Book contents
- Frontmatter
- Contents
- Introduction
- 1 Experiment: Detecting Single Quantum Objects
- 2 Description of Quantum Systems in Terms of the Density Matrix
- 3 Experiment: Quantum Processes
- 4 Evolution
- 5 Measurement
- 6 Experiment: Bipartite Systems
- 7 Entanglement
- 8 Experiment: Continuous Quantum Fluctuations
- 9 Continuous Variable Systems
- 10 Experiment: Parameter Estimation
- 11 Theory: Parameter Estimation
- A Basic Postulates of QuantumMechanics: a Reminder
- B Generalized Postulates of Quantum Mechanics
- C Description of Composite Systems
- D Qubits
- E Quantum Particle
- F Quantum Electromagnetic Field
- G Interaction between Light and Atoms
- H Interaction between Light Beams and Linear OpticalMedia
- I Interaction between Light Beams and Nonlinear OpticalMedia
- J Optomechanics
- K Basics of Circuit Quantum Electrodynamics
- References
- Index
2 - Description of Quantum Systems in Terms of the Density Matrix
Published online by Cambridge University Press: 27 July 2023
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Book contents
- Frontmatter
- Contents
- Introduction
- 1 Experiment: Detecting Single Quantum Objects
- 2 Description of Quantum Systems in Terms of the Density Matrix
- 3 Experiment: Quantum Processes
- 4 Evolution
- 5 Measurement
- 6 Experiment: Bipartite Systems
- 7 Entanglement
- 8 Experiment: Continuous Quantum Fluctuations
- 9 Continuous Variable Systems
- 10 Experiment: Parameter Estimation
- 11 Theory: Parameter Estimation
- A Basic Postulates of QuantumMechanics: a Reminder
- B Generalized Postulates of Quantum Mechanics
- C Description of Composite Systems
- D Qubits
- E Quantum Particle
- F Quantum Electromagnetic Field
- G Interaction between Light and Atoms
- H Interaction between Light Beams and Linear OpticalMedia
- I Interaction between Light Beams and Nonlinear OpticalMedia
- J Optomechanics
- K Basics of Circuit Quantum Electrodynamics
- References
- Index
Summary
Presents the basic postulates of quantum mechanics in terms of the density matrix instead of the usual state vector formalism in the case of an isolated system. Extends it to the case of open systems with the help of the reduced density matrix formalism, and to the case of an imperfect state preparation described by a statistical mixture. Introduces the concept of quantum state purity to characterize the degree of mixture of the state, and shows that one can always "purify" a density matrix by going into a Hilbert space of larger dimension.
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- Chapter
- Information
- Quantum Processes and MeasurementTheory and Experiment, pp. 17 - 32Publisher: Cambridge University PressPrint publication year: 2023