9780387977409 - a road to randomness in physical systems: 71 (lecture notes in statistics, 71) de engel, eduardo m.r.a. (10 resultados)
Idioma: Inglés
Editorial: Springer-Verlag, Berlin - Heidelberg - New York 1992
Serie: Lecture Notes in Statistics, Libro 2 de 72. Libro 2 de 72 - Lecture Notes in Statistics
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Librería: Metakomet Books, Concord, Estados Unidos de AmericaMetakomet Books
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Paperback. Condición: Good. Light edgewear, tiny scuff mark to front cover. Otherwise, clean and sound. Lecture Notes in Statistics, #71. 155 pgs.
Idioma: Inglés
Editorial: Springer 1992
Serie: Lecture Notes in Statistics, Libro 2 de 72. Libro 2 de 72 - Lecture Notes in Statistics
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Editorial: Springer 1992-03 1992
Serie: Lecture Notes in Statistics, Libro 2 de 72. Libro 2 de 72 - Lecture Notes in Statistics
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PF. Condición: New.
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Editorial: Springer Verlag 1992
Serie: Lecture Notes in Statistics, Libro 2 de 72. Libro 2 de 72 - Lecture Notes in Statistics
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Paperback. Condición: Brand New. 1st edition. 155 pages. 9.50x6.75x0.50 inches. In Stock.
Idioma: Inglés
Editorial: Springer 1992
Serie: Lecture Notes in Statistics, Libro 2 de 72. Libro 2 de 72 - Lecture Notes in Statistics
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Librería: BennettBooksLtd, Los Angeles, Estados Unidos de AmericaBennettBooksLtd
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paperback. Condición: New. In shrink wrap. Looks like an interesting title.
Idioma: Inglés
Editorial: Springer New York 1992
Serie: Lecture Notes in Statistics, Libro 2 de 72. Libro 2 de 72 - Lecture Notes in Statistics
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Librería: moluna, Greven, Alemaniamoluna
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Idioma: Inglés
Editorial: Springer, Copernicus 1992
Serie: Lecture Notes in Statistics, Libro 2 de 72. Libro 2 de 72 - Lecture Notes in Statistics
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Librería: AHA-BUCH GmbH, Einbeck, AlemaniaAHA-BUCH GmbH
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Taschenbuch. Condición: Neu. Druck auf Anfrage Neuware - Printed after ordering - There are many ways of introducing the concept of probability in classical, i. e, deter ministic, physics. This work is concerned with one approach, known as 'the method of arbitrary funetionJ. ' It was put forward by Poincare in 1896 and developed… by Hopf in the 1930's. The idea is the following. There is always some uncertainty in our knowledge of both the initial conditions and the values of the physical constants that characterize the evolution of a physical system. A probability density may be used to describe this uncertainty. For many physical systems, dependence on the initial density washes away with time. Inthese cases, the system's position eventually converges to the same random variable, no matter what density is used to describe initial uncertainty. Hopf's results for the method of arbitrary functions are derived and extended in a unified fashion in these lecture notes. They include his work on dissipative systems subject to weak frictional forces. Most prominent among the problems he considers is his carnival wheel example, which is the first case where a probability distribution cannot be guessed from symmetry or other plausibility considerations, but has to be derived combining the actual physics with the method of arbitrary functions. Examples due to other authors, such as Poincare's law of small planets, Borel's billiards problem and Keller's coin tossing analysis are also studied using this framework. Finally, many new applications are presented.
Idioma: Inglés
Editorial: Springer New York 1992
Serie: Lecture Notes in Statistics, Libro 2 de 72. Libro 2 de 72 - Lecture Notes in Statistics
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Librería: Buchpark, Trebbin, AlemaniaBuchpark
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Condición: Gut. Zustand: Gut | Sprache: Englisch | Produktart: Bücher | There are many ways of introducing the concept of probability in classical, i. e, deter ministic, physics. This work is concerned with one approach, known as "the method of arbitrary funetionJ. " It was put forward by Poincare in 1896 and developed by Hopf…in the 1930's. The idea is the following. There is always some uncertainty in our knowledge of both the initial conditions and the values of the physical constants that characterize the evolution of a physical system. A probability density may be used to describe this uncertainty. For many physical systems, dependence on the initial density washes away with time. Inthese cases, the system's position eventually converges to the same random variable, no matter what density is used to describe initial uncertainty. Hopf's results for the method of arbitrary functions are derived and extended in a unified fashion in these lecture notes. They include his work on dissipative systems subject to weak frictional forces. Most prominent among the problems he considers is his carnival wheel example, which is the first case where a probability distribution cannot be guessed from symmetry or other plausibility considerations, but has to be derived combining the actual physics with the method of arbitrary functions. Examples due to other authors, such as Poincare's law of small planets, Borel's billiards problem and Keller's coin tossing analysis are also studied using this framework. Finally, many new applications are presented.
Idioma: Inglés
Editorial: Springer, Springer Feb 1992 1992
Serie: Lecture Notes in Statistics, Libro 2 de 72. Libro 2 de 72 - Lecture Notes in Statistics
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Librería: BuchWeltWeit Ludwig Meier e.K., Bergisch Gladbach, AlemaniaBuchWeltWeit Ludwig Meier e.K.
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Taschenbuch. Condición: Neu. This item is printed on demand - it takes 3-4 days longer - Neuware -There are many ways of introducing the concept of probability in classical, i. e, deter ministic, physics. This work is concerned with one approach, known as 'the method of arbitrary funetionJ. ' It was put forward by Poincare in 18…96 and developed by Hopf in the 1930's. The idea is the following. There is always some uncertainty in our knowledge of both the initial conditions and the values of the physical constants that characterize the evolution of a physical system. A probability density may be used to describe this uncertainty. For many physical systems, dependence on the initial density washes away with time. Inthese cases, the system's position eventually converges to the same random variable, no matter what density is used to describe initial uncertainty. Hopf's results for the method of arbitrary functions are derived and extended in a unified fashion in these lecture notes. They include his work on dissipative systems subject to weak frictional forces. Most prominent among the problems he considers is his carnival wheel example, which is the first case where a probability distribution cannot be guessed from symmetry or other plausibility considerations, but has to be derived combining the actual physics with the method of arbitrary functions. Examples due to other authors, such as Poincare's law of small planets, Borel's billiards problem and Keller's coin tossing analysis are also studied using this framework. Finally, many new applications are presented. 168 pp. Englisch.
Idioma: Inglés
Editorial: Springer, Copernicus Feb 1992 1992
Serie: Lecture Notes in Statistics, Libro 2 de 72. Libro 2 de 72 - Lecture Notes in Statistics
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Librería: buchversandmimpf2000, Emtmannsberg, Alemaniabuchversandmimpf2000
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Taschenbuch. Condición: Neu. This item is printed on demand - Print on Demand Titel. Neuware -There are many ways of introducing the concept of probability in classical, i. e, deter ministic, physics. This work is concerned with one approach, known as 'the method of arbitrary funetionJ. ' It was put forward by Poincare in 1896 a…nd developed by Hopf in the 1930's. The idea is the following. There is always some uncertainty in our knowledge of both the initial conditions and the values of the physical constants that characterize the evolution of a physical system. A probability density may be used to describe this uncertainty. For many physical systems, dependence on the initial density washes away with time. Inthese cases, the system's position eventually converges to the same random variable, no matter what density is used to describe initial uncertainty. Hopf's results for the method of arbitrary functions are derived and extended in a unified fashion in these lecture notes. They include his work on dissipative systems subject to weak frictional forces. Most prominent among the problems he considers is his carnival wheel example, which is the first case where a probability distribution cannot be guessed from symmetry or other plausibility considerations, but has to be derived combining the actual physics with the method of arbitrary functions. Examples due to other authors, such as Poincare's law of small planets, Borel's billiards problem and Keller's coin tossing analysis are also studied using this framework. Finally, many new applications are presented.Springer-Verlag KG, Sachsenplatz 4-6, 1201 Wien 168 pp. Englisch.
