Adiabatic Switching-Off of Interactions and Foundations of the Boltzmann Equation
スポンサーリンク
概要
- 論文の詳細を見る
The Boltzmann equation for a monatomic gas is derived with the aid of the adiabatic switching-off of interactions, starting with the Heisenberg equation of motion for a number operator in phase space introduced by Ono. It is shown that neither Kirkwood's time-averaging procedure nor the random phase approximation is necessary by virtue of the switching-off of interactions and a new method of time-differentiation. The effectiveness of the present formalism is demonstrated in an analysis of higher order interactions, and the Boltzmann equation is corrected so as to include multiple scattering effects.
- 理論物理学刊行会の論文
- 1972-10-25
著者
関連論文
- Multiple Scattering of Neutrons and Correlation Functions
- Theory of Multiple Scattering of Slow Neutron
- Slow Neutron Scattering and Space-Time Correlation Functions
- Quasi-Classical Theory of Slow Neutron Scattering
- Effective Spatial Homogenization with Neutron Leakage Effect for FBR Control Rods
- A New Approach to Non-Markovian Langevin Equations
- Adiabatic Switching-Off of Interactions and Foundations of the Boltzmann Equation
- Quasiclassical Approximation for Slow Neutron Scattering
- Second Quantization for an Absorptive System of Many Composite Particles : With Application to Nuclear Reaction Theory
- Hidden state-variables and a non-Markoffian formulation of reactor noise.