Quantum Probability Communications.

Lecture notes from a Summer School on Quantum Probability held at the University of Grenoble are collected in these two volumes of the QP-PQ series. The articles have been refereed and extensively revised for publication. It is hoped that both current and future students of quantum probability will...

Full description

Saved in:

Bibliographic Details
Main Author:	Attal, S.
Other Authors:	Lindsay, J. M.
Format:	eBook
Language:	English
Published:	Singapore : World Scientific Publishing Company, 2003.
Series:	Qp-Pq: Quantum Probability & White Noise Analysis S.
Subjects:	Markov processes. Probabilities. Quantum theory. Stochastic processes. probability. Markov processes Probabilities Quantum theory Stochastic processes
Online Access:	Click for online access

MARC


LEADER	00000cam a2200000Mu 4500
001	ocn854974045
003	OCoLC
005	20240623213015.0
006	m o d
007	cr \|n\|\|\|\|\|\|\|\|\|
008	130803s2003 si o 000 0 eng d
040			\|a EBLCP \|b eng \|e pn \|c EBLCP \|d OCLCQ \|d DEBSZ \|d OCLCQ \|d ZCU \|d MERUC \|d U3W \|d OCLCO \|d OCLCF \|d ICG \|d INT \|d OCLCQ \|d DKC \|d AU@ \|d OCLCQ \|d HS0 \|d OCLCQ \|d OCLCO \|d OCLCQ \|d OCLCO \|d OCLCL \|d SXB
020			\|a 9789812775429
020			\|a 9812775420
035			\|a (OCoLC)854974045
050		4	\|a QC174.4 \|b .Q83 2003
049			\|a HCDD
100	1		\|a Attal, S.
245	1	0	\|a Quantum Probability Communications.
260			\|a Singapore : \|b World Scientific Publishing Company, \|c 2003.
300			\|a 1 online resource (294 pages)
336			\|a text \|b txt \|2 rdacontent
337			\|a computer \|b c \|2 rdamedia
338			\|a online resource \|b cr \|2 rdacarrier
490	1		\|a Qp-Pq: Quantum Probability & White Noise Analysis S.
588	0		\|a Print version record.
505	8		\|a CONCLUSIONBIBLIOGRAPHICAL NOTES; REFERENCES; QUANTUM PROBABILITY APPLIED TO THE DAMPED HARMONIC OSCILLATOR; 1. THE FRAMEWORK OF QUANTUM PROBABILITY; 2. SOME QUANTUM MECHANICS; 3. CONDITIONAL EXPECTATIONS AND OPERATIONS; 4. SECOND QUANTISATION; 5. UNITARY DILATIONS OF SPIRALING MOTION; 6. THE DAMPED HARMONIC OSCILLATOR; REFERENCES; QUANTUM PROBABILITY AND STRONG QUANTUM MARKOV PROCESSES; 0. INTRODUCTION; I. Quantum Probability; 1. A COMPARATIVE DESCRIPTION OF CLASSICAL AND QUANTUM PROBABILITY; 2. THE ROLE OF TENSOR PRODUCTS OF HILBERT SPACES; 3. SOME BASIC OPERATORS ON FOCK SPACES
505	8		\|a 4. FROM URN MODEL TO CANONICAL COMMUTATION RELATIONSII. Quantum Markov Processes; 5. STOCHASTIC OPERATORS ON C-ALGEBRAS; 6. STINESPRING'S THEOREM; 7. EXTREME POINTS OF THE CONVEX SET OF STOCHASTIC OPERATORS; 8. STINESPRING'S THEOREM IN TWO STEPS; 9. CONSTRUCTION OF A QUANTUM MARKOV PROCESS; 10. THE CENTRAL PART OF MINIMAL DILATION; 11. ONE PARAMETER SEMIGROUPS OF STOCHASTIC MAPS ON A C-ALGEBRA; III. Strong Markov Processes; 12. NONCOMMUTATIVE STOP TIMES; 13. MARKOV PROCESS AT SIMPLE STOP TIMES; 14. MINIMAL MARKOV FLOW AT SIMPLE STOP TIMES
505	8		\|a 15. STRONG MARKOV PROPERTY OF THE MINIMAL FLOW FOR A GENERAL STOP TIME16. STRONG MARKOV PROPERTY UNDER A SMOOTHNESS CONDITION; 17. A QUANTUM VERSION OF DYNKIN'S LOCALIZATION FORMULA; ACKNOWLEDGEMENTS; REFERENCES; LIMIT PROBLEMS FOR QUANTUM DYNAMICAL SEMIGROUPS -- INSPIRED BY SCATTERING THEORY; 0. INTRODUCTION; 1. COMPARISON OF THE LARGE TIME BEHAVIOUR OF TWO SEMIGROUPS; 2. THE CLASSIFICATION OF STATES; 3. ERGODIC PROPERTIES OF QUANTUM DYNAMICAL SEMIGROUPS; 4. CONVERGENCE TOWARDS THE EQUILIBRIUM; ACKNOWLEDGEMENT; REFERENCES; A SURVEY OF OPERATOR ALGEBRAS; 0. COMPLEX BANACH ALGEBRAS
505	8		\|a 1. C-ALGEBRAS1.1. Definition and first spectral properties.; 1.2. Adding a unit.; 1.3. First examples: abelian C-aIgebras.; 1.4. Continuous functional calculus in C-algebras.; 1.5. More examples: B(H) and its sub-C-algebras.; 1.6. Order Structure, states, and t h e GNS construction.; 1.6.1. Positive elements and order in A.; 1.6.2. Dual order structure and states.; 1.6.3. GNS construction.; 2. VON NEUMANN ALGEBRAS; 2.1. Some topologies on B(H).; 2.1.1. Three natural topologies.; 2.1.2. The ideal L1(H); 2.2. von Neuman algebras.; 2.2.1. von Neumann bicommutant theorem.
520			\|a Lecture notes from a Summer School on Quantum Probability held at the University of Grenoble are collected in these two volumes of the QP-PQ series. The articles have been refereed and extensively revised for publication. It is hoped that both current and future students of quantum probability will be engaged, informed and inspired by the contents of these two volumes. An extensive bibliography containing the references from all the lectures is included in Volume 12.
650		0	\|a Markov processes.
650		0	\|a Probabilities.
650		0	\|a Quantum theory.
650		0	\|a Stochastic processes.
650		7	\|a probability. \|2 aat
650		7	\|a Markov processes \|2 fast
650		7	\|a Probabilities \|2 fast
650		7	\|a Quantum theory \|2 fast
650		7	\|a Stochastic processes \|2 fast
700	1		\|a Lindsay, J. M.
758			\|i has work: \|a Quantum probability communications (Text) \|1 https://id.oclc.org/worldcat/entity/E39PCG9XDGwxYqcYF33fMPGDVP \|4 https://id.oclc.org/worldcat/ontology/hasWork
776	0	8	\|i Print version: \|a Attal, S. \|t Quantum Probability Communications: Qp-Pq (Volumes 12). \|d Singapore : World Scientific Publishing Company, ©2003 \|z 9789812389749
830		0	\|a Qp-Pq: Quantum Probability & White Noise Analysis S.
856	4	0	\|u https://ebookcentral.proquest.com/lib/holycrosscollege-ebooks/detail.action?docID=1223509 \|y Click for online access
903			\|a EBC-AC
994			\|a 92 \|b HCD

Quantum Probability Communications.

MARC

Similar Items