Introduction to Hilbert Space is a comprehensive book written by Sterling Khazag Berberian. The book is designed to provide a thorough understanding of Hilbert space, which is a mathematical concept used in the study of functional analysis and quantum mechanics. The book begins with an overview of linear algebra, which is essential for understanding Hilbert space. It then proceeds to define and describe Hilbert space, including its properties, theorems, and applications. The book covers topics such as orthonormal bases, ...
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Introduction to Hilbert Space is a comprehensive book written by Sterling Khazag Berberian. The book is designed to provide a thorough understanding of Hilbert space, which is a mathematical concept used in the study of functional analysis and quantum mechanics. The book begins with an overview of linear algebra, which is essential for understanding Hilbert space. It then proceeds to define and describe Hilbert space, including its properties, theorems, and applications. The book covers topics such as orthonormal bases, projections, and the spectral theorem. It also includes sections on the geometry of Hilbert space and the theory of bounded linear operators. The book is written in a clear and concise manner, making it accessible to both students and professionals in the field of mathematics. It includes numerous examples and exercises to help readers understand and apply the concepts presented in the book. Introduction to Hilbert Space is an essential resource for anyone interested in functional analysis or quantum mechanics.This scarce antiquarian book is a facsimile reprint of the old original and may contain some imperfections such as library marks and notations. Because we believe this work is culturally important, we have made it available as part of our commitment for protecting, preserving, and promoting the world's literature in affordable, high quality, modern editions, that are true to their original work.
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Seller's Description:
Good book, dustjacket missing. Previous owner's address label on endpaper, otherwise interior is clean w/ some tanning. Blue cloth boards have chipping to the text on the spine & some bumping/shelf wear/rubbing. 218 p.
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Good. Connecting readers with great books since 1972! Used textbooks may not include companion materials such as access codes, etc. May have some wear or writing/highlighting. We ship orders daily and Customer Service is our top priority!
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Seller's Description:
8vo. xi, [1], 206 pp. Diagrams. Blue cloth, white lettrng (mnr shlfwr, ex-lib mrkngs on title, rmnts on frnt cvr), still G copy from library of mathematician & physicist, John A. Simmons. First edition.
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Seller's Description:
Book. Octavo; VG-/G; dark greenish blue spine with ivory white text; exterior to dust jacket has sunned slightly; some rubbing wear to exterior; minor edge wear; cloth exterior shows minimal wear; tight binding; text block has age toned slightly; illustrated; pp 206. 1359349. FP New Rockville Stock.
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Seller's Description:
Very Good with no dustjacket. College name stamped on page edges and endpapers.; No library pocket or other marks. Has glassine d/w. 206pp. Vector spaces, Hilbert spaces, closed linear subspaces, etc.; 8vo.
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Seller's Description:
Book. Octavo. Good Hardcover; red spine with gilt lettering; boards show very little shelf wear but have scattered surface marks; binding tight; text block has a slight discoloration on fore edge that affects several pages; 206 pp. 1348408. FP New Rockville Stock.
This book is a great first step in extending the ideas of finite dimensional vector spaces to Hilbert spaces. It contains a brief review of preliminary knowledge i.e. the definition of a vector space and a pre-Hilbert space. The examples in this text are classic and should be reviewed by every student of mathematics. The only warning that should be issued is that the book assumes some knowledge of advanced calculus e.g. convergence, continuity, Cauchy sequences, etc. I think that any reader woud be hard pressed to find a better book on the topic.
