Bohmian Mechanics. The Physics and Mathematics of Quantum Theory
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- Nombre de pages393
- PrésentationRelié
- Poids0.73 kg
- Dimensions15,5 cm × 23,5 cm × 3,2 cm
- ISBN978-3-540-89343-1
- EAN9783540893431
- Date de parution01/04/2009
- ÉditeurSpringer
Résumé
Bohmian Mechanics was formulated in 1952 by David Bohm as a complete theory of quantum o mena based on a particle picture. It was promoted some decades later by John S. Bell, who, intrigued by the manifestly nonlocal structure of the theory, was led to hie famous Bell's inequa-Experimental tests of the inequalities verified that nature is indeed nonlocal. Bolimian mechanics has since then prospered as the straightforward completion of quantum mechanics.
This book provides a systematic introduction to Bohmian mechanics and to the mathematical ctions of quantum mechanics, which range from the self-adjointness of the Schrödinger operator to scattering theory. It explains how the quantum formalisrn emerges when Boltzmann's about statistical mechanics are applied to Bohmian mechanics. The book is self-contained, ematically rigorous and an ideal starting point for a fundamental approach to quantum mechanics.
It will appeal to students and newcomers to the field, as well as to established scientiste seeking a clear exposition of the theory.
This book provides a systematic introduction to Bohmian mechanics and to the mathematical ctions of quantum mechanics, which range from the self-adjointness of the Schrödinger operator to scattering theory. It explains how the quantum formalisrn emerges when Boltzmann's about statistical mechanics are applied to Bohmian mechanics. The book is self-contained, ematically rigorous and an ideal starting point for a fundamental approach to quantum mechanics.
It will appeal to students and newcomers to the field, as well as to established scientiste seeking a clear exposition of the theory.
Bohmian Mechanics was formulated in 1952 by David Bohm as a complete theory of quantum o mena based on a particle picture. It was promoted some decades later by John S. Bell, who, intrigued by the manifestly nonlocal structure of the theory, was led to hie famous Bell's inequa-Experimental tests of the inequalities verified that nature is indeed nonlocal. Bolimian mechanics has since then prospered as the straightforward completion of quantum mechanics.
This book provides a systematic introduction to Bohmian mechanics and to the mathematical ctions of quantum mechanics, which range from the self-adjointness of the Schrödinger operator to scattering theory. It explains how the quantum formalisrn emerges when Boltzmann's about statistical mechanics are applied to Bohmian mechanics. The book is self-contained, ematically rigorous and an ideal starting point for a fundamental approach to quantum mechanics.
It will appeal to students and newcomers to the field, as well as to established scientiste seeking a clear exposition of the theory.
This book provides a systematic introduction to Bohmian mechanics and to the mathematical ctions of quantum mechanics, which range from the self-adjointness of the Schrödinger operator to scattering theory. It explains how the quantum formalisrn emerges when Boltzmann's about statistical mechanics are applied to Bohmian mechanics. The book is self-contained, ematically rigorous and an ideal starting point for a fundamental approach to quantum mechanics.
It will appeal to students and newcomers to the field, as well as to established scientiste seeking a clear exposition of the theory.