Weak Convergence and Empirical Processes : With Applications to Statistics / by Aad van der vaart, Jon Wellner.

Format:

Book

Author/Creator:

van der vaart, Aad, author.

Wellner, Jon, 1975- author.

Contributor:

SpringerLink (Online service)

Series:

Springer series in statistics 2197-568X

Springer Series in Statistics, 2197-568X

Language:

English

Subjects (All):

Probabilities.

Probability Theory.

Local Subjects:

Probability Theory.

Physical Description:

1 online resource (XVI, 510 pages).

Edition:

First edition 1996.

Contained In:

Springer Nature eBook

Place of Publication:

New York, NY : Springer New York : Imprint: Springer, 1996.

System Details:

text file PDF

Summary:

This book tries to do three things. The first goal is to give an exposition of certain modes of stochastic convergence, in particular convergence in distribution. The classical theory of this subject was developed mostly in the 1950s and is well summarized in Billingsley (1968). During the last 15 years, the need for a more general theory allowing random elements that are not Borel measurable has become well established, particularly in developing the theory of empirical processes. Part 1 of the book, Stochastic Convergence, gives an exposition of such a theory following the ideas of J. Hoffmann-J!1Jrgensen and R. M. Dudley. A second goal is to use the weak convergence theory background devel- oped in Part 1 to present an account of major components of the modern theory of empirical processes indexed by classes of sets and functions. The weak convergence theory developed in Part 1 is important for this, simply because the empirical processes studied in Part 2, Empirical Processes, are naturally viewed as taking values in nonseparable Banach spaces, even in the most elementary cases, and are typically not Borel measurable. Much of the theory presented in Part 2 has previously been scattered in the journal literature and has, as a result, been accessible only to a relatively small number of specialists. In view of the importance of this theory for statis- tics, we hope that the presentation given here will make this theory more accessible to statisticians as well as to probabilists interested in statistical applications.

Contents:

1.1. Introduction

1.2. Outer Integrals and Measurable Majorants

1.3. Weak Convergence

1.4. Product Spaces

1.5. Spaces of Bounded Functions

1.6. Spaces of Locally Bounded Functions

1.7. The Ball Sigma-Field and Measurability of Suprema

1.8. Hilbert Spaces

1.9. Convergence: Almost Surely and in Probability

1.10. Convergence: Weak, Almost Uniform, and in Probability

1.11. Refinements

1.12. Uniformity and Metrization

2.1. Introduction

2.2. Maximal Inequalities and Covering Numbers

2.3. Symmetrization and Measurability

2.4. Glivenko-Cantelli Theorems

2.5. Donsker Theorems

2.6. Uniform Entropy Numbers

2.7. Bracketing Numbers

2.8. Uniformity in the Underlying Distribution

2.9. Multiplier Central Limit Theorems

2.10. Permanence of the Donsker Property

2.11. The Central Limit Theorem for Processes

2.12. Partial-Sum Processes

2.13. Other Donsker Classes

2.14. Tail Bounds

3.1. Introduction

3.2. M-Estimators

3.3. Z-Estimators

3.4. Rates of Convergence

3.5. Random Sample Size, Poissonization and Kac Processes

3.6. The Bootstrap

3.7. The Two-Sample Problem

3.8. Independence Empirical Processes

3.9. The Delta-Method

3.10. Contiguity

3.11. Convolution and Minimax Theorems

A. Appendix

A.1. Inequalities

A.2. Gaussian Processes

A.2.1. Inequalities and Gaussian Comparison

A.2.2. Exponential Bounds

A.2.3. Majorizing Measures

A.2.4. Further Results

A.3. Rademacher Processes

A.4. Isoperimetric Inequalities for Product Measures

A.5. Some Limit Theorems

A.6. More Inequalities

A.6.1. Binomial Random Variables

A.6.2. Multinomial Random Vectors

A.6.3. Rademacher Sums

Notes

References

Author Index

List of Symbols.

Other Format:

Printed edition:

ISBN:

9781475725452

Access Restriction:

Restricted for use by site license.