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Theory of Linear Operators in Hilbert Space Posters
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List Price: $17.95Amazon.com's Price: $14.00 You Save: $3.95 (22%)Prices subject to change.
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Binding: Paperback
Dewey Decimal Number: 515.733
EAN: 9780486677484
ISBN: 0486677486
Label: Dover Publications
Manufacturer: Dover Publications
Number Of Items: 1
Number Of Pages: 378
Publication Date: December 16, 1993
Publisher: Dover Publications
Sales Rank: 580847
Studio: Dover Publications
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Editorial Review:
Product Description:
This classic textbook introduces linear operators in Hilbert space, and presents in detail the geometry of Hilbert space and the spectral theory of unitary and self-adjoint operators. It is directed to students at graduate and advanced undergraduate levels, but should prove invaluable for every mathematician and physicist. 1961, 1963 edition.
Average Rating: 
Rating:  -
The spectral theorem of David Hilbert, John von Neumann, and Marshall Stone gives a complete answer to the question of which operators admit a diogonal representation, up to unitary equivalence, and makes the question precise as well. The theorem states that these are the normal operators in Hilbert space. This includes the selfadjoint operators which represent observables in quantum physics, and the more interesting ones are unbounded. Remember the Heisenberg commutation relations do not admit bounded ... Read More
Rating:  -
This is a great intro to functional analysis. Having taken a graduate course on the subject, I used this as my text. The proofs are very readable and kept clear and simple. You'll see the subject develop before your eyes. One thing: when reading this book on infinite dimensional vector spaces, always try to draw a parallel with the finite dimensional version of the subject, linear algebra. You'll appreciate the book all the more. For every theorem relating to a bounded linear operator on Hilbert space, ... Read More
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