Asymptotic Statistics,9780521784504

Asymptotic Statistics

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ISBN13: 9780521784504
ISBN10: 0521784506
Format: Paperback
Pub. Date: 2000-06-19
Publisher(s): Ingram Pub Services
List Price: $67.19

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Summary

This book is an introduction to the field of asymptotic statistics. The treatment is both practical and mathematically rigorous. In addition to most of the standard topics of an asymptotics course, including likelihood inference, M-estimation, the theory of asymptotic efficiency, U-statistics, and rank procedures, the book also presents recent research topics such as semiparametric models, the bootstrap, and empirical processes and their applications. The topics are organized from the central idea of approximation by limit experiments, which gives the book one of its unifying themes. This entails mainly the local approximation of the classical i.i.d. set up with smooth parameters by location experiments involving a single, normally distributed observation. Thus, even the standard subjects of asymptotic statistics are presented in a novel way. Suitable as a graduate or Master's level statistics text, this book will also give researchers an overview of the latest research in asymptotic statistics.

Table of Contents

Preface xiii
Notation xv
Introduction
1(4)
Approximate Statistical Procedures
1(1)
Asymptotic Optimality Theory
2(1)
Limitations
3(1)
The Index n
4(1)
Stochastic Convergence
5(20)
Basic Theory
5(7)
Stochastic o and O Symbols
12(1)
Characteristic Functions
13(4)
Almost-Sure Representations
17(1)
Convergence of Moments
17(1)
Convergence-Determining Classes
18(1)
Law of the Iterated Logarithm
19(1)
Lindeberg-Feller Theorem
20(2)
Convergence in Total Variation
22(3)
Problems
24(1)
Delta Method
25(10)
Basic Result
25(5)
Variance-Stabilizing Transformations
30(1)
Higher-Order Expansions
31(1)
Uniform Delta Method
32(1)
Moments
33(2)
Problems
34(1)
Moment Estimators
35(6)
Method of Moments
35(2)
Exponential Families
37(4)
Problems
40(1)
M- and Z-Estimators
41(44)
Introduction
41(3)
Consistency
44(7)
Asymptotic Normality
51(9)
Estimated Parameters
60(1)
Maximum Likelihood Estimators
61(6)
Classical Conditions
67(4)
One-Step Estimators
71(4)
Rates of Convergence
75(4)
Argmax Theorem
79(6)
Problems
83(2)
Contiguity
85(7)
Likelihood Ratios
85(2)
Contiguity
87(5)
Problems
91(1)
Local Asymptotic Normality
92(16)
Introduction
92(1)
Expanding the Likelihood
93(4)
Convergence to a Normal Experiment
97(3)
Maximum Likelihood
100(3)
Limit Distributions under Alternatives
103(1)
Local Asymptotic Normality
103(5)
Problems
106(2)
Efficiency of Estimators
108(17)
Asymptotic Concentration
108(2)
Relative Efficiency
110(1)
Lower Bound for Experiments
111(1)
Estimating Normal Means
112(3)
Convolution Theorem
115(1)
Almost-Everywhere Convolution Theorem
115(2)
Local Asymptotic Minimax Theorem
117(2)
Shrinkage Estimators
119(1)
Achieving the Bound
120(2)
Large Deviations
122(3)
Problems
123(2)
Limits of Experiments
125(13)
Introduction
125(1)
Asymptotic Representation Theorem
126(1)
Asymptotic Normality
127(2)
Uniform Distribution
129(1)
Pareto Distribution
130(1)
Asymptotic Mixed Normality
131(5)
Heuristics
136(2)
Problems
137(1)
Bayes Procedures
138(15)
Introduction
138(2)
Bernstein--von Mises Theorem
140(6)
Point Estimators
146(3)
Consistency
149(4)
Problems
152(1)
Projections
153(8)
Projections
153(2)
Conditional Expectation
155(2)
Projection onto Sums
157(1)
Hoeffding Decomposition
157(4)
Problems
160(1)
U-Statistics
161(12)
One-Sample U-Statistics
161(4)
Two-Sample U-statistics
165(2)
Degenerate U-Statistics
167(6)
Problems
171(2)
Rank, Sign, and Permutation Statistics
173(19)
Rank Statistics
173(8)
Signed Rank Statistics
181(3)
Rank Statistics for Independence
184(1)
Rank Statistics under Alternatives
184(4)
Permutation Tests
188(2)
Rank Central Limit Theorem
190(2)
Problems
190(2)
Relative Efficiency of Tests
192(23)
Asymptotic Power Functions
192(7)
Consistency
199(2)
Asymptotic Relative Efficiency
201(10)
Other Relative Efficiencies
211(1)
Rescaling Rates
211(4)
Problems
213(2)
Efficiency of Tests
215(12)
Asymptotic Representation Theorem
215(1)
Testing Normal Means
216(2)
Local Asymptotic Normality
218(2)
One-Sample Location
220(3)
Two-Sample Problems
223(4)
Problems
226(1)
Likelihood Ratio Tests
227(15)
Introduction
227(2)
Taylor Expansion
229(2)
Using Local Asymptotic Normality
231(5)
Asymptotic Power Functions
236(2)
Bartlett Correction
238(1)
Bahadur Efficiency
238(4)
Problems
241(1)
Chi-Square Tests
242(13)
Quadratic Forms in Normal Vectors
242(1)
Pearson Statistic
242(2)
Estimated Parameters
244(3)
Testing Independence
247(1)
Goodness-of-Fit Tests
248(3)
Asymptotic Efficiency
251(4)
Problems
253(2)
Stochastic Convergence in Metric Spaces
255(10)
Metric and Normed Spaces
255(3)
Basic Properties
258(2)
Bounded Stochastic Processes
260(5)
Problems
263(2)
Empirical Processes
265(26)
Empirical Distribution Functions
265(4)
Empirical Distributions
269(8)
Goodness-of-Fit Statistics
277(2)
Random Functions
279(3)
Changing Classes
282(2)
Maximal Inequalities
284(7)
Problems
289(2)
Functional Delta Method
291(13)
von Mises Calculus
291(5)
Hadamard-Differentiable Functions
296(2)
Some Examples
298(6)
Problems
303(1)
Quantiles and Order Statistics
304(12)
Weak Consistency
304(1)
Asymptotic Normality
305(5)
Median Absolute Deviation
310(2)
Extreme Values
312(4)
Problems
315(1)
L-Statistics
316(10)
Introduction
316(2)
Hajek Projection
318(2)
Delta Method
320(3)
L-Estimators for Location
323(3)
Problems
324(2)
Bootstrap
326(15)
Introduction
326(3)
Consistency
329(5)
Higher-Order Correctness
334(7)
Problems
339(2)
Nonparametric Density Estimation
341(17)
Introduction
341(1)
Kernel Estimators
341(5)
Rate Optimality
346(3)
Estimating a Unimodal Density
349(9)
Problems
356(2)
Semiparametric Models
358(75)
Introduction
358(2)
Banach and Hilbert Spaces
360(2)
Tangent Spaces and Information
362(6)
Efficient Score Functions
368(3)
Score and Information Operators
371(13)
Testing
384(2)
Efficiency and the Delta Method
386(5)
Efficient Score Equations
391(9)
General Estimating Equations
400(2)
Maximum Likelihood Estimators
402(6)
Approximately Least-Favorable Submodels
408(11)
Likelihood Equations
419(14)
Problems
431(2)
References 433(6)
Index 439

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