Classical Summation in Commutative and Noncommutative Lp-Spaces [Paperback]

The aim of this research is to develop a systematic scheme that makes it possible to transform important parts of the by now classical theory of summation of general orthonormal series into a similar theory for series in noncommutative $L_p$-spaces constructed over a noncommutative measure space (a von Neumann algebra of operators acting on a Hilbert space together with a faithful normal state on this algebra).This book develops a systematic scheme that makes it possible to transfer important parts of the theory of summation of general orthonormal series into a similar theory for series in noncommutative Lp-spaces built over a noncommutative measure space.1 Introduction.- 2 Commutative Theory.- 3 Noncommutative Theory.

From the reviews:

The book under review is a beautiful and original exposition on the topic of almost everywhere convergent orthonormal series. & The student or researcher who succeeds in reading this book will be rewarded with a deep understanding of the subject, both in the commutative and noncommutative setting. & the book should stand on the shelf of anyone seriously interested in functional analysis and/or probability. (StanisBaw Goldstein, zbMATH, Vol. 1267, 2013)

This book is well written, with a concise, clear and readable style. It is divided into 3 chapters and includes a preface, a bibliography consisting of 98 items, and symbol, author and subject indexes. & The book is a good source for specialists and graduate students working in functional analysis and operator theory. (Mohammad Sal Moslehian, Mathematical Reviews, Issue 2012 d)

The aim of this research is to develop a systematic scheme that makes it possible to transform important parts of the by now classical theory of summation of general orthonormal series into a similar theory for series in noncommutative $L_p$-spaces constructed over a noncommutative measure space (a von Neumann algebra of operators acting on a Hilbert space ?togetherlÓ$