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.
K. R. Parthasarathy
Probability Measures on Metric Spaces [PDF ebook]
Probability Measures on Metric Spaces [PDF ebook]
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Bahasa Inggeris ● Format PDF ● ISBN 9781483225258 ● Penyunting Z. W. Birnbaum & E. Lukacs ● Penerbit Elsevier Science ● Diterbitkan 2014 ● Muat turun 3 kali ● Mata wang EUR ● ID 5734054 ● Salin perlindungan Adobe DRM
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