Empirical processes with applications to statistics

Here is the first book to summarize a broad cross-section of the large volume of literature available on one-dimensional empirical processes. Presents a thorough treatment of the theory of empirical processes, with emphasis on real random variable processes as well as a wide-ranging selection of app

<span>Originally published in 1986, this valuable reference provides a detailed treatment of limit theorems and inequalities for empirical processes of real-valued random variables. It also includes applications of the theory to censored data, spacings, rank statistics, quantiles, and many functiona

<p>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 1

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: Alm

<span>This book provides an account of weak convergence theory, empirical processes, and their application to a wide variety of problems in statistics. The first part of the book presents a thorough treatment of stochastic convergence in its various forms. Part 2 brings together the theory of empiri