A Hilbert space problem book / Paul R. Halmos

Auteur: Halmos, Paul Richard (1916-2006) - AuteurType de document: MonographieCollection: Graduate texts in mathematics ; 19Langue: anglaisPays: Etats UnisÉditeur: New York : Springer-Verlag, 1982Edition: 2nd Edition, revised and enlargedDescription: 1 vol. (XVII-369 p.) ; 25 cm ISBN: 9780387906850 ; rel. Note: This is the second edition of the by now famous book from 1967. Nine problems have been deleted, sixty new ones have been added and errors have been corrected. The new problems are mainly concerned with total sets of vectors (Chapter 1), strong and weak operator topologies (Chapters 13 and 14), cyclic vectors (Chapter 18), subnormal and hyponormal operators (Chapters 21 and 23). As with the first edition, this considerably improved volume will serve the interested student to find his way to active and creative work in the field of Hilbert space theory. (MathSciNet)Bibliographie: Bibliogr. p. 347-354. Index. Sujets MSC: 47-02 Operator theory -- Research exposition (monographs, survey articles)
47Axx Operator theory -- General theory of linear operators
47Bxx Operator theory -- Special classes of linear operators
46-02 Functional analysis -- Research exposition (monographs, survey articles)
46Cxx Functional analysis -- Inner product spaces and their generalizations, Hilbert spaces
En-ligne: Springerlink | archive.org | MathScinet | Zentralblatt
Location Call Number Status Date Due
Salle R 04744-01 / 47 HAL (Browse Shelf) Available

This is the second edition of the by now famous book from 1967. Nine problems have been deleted, sixty new ones have been added and errors have been corrected. The new problems are mainly concerned with total sets of vectors (Chapter 1), strong and weak operator topologies (Chapters 13 and 14), cyclic vectors (Chapter 18), subnormal and hyponormal operators (Chapters 21 and 23). As with the first edition, this considerably improved volume will serve the interested student to find his way to active and creative work in the field of Hilbert space theory. (MathSciNet)

Bibliogr. p. 347-354. Index

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