Statistical Dynamics of Systems of Interacting Oscillators (Part II. Time Dependent Problems)
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概要
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The dynamical behavior of systems of interacting harmonic oscillator is examined. Crystal lattices are examples of such system. Description is made in terms of normal coordinates. It is assumed that energy is initially distributed canonically over the normal modes. The condition that the process is Markoffian is presented. As an example the behavior of one-dimensional lattice with a heavy isotope is discussed. The motion of the center of mass of a portion of a one-dimensional continuum is treated for comparison. Brownian motion of an oscillator is also discussed.
- 理論物理学刊行会の論文
- 1962-00-00
著者
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Toda Morikazu
Department Of Applied Mathematics Yokohama National University
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Kogure Youzou
Department Of Physics Faculty Of Science Tokyo University Of Education
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KOGURE Youzou
Department of Physics, Faculty of Science Tokyo University of Education
関連論文
- On the Brownian Motion of a Classical Oscillator
- Equilibrium Vapor Pressure of Indium Antimonide
- On the Theory of Brownian Motion and Spin Relaxation
- Backlund Transformation for the Exponential Lattice
- Localized Vibration and Random Walk
- Some Properties of the Pair Distribution Function
- Experiment on Soliton-Impurity Interaction in Nonlinear Lattice Using LC Circuit
- Waves in Nonlinear Lattice
- Vibration of a Chain with Nonlinear Interaction
- A Canonical Transformation for the Exponential Lattice
- One-Dimensional Dual Transformation
- Interaction of Soliton with an Impurity in Nonlinear Lattice
- Preface
- Preface
- Damping Behavior and Space Dimensions (Part II. Time Dependent Problems)
- Statistical Dynamics of Systems of Interacting Oscillators (Part II. Time Dependent Problems)
- Diffusion on the Fermi Surface
- One-Dimensional Dual Transformation
- Wave Propagation in Anharmonic Lattices
- On the Theory of the Brownian Motion
- On the Theory of Quantum Liquids. I. Surface TenSion and Stress