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MARC 21

Statistical Models Based on Counting Processes
Tag Description
020$a9781461243489$9978-1-4612-4348-9
082$a519.5$223
099$aOnline resource: Springer
100$aAndersen, Per Kragh.
245$aStatistical Models Based on Counting Processes$h[EBook] /$cby Per Kragh Andersen, Ørnulf Borgan, Richard D. Gill, Niels Keiding.
260$aNew York, NY :$bSpringer US,$c1993.
300$aXI, 784 p.$bonline resource.
336$atext$btxt$2rdacontent
337$acomputer$bc$2rdamedia
338$aonline resource$bcr$2rdacarrier
440$aSpringer Series in Statistics,$x0172-7397
505$aI. Introduction -- I.1 General Introduction to the Book -- I.2 Brief Survey of the Development of the Subject -- I.3 Presentation of Practical Examples -- II. The Mathematical Background -- II.1 An Informal Introduction to the Basic Concepts -- II.2 Preliminaries: Processes, Filtrations, and Stopping Times -- II.3 Martingale Theory -- II.4 Counting Processes -- II.5 Limit Theory -- II.6 Product-Integration and Markov Processes -- II.7 Likelihoods and Partial Likelihoods for Counting Processes -- II.8 The Functional Delta-Method -- II.9 Bibliographic Remarks -- III. Model Specification and Censoring -- III.1 Examples of Counting Process models for Complete Life History Data. The Multiplicative Intensity Model -- III.2 Right-Censoring -- III. 3 Left-Truncation -- III.4 General Censorship, Filtering, and Truncation -- III.5 Partial Model Specification. Time-Dependent Covariates -- III.6 Bibliographic Remarks -- IV. Nonparametric Estimation -- IV. 1 The Nelson-Aalen estimator -- IV.2 Smoothing the Nelson-Aalen Estimator -- IV.3 The Kaplan-Meier Estimator -- IV.4 The Product-Limit Estimator for the Transition Matrix of a Nonhomogeneous Markov Process -- IV.5 Bibliographic Remarks -- V. Nonparametric Hypothesis Testing -- V.1 One-Sample Tests -- V.2 k-Sample Tests -- V.3 Other Linear Nonparametric Tests -- V.4 Using the Complete Test Statistic Process -- V.5 Bibliographic Remarks -- VI. Parametric Models -- VI.1 Maximum Likelihood Estimation -- VI.2 M-Estimators -- VI.3 Model Checking -- VI.4 Bibliographic Remarks -- VII. Regression Models -- VII.1 Introduction. Regression Model Formulation -- VII.2 Semiparametric Multiplicative Hazard Models -- VII.3 Goodness-of-Fit Methods for the Semiparametric Multiplicative Hazard Model -- VII.4 Nonparametric Additive Hazard Models -- VII.5 Other Non- and Semi-parametric Regression Models -- VIL6 Parametric Regression Models -- VII.7 Bibliographic Remarks -- VIII. Asymptotic Efficiency -- VIII.1 Contiguity and Local Asymptotic Normality -- VIII.2 Local Asymptotic Normality in Counting Process Models -- VIII.3 Infinite-dimensional Parameter Spaces: the General Theory -- VIII.4 Semiparametric Counting Process Models -- VIII.5 Bibliographic Remarks -- IX. Frailty Models -- IX.1 Introduction -- IX.2 Model Construction -- IX. 3 Likelihoods and Intensities -- IX.4 Parametric and Nonparametric Maximum Likelihood Estimation with the EM-Algorithm -- IX.5 Bibliographic Remarks -- X. Multivariate Time Scales -- X.1 Examples of Several Time Scales -- X.2 Sequential Analysis of Censored Survival Data with Staggered Entry -- X.3 Nonparametric Estimation of the Multivariate Survival Function -- X.4 Bibliographic Remarks -- Appendix The Melanoma Survival Data and Standard Mortality Tables for the Danish Population 1971–75 -- References -- Author Index.
520$aModern survival analysis and more general event history analysis may be effectively handled in the mathematical framework of counting processes, stochastic integration, martingale central limit theory and product integration. This book presents this theory, which has been the subject of an intense research activity during the past one-and-a- half decades. The exposition of the theory is integrated with careful presentation of many practical examples, almost exclusively from the authors' own experience, with detailed numerical and graphical illustrations. Statistical Models Based on Counting Processes may be viewed as a research monograph for mathematical statisticians and biostatisticians, although almost all methods are given in concrete detail to be used in practice by other mathematically oriented researchers studying event histories (demographers, econometricians, epidemiologists, actuarial mathematicians, reliabilty engineers and biologists). Much of the material has so far only been available in the journal literature (if at all), and so a wide variety of researchers will find this an invaluable survey of the subject. "This book is a masterful account of the counting process approach...is certain to be the standard reference for the area, and should be on the bookshelf of anyone interested in event-history analysis." International Statistical Institute Short Book Reviews "...this impressive reference, which contains a a wealth of powerful mathematics, practical examples, and analytic insights, as well as a complete integration of historical developments and recent advances in event history analysis." Journal of the American Statistical Association.
538$aOnline access to this digital book is restricted to subscription institutions through IP address (only for SISSA internal users)
700$aBorgan, Ørnulf.$eauthor.
700$aGill, Richard D.$eauthor.
700$aKeiding, Niels.$eauthor.
710$aSpringerLink (Online service)
830$aSpringer Series in Statistics,$x0172-7397
856$uhttp://dx.doi.org/10.1007/978-1-4612-4348-9
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