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pro vyhledávání: '"Akcin, Haci Mustafa."'
Autor:
Akcin, Haci Mustafa.
Publikováno v:
unrestricted.
Thesis (M.S.)--Georgia State University, 2008.
Title from file title page. Xu Zhang, committee chair; Yichuan Zhao, Jiawei Liu, Yu-Sheng Hsu, committee members. Electronic text (51 p.) : digital, PDF file. Description based on contents viewed Ju
Title from file title page. Xu Zhang, committee chair; Yichuan Zhao, Jiawei Liu, Yu-Sheng Hsu, committee members. Electronic text (51 p.) : digital, PDF file. Description based on contents viewed Ju
Externí odkaz:
http://etd.gsu.edu/theses/available/etd-04182008-095207/
Autor:
Akcin, Haci Mustafa
Incompleteness is a major feature of time-to-event data. As one type of incompleteness, truncation refers to the unobservability of the time-to-event variable because it is smaller (or greater) than the truncation variable. A truncated sample always
Externí odkaz:
http://pqdtopen.proquest.com/#viewpdf?dispub=3562240
Autor:
Akcin, Haci Mustafa
Publikováno v:
Mathematics Theses.
Aalen’s additive hazards model has gained increasing attention in recently years because it model all covariate effects as time-varying. In this thesis, our goal is to explore the application of Aalen’s model in assessing treatment effect at a gi
Autor:
Akcin, Haci Mustafa
Publikováno v:
Mathematics Dissertations.
Incompleteness is a major feature of time-to-event data. As one type of incompleteness, truncation refers to the unobservability of the time-to-event variable because it is smaller (or greater) than the truncation variable. A truncated sample always
Autor:
Akcin, Haci Mustafa
Publikováno v:
Mathematics Dissertations.
Incompleteness is a major feature of time-to-event data. As one type of incompleteness, truncation refers to the unobservability of the time-to-event variable because it is smaller (or greater) than the truncation variable. A truncated sample always