An Algebraic Approach to the Quantum Theory of Measurements : General and Mathematical Physics
スポンサーリンク
概要
- 論文の詳細を見る
Some fundamental aspects in quantum-mechanical measurements are discussed by following up Schwinger's measurement algebra with a necessary generalization. It is demonstrated that the perfect measurement and the reduction of states are equivalent in their physical contents, and that the theory needs no extraneous concept of probability beyond usual statistical probabilities used for characterizing the state of ensembles.
- 理論物理学刊行会の論文
- 1990-10-25
著者
-
Maki Ziro
Department of Physics, Kinki University
-
Maki Ziro
Reseach Institute For Fundamental Physics Kyoto University
関連論文
- Left-Right Symmetric Model from Geometric Formulation of Gauge Theory in M_4×Z_2×Z_2 : Particles and Fields
- Grand Unification from Gauge Theory in M_4×Z_N : Particles and Fields
- On the Mass Term of Sub-Hadronic Systems
- A New Scheme for η'-η-Glueball Mixing
- A Quark Model Test by Radiative Processes of η and η' Mesons
- Violation of the Vacuum Symmetry, Decay Constants and the Mixing of "η" Mesons
- Possible C-Nonconserving Interactions and Models of Elementary Particles
- Axial-Vector Current Anomaly, Decay Constants, and η-η'-η_c Problem in an N-Flavour Quark Model
- An Improved Mass Formula for 0^-.Mesons in Broken SU(4)-Model for New Particles
- "ψ" Particles in the Quartet Model. II
- "ψ" Particles in the Quartet Model
- A Note on the Leptonic Decays of Charmed Mesons
- Mixing Effect between Particles and Resonances
- Quartet Scheme of Hadrons in Chiral U(4)⨂U(4)
- Fundamental Quartets and Chiral U(4)⊗U(4)
- An Algebraic Approach to the Quantum Theory of Measurements : General and Mathematical Physics
- A Subnuclear Approach to "ψ" Particles
- Contemplating the Possible Number of Quark-Lepton Generations
- Opening Address
- A Note on the PCAC Relation
- π^0→2γ Decays in Relativistic Composite Models
- Preface
- Masses and Decay Constants of Charmed Mesons
- Grand Unification from Gauge Theory in M_4×Z_N : Particles and Fields
- Probabilistic Interpretation and the Quantum Theory of Measurement. II : General and Mathematical Physics
- Probabilistic Interpretation and the Quantum Theory of Measurement