Probability Measures on Separable Banach Spaces
Probability Measures on Separable Banach Spaces

Author: Emad Eldin A. W. El-Neweihi

Publisher:

Published: 1973

Total Pages: 102

ISBN-13:

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The main purpose of this paper is to extend the definition of the covariance operator to the general set-up of a separable Banach space X, to obtain a direct relationship between the covariance operator and the natural isomorphism between the closure of X* in (L sub 2)(mu) and the reproducing kernel Hilbert space, and to obtain some useful characterizations of a probability measure on X in terms of its covariance operator. The basic tool that is used to define the covariance operator is the Bochner integral.

Probability Measures on Metric Spaces
Probability Measures on Metric Spaces

Author: K. R. Parthasarathy

Publisher: Academic Press

Published: 2014-07-03

Total Pages: 289

ISBN-13: 1483225259

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Probability Measures on Metric Spaces presents the general theory of probability measures in abstract metric spaces. This book deals with complete separable metric groups, locally impact abelian groups, Hilbert spaces, and the spaces of continuous functions. Organized into seven chapters, this book begins with an overview of isomorphism theorem, which states that two Borel subsets of complete separable metric spaces are isomorphic if and only if they have the same cardinality. This text then deals with properties such as tightness, regularity, and perfectness of measures defined on metric spaces. Other chapters consider the arithmetic of probability distributions in topological groups. This book discusses as well the proofs of the classical extension theorems and existence of conditional and regular conditional probabilities in standard Borel spaces. The final chapter deals with the compactness criteria for sets of probability measures and their applications to testing statistical hypotheses. This book is a valuable resource for statisticians.

Probability in Banach Spaces, 8: Proceedings of the Eighth International Conference
Probability in Banach Spaces, 8: Proceedings of the Eighth International Conference

Author: R.M. Dudley

Publisher: Springer Science & Business Media

Published: 2012-12-06

Total Pages: 512

ISBN-13: 1461203678

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Probability limit theorems in infinite-dimensional spaces give conditions un der which convergence holds uniformly over an infinite class of sets or functions. Early results in this direction were the Glivenko-Cantelli, Kolmogorov-Smirnov and Donsker theorems for empirical distribution functions. Already in these cases there is convergence in Banach spaces that are not only infinite-dimensional but nonsep arable. But the theory in such spaces developed slowly until the late 1970's. Meanwhile, work on probability in separable Banach spaces, in relation with the geometry of those spaces, began in the 1950's and developed strongly in the 1960's and 70's. We have in mind here also work on sample continuity and boundedness of Gaussian processes and random methods in harmonic analysis. By the mid-70's a substantial theory was in place, including sharp infinite-dimensional limit theorems under either metric entropy or geometric conditions. Then, modern empirical process theory began to develop, where the collection of half-lines in the line has been replaced by much more general collections of sets in and functions on multidimensional spaces. Many of the main ideas from probability in separable Banach spaces turned out to have one or more useful analogues for empirical processes. Tightness became "asymptotic equicontinuity. " Metric entropy remained useful but also was adapted to metric entropy with bracketing, random entropies, and Kolchinskii-Pollard entropy. Even norms themselves were in some situations replaced by measurable majorants, to which the well-developed separable theory then carried over straightforwardly.

Real Analysis and Probability
Real Analysis and Probability

Author: R. M. Dudley

Publisher: CRC Press

Published: 2018-02-01

Total Pages: 450

ISBN-13: 135108464X

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Written by one of the best-known probabilists in the world this text offers a clear and modern presentation of modern probability theory and an exposition of the interplay between the properties of metric spaces and those of probability measures. This text is the first at this level to include discussions of the subadditive ergodic theorems, metrics for convergence in laws and the Borel isomorphism theory. The proofs for the theorems are consistently brief and clear and each chapter concludes with a set of historical notes and references. This book should be of interest to students taking degree courses in real analysis and/or probability theory.

Weak Convergence of Measures
Weak Convergence of Measures

Author: Vladimir I. Bogachev

Publisher: American Mathematical Soc.

Published: 2018-09-27

Total Pages: 302

ISBN-13: 147044738X

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This book provides a thorough exposition of the main concepts and results related to various types of convergence of measures arising in measure theory, probability theory, functional analysis, partial differential equations, mathematical physics, and other theoretical and applied fields. Particular attention is given to weak convergence of measures. The principal material is oriented toward a broad circle of readers dealing with convergence in distribution of random variables and weak convergence of measures. The book contains the necessary background from measure theory and functional analysis. Large complementary sections aimed at researchers present the most important recent achievements. More than 100 exercises (ranging from easy introductory exercises to rather difficult problems for experienced readers) are given with hints, solutions, or references. Historic and bibliographic comments are included. The target readership includes mathematicians and physicists whose research is related to probability theory, mathematical statistics, functional analysis, and mathematical physics.