Boolean Algebras in Analysis consists of two parts. The first concerns the general theory at the beginner's level. Presenting classical theorems, the book describes the topologies
and uniform structures of Boolean algebras, the basics of complete Boolean algebras and their continuous homomorphisms, as well as lifting theory. The first part also includes an introductory chapter describing the elementary
to the theory.
The second part deals at a graduate level with the metric theory of Boolean algebras at a graduate level. The covered topics include measure algebras, their sub algebras, and groups of
automorphisms. Ample room is allotted to the new classification theorems abstracting the celebrated counterparts by D.Maharam, A.H. Kolmogorov, and V.A.Rokhlin.
Boolean Algebras in
Analysis is an exceptional definitive source on Boolean algebra as applied to functional analysis and probability. It is intended for all who are interested in new and powerful tools for hard and soft
mathematical analysis.
Industry Reviews
"This book consists of two parts. The first is devoted to the general theory of Boolean algebras. The main content of the chapters comprises those sections of the theory of Boolean algebras which relate to these applications. The author gives basic attention to complete Boolean algebras whose structure is described in detail. The first part of the book also contains the extension theorems for continuous homomorphisms. The author examines the topologies and uniformities related to the order and presents the theory of lifting, realizations of Boolean algebras, Stone functors between the categories of Boolean algebras and totally disconnected spaces. One of the chapters gives a sketch of the theory of vector spaces. The second part of the book is devoted to the metric theory of Boolean algebras. Here measure algebras are studied, and traditional matters are described: the Lebesgue-Caratheodory theorem, Radon-Nikod'ym theorem and Lyapunov theorem on vector measures, the algebraic and metric classifications of probability algebras and their subalgebras, theorems about automorphism groups and invariant measures. Much room is allotted to the problem of existence of essentially positive totally additive measure. The closing chapter is devoted to the problem of algebraic and metric independence of subalgebras..." (MATHEMATICAL REVIEWS)