectArchimedean-copulazh_TW
dc.subjectconditional likelihoodzh_TW
dc.subjecttruncationzh_TW
dc.subjectlog-rank statisitcszh_TW
dc.subjectscore testzh_TW
dc.subjectsemi-survivalen_US
dc.subjectArchimedean-copulaen_US
dc.subjectconditional likelihooden_US
dc.subjecttruncationen_US
dc.subjectlog-rank statisitcsen_US
dc.subjectscore testen_US
dc.title相依截切資料的統計推論zh_TW
dc.titleStatistical Inference for Dependent Truncation Dataen_US
dc.typeThesisen_US
dc.contributor.department統計學研究所zh_TW
Appears in Collections:Thesis


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