Measure and Integration
Published on 4. April 2016
Book
Hardback
XI, 300 pages
978-3-319-29044-7 (ISBN)
Description
Hari Bercovici is a Professor in the Department of Mathematics at Indiana University Bloomington. His research interests include functional analysis, operator theory, and free probability.
Carl Pearcy is an Emeritus Professor in Mathematics at Texas A&M University. His research interest is in functional analysis.
Carl Pearcy is an Emeritus Professor in Mathematics at Texas A&M University. His research interest is in functional analysis.
Reviews / Votes
"The book is a perfect introduction for graduate students into the theory of measure and Lebesgue integration. It is written in a very pedagogical way providing in each chapter many examples and a long collection of problems with a number of hints for the more challenging ones." (Oscar Blasco, zbMATH 1337.28001, 2016)More details
Edition
1st ed. 2016
Language
English
Place of publication
Cham
Switzerland
Publishing group
Springer International Publishing
Target group
Primary & secondary/elementary & high school
Graduate
Illustrations
XI, 300 p.
Dimensions
Height: 241 mm
Width: 160 mm
Thickness: 23 mm
Weight
635 gr
ISBN-13
978-3-319-29044-7 (9783319290447)
DOI
10.1007/978-3-319-29046-1
Schweitzer Classification
Other editions
Additional editions
Hari Bercovici | Arlen Brown | Carl Pearcy
Measure and Integration
Book
04/2018
Springer
€64.19
Shipment within 10-15 days
Hari Bercovici | Arlen Brown | Carl Pearcy
Measure and Integration
E-Book
03/2016
Springer
€64.19
Available for download
Persons
Hari Bercovici is a Professor in the Department of Mathematics at Indiana University Bloomington. His research interests include functional analysis, operator theory, and free probability.
Carl Pearcy is an Emeritus Professor in Mathematics at Texas A&M University. His research interest is in functional analysis.
Carl Pearcy is an Emeritus Professor in Mathematics at Texas A&M University. His research interest is in functional analysis.
Content
Rings of sets.- Measurability.- Integrals and Measures.- Convergence Theorems for Lebesgue Integrals.- Existence and Uniqueness of Measures.- Signed Measures, Complex Measures and Absolute Continuity.- Measure and Topology.- Product Measures.- The
L
p Spaces.- Fourier Analysis.- Standard Measure Spaces.