UID:
almahu_9947363909502882
Umfang:
XVI, 244 p.
,
online resource.
ISBN:
9783540339663
Serie:
Lecture Notes in Mathematics, 1881
Inhalt:
Understanding dissipative dynamics of open quantum systems remains a challenge in mathematical physics. This problem is relevant in various areas of fundamental and applied physics. From a mathematical point of view, it involves a large body of knowledge. Significant progress in the understanding of such systems has been made during the last decade. These books present in a self-contained way the mathematical theories involved in the modeling of such phenomena. They describe physically relevant models, develop their mathematical analysis and derive their physical implications. In Volume I the Hamiltonian description of quantum open systems is discussed. This includes an introduction to quantum statistical mechanics and its operator algebraic formulation, modular theory, spectral analysis and their applications to quantum dynamical systems. Volume II is dedicated to the Markovian formalism of classical and quantum open systems. A complete exposition of noise theory, Markov processes and stochastic differential equations, both in the classical and the quantum context, is provided. These mathematical tools are put into perspective with physical motivations and applications. Volume III is devoted to recent developments and applications. The topics discussed include the non-equilibrium properties of open quantum systems, the Fermi Golden Rule and weak coupling limit, quantum irreversibility and decoherence, qualitative behaviour of quantum Markov semigroups and continual quantum measurements.
Anmerkung:
Ergodic Properties of Markov Processes -- Open Classical Systems -- Quantum Noises -- Complete Positivity and the Markov structure of Open Quantum Systems -- Quantum Stochastic Differential Equations and Dilation of Completely Positive Semigroups.
In:
Springer eBooks
Weitere Ausg.:
Printed edition: ISBN 9783540309925
Sprache:
Englisch
Fachgebiete:
Mathematik
Schlagwort(e):
Konferenzschrift
URL:
http://dx.doi.org/10.1007/b128451
URL:
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URL:
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