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ISBN: 9789048142095

ID: 978904814209

For many years physics and mathematics have had a fruitful influence on one another. Classical mechanics and celestial mechanics have produced very deep problems whose solutions have enhanced mathematics. On the other hand, mathematics itself has found interesting theories which then (sometimes after many years) have been reflected in physics, confirming the thesis that nothing is more practical than a good theory. The same is true for the younger physical discipline -of quantum mechanics. In the 1930s two events, not at all random, became: The mathematical back grounds of both quantum mechanics and probability theory. In 1936, G. Birkhoff and J. von Neumann published their historical paper The logic of quantum mechanics, in which a quantum logic was suggested. The mathematical foundations of quantum mechanics remains an outstanding problem of mathematics, physics, logic and philosophy even today. The theory of quantum logics is a major stream in this axiomatical knowledge river, where L(H), the system of all closed subspaces of a Hilbert space H, due to J. von Neumann, plays an important role. When A.M. Gleason published his solution to G. Mackey''s problem showing that any state (= probability measure) corresponds to a density operator, he probably did not anticipate that his solution would become a cornerstone of ax iomati cal theory of quantum mechanics nor that it would provide many interesting applications to mathematics. Anatolij Dvurecenskij, Books, Gleason's Theorem and Its Applications Books, Springer-Verlag/Sci-Tech/Trade

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2010, ISBN: 9048142091

ID: 14251968793

[EAN: 9789048142095], Neubuch, [PU: Springer, Netherlands], Language: English . Brand New Book ***** Print on Demand *****.For many years physics and mathematics have had a fruitful influence on one another. Classical mechanics and celestial mechanics have produced very deep problems whose solutions have enhanced mathematics. On the other hand, mathematics itself has found interesting theories which then (sometimes after many years) have been reflected in physics, confirming the thesis that nothing is more practical than a good theory. The same is true for the younger physical discipline -of quantum mechanics. In the 1930s two events, not at all random, became: The mathematical back- grounds of both quantum mechanics and probability theory. In 1936, G. Birkhoff and J. von Neumann published their historical paper The logic of quantum mechanics , in which a quantum logic was suggested. The mathematical foundations of quantum mechanics remains an outstanding problem of mathematics, physics, logic and philosophy even today. The theory of quantum logics is a major stream in this axiomatical knowledge river, where L(H), the system of all closed subspaces of a Hilbert space H, due to J. von Neumann, plays an important role. When A.M. Gleason published his solution to G. Mackey s problem showing that any state (= probability measure) corresponds to a density operator, he probably did not anticipate that his solution would become a cornerstone of ax iomati cal theory of quantum mechanics nor that it would provide many interesting applications to mathematics. Softcover reprint of hardcover 1st ed. 1992.

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2010, ISBN: 9048142091

ID: 14258942248

[EAN: 9789048142095], Neubuch, [PU: Springer, Netherlands], Language: English. Brand new Book. For many years physics and mathematics have had a fruitful influence on one another. Classical mechanics and celestial mechanics have produced very deep problems whose solutions have enhanced mathematics. On the other hand, mathematics itself has found interesting theories which then (sometimes after many years) have been reflected in physics, confirming the thesis that nothing is more practical than a good theory. The same is true for the younger physical discipline -of quantum mechanics. In the 1930s two events, not at all random, became: The mathematical back- grounds of both quantum mechanics and probability theory. In 1936, G. Birkhoff and J. von Neumann published their historical paper "The logic of quantum mechanics", in which a quantum logic was suggested. The mathematical foundations of quantum mechanics remains an outstanding problem of mathematics, physics, logic and philosophy even today. The theory of quantum logics is a major stream in this axiomatical knowledge river, where L(H), the system of all closed subspaces of a Hilbert space H, due to J. von Neumann, plays an important role. When A.M. Gleason published his solution to G. Mackey's problem showing that any state (= probability measure) corresponds to a density operator, he probably did not anticipate that his solution would become a cornerstone of ax iomati cal theory of quantum mechanics nor that it would provide many interesting applications to mathematics. Softcover reprint of hardcover 1st ed. 1992.

AbeBooks.de Book Depository International, London, United Kingdom [58762574] [Rating: 5 (von 5)] NEW BOOK. Verzendingskosten: EUR 0.57 Details... |

2010, ISBN: 9048142091

ID: 22424154945

[EAN: 9789048142095], Neubuch, [PU: Springer, Netherlands], Language: English. Brand new Book. For many years physics and mathematics have had a fruitful influence on one another. Classical mechanics and celestial mechanics have produced very deep problems whose solutions have enhanced mathematics. On the other hand, mathematics itself has found interesting theories which then (sometimes after many years) have been reflected in physics, confirming the thesis that nothing is more practical than a good theory. The same is true for the younger physical discipline -of quantum mechanics. In the 1930s two events, not at all random, became: The mathematical back- grounds of both quantum mechanics and probability theory. In 1936, G. Birkhoff and J. von Neumann published their historical paper "The logic of quantum mechanics", in which a quantum logic was suggested. The mathematical foundations of quantum mechanics remains an outstanding problem of mathematics, physics, logic and philosophy even today. The theory of quantum logics is a major stream in this axiomatical knowledge river, where L(H), the system of all closed subspaces of a Hilbert space H, due to J. von Neumann, plays an important role. When A.M. Gleason published his solution to G. Mackey's problem showing that any state (= probability measure) corresponds to a density operator, he probably did not anticipate that his solution would become a cornerstone of ax iomati cal theory of quantum mechanics nor that it would provide many interesting applications to mathematics. Softcover reprint of hardcover 1st ed. 1992.

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2010, ISBN: 9789048142095

gebonden uitgave, ID: 15619094

Softcover reprint of hardcover 1st ed. 1992, Softcover, Buch, [PU: Springer]

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** Gedetalleerde informatie over het boek. - Gleason's Theorem and Its Applications (Mathematics and its Applications)**

EAN (ISBN-13): 9789048142095

ISBN (ISBN-10): 9048142091

Gebonden uitgave

pocket book

Verschijningsjaar: 2010

Uitgever: Springer-Verlag GmbH

344 Bladzijden

Gewicht: 0,520 kg

Taal: eng/Englisch

Boek bevindt zich in het datenbestand sinds 2010-08-11T10:06:37+02:00 (Amsterdam)

Detailpagina laatst gewijzigd op 2018-12-01T18:55:27+01:00 (Amsterdam)

ISBN/EAN: 9789048142095

ISBN - alternatieve schrijfwijzen:

90-481-4209-1, 978-90-481-4209-5

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