Published by Springer-Verlag Berlin and Heidelberg GmbH & Co. K, 1969
ISBN 10: 3642885098 ISBN 13: 9783642885099
Seller: Ammareal, Morangis, France
Softcover. Condition: Bon. Ancien livre de bibliothèque. Légères traces d'usure sur la couverture. Salissures sur la tranche. Edition 1969. Ammareal reverse jusqu'à 15% du prix net de cet article à des organisations caritatives. ENGLISH DESCRIPTION Book Condition: Used, Good. Former library book. Slight signs of wear on the cover. Soiling on the side. Edition 1969. Ammareal gives back up to 15% of this item's net price to charity organizations.
Published by Springer, 2013
ISBN 10: 3642885098 ISBN 13: 9783642885099
Seller: booksXpress, Bayonne, NJ, U.S.A.
Soft Cover. Condition: new.
Published by Springer, 2013
ISBN 10: 3642885098 ISBN 13: 9783642885099
Seller: GreatBookPrices, Columbia, MD, U.S.A.
Condition: New.
Published by Springer, 2013
ISBN 10: 3642885098 ISBN 13: 9783642885099
Seller: Lucky's Textbooks, Dallas, TX, U.S.A.
Condition: New.
Published by Springer, 2013
ISBN 10: 3642885098 ISBN 13: 9783642885099
Seller: California Books, Miami, FL, U.S.A.
Condition: New.
Published by Springer, 2013
ISBN 10: 3642885098 ISBN 13: 9783642885099
Seller: Ria Christie Collections, Uxbridge, United Kingdom
Condition: New. PRINT ON DEMAND Book; New; Fast Shipping from the UK. No. book.
Published by Springer, 2013
ISBN 10: 3642885098 ISBN 13: 9783642885099
Seller: GreatBookPricesUK, Castle Donington, DERBY, United Kingdom
Condition: New.
Published by Springer Berlin Heidelberg Okt 2013, 2013
ISBN 10: 3642885098 ISBN 13: 9783642885099
Seller: BuchWeltWeit Ludwig Meier e.K., Bergisch Gladbach, Germany
Taschenbuch. Condition: Neu. This item is printed on demand - it takes 3-4 days longer - Neuware -The problem as to whether or not there exists a lifting of the M't/. 1 space ) corresponding to the real line and Lebesgue measure on it was first raised by A. Haar. It was solved in a paper published in 1931 [102] by 1. von Neumann, who established the existence of a lifting in this case. In subsequent papers J. von Neumann and M. H. Stone [105], and later on 1. Dieudonne [22], discussed various algebraic aspects and generalizations of the problem. Attemps to solve the problem as to whether or not there exists a lifting for an arbitrary M't/. space were unsuccessful for a long time, although the problem had significant connections with other branches of mathematics. Finally, in a paper published in 1958 [88], D. Maharam established, by a delicate argument, that a lifting of M't/. always exists (for an arbi trary space of a-finite mass). D. Maharam proved first the existence of a lifting of the M't/. space corresponding to a product X = TI {ai,b,} ieI and a product measure J.1= Q9 J.1i' with J.1i{a;}=J.1i{b,}=! for all iE/. ,eI Then, she reduced the general case to this one, via an isomorphism theorem concerning homogeneous measure algebras [87], [88]. A different and more direct proof of the existence of a lifting was subsequently given by the authors in [65]' A variant of this proof is presented in chapter 4. 204 pp. Englisch.
Published by Springer, 2013
ISBN 10: 3642885098 ISBN 13: 9783642885099
Seller: Revaluation Books, Exeter, United Kingdom
Paperback. Condition: Brand New. 204 pages. 9.01x5.99x0.46 inches. In Stock.
Published by Springer Berlin Heidelberg, 2013
ISBN 10: 3642885098 ISBN 13: 9783642885099
Seller: AHA-BUCH GmbH, Einbeck, Germany
Taschenbuch. Condition: Neu. Druck auf Anfrage Neuware - Printed after ordering - The problem as to whether or not there exists a lifting of the M't/. 1 space ) corresponding to the real line and Lebesgue measure on it was first raised by A. Haar. It was solved in a paper published in 1931 [102] by 1. von Neumann, who established the existence of a lifting in this case. In subsequent papers J. von Neumann and M. H. Stone [105], and later on 1. Dieudonne [22], discussed various algebraic aspects and generalizations of the problem. Attemps to solve the problem as to whether or not there exists a lifting for an arbitrary M't/. space were unsuccessful for a long time, although the problem had significant connections with other branches of mathematics. Finally, in a paper published in 1958 [88], D. Maharam established, by a delicate argument, that a lifting of M't/. always exists (for an arbi trary space of a-finite mass). D. Maharam proved first the existence of a lifting of the M't/. space corresponding to a product X = TI {ai,b,} ieI and a product measure J.1= Q9 J.1i' with J.1i{a;}=J.1i{b,}=! for all iE/. ,eI Then, she reduced the general case to this one, via an isomorphism theorem concerning homogeneous measure algebras [87], [88]. A different and more direct proof of the existence of a lifting was subsequently given by the authors in [65]' A variant of this proof is presented in chapter 4.
Published by Springer, 2013
ISBN 10: 3642885098 ISBN 13: 9783642885099
Seller: GF Books, Inc., Hawthorne, CA, U.S.A.
Condition: New. Book is in NEW condition. 0.67.
Published by Springer Berlin Heidelberg, 2013
ISBN 10: 3642885098 ISBN 13: 9783642885099
Seller: moluna, Greven, Germany
Condition: New. Dieser Artikel ist ein Print on Demand Artikel und wird nach Ihrer Bestellung fuer Sie gedruckt. The problem as to whether or not there exists a lifting of the M t/. 1 space ) corresponding to the real line and Lebesgue measure on it was first raised by A. Haar. It was solved in a paper published in 1931 [102] by 1. von Neumann, who established the exi.
Published by Springer 2013-10, 2013
ISBN 10: 3642885098 ISBN 13: 9783642885099
Seller: Chiron Media, Wallingford, United Kingdom
PF. Condition: New.
Published by Springer, 2013
ISBN 10: 3642885098 ISBN 13: 9783642885099
Seller: GreatBookPricesUK, Castle Donington, DERBY, United Kingdom
Condition: As New. Unread book in perfect condition.
Published by Springer, 2013
ISBN 10: 3642885098 ISBN 13: 9783642885099
Seller: Mispah books, Redhill, SURRE, United Kingdom
Paperback. Condition: Like New. Like New. book.
Published by Springer, 2013
ISBN 10: 3642885098 ISBN 13: 9783642885099
Seller: GreatBookPrices, Columbia, MD, U.S.A.
Condition: As New. Unread book in perfect condition.