Hopping Diffusion in a One-Dimensional Random System
スポンサーリンク
概要
- 論文の詳細を見る
The low-frequency behavior of hopping diffusion in a one-dimensional random system is investigated. The scaling hypothesis which Bernasconi et al. proposed in order to obtain the generalized diffusion coefficient D(ω) is verified by an analytical method.
- 理論物理学刊行会の論文
- 1983-03-25
著者
-
Igarashi Akito
Department Of Applied Mathematics And Physics Faculty Of Engineering Kyoto University
関連論文
- Dynamical Properties of a Low-Dimensional Chaotic Reservoir : Simulations and GLE Interpretation : General Physics
- Computer Simulation on Kink Dynamics and Kink-Pair Nucleation in the Discrete Frenkel-Kontorova Model
- Dynamical Aspects of Lattice Thermal Expansion
- Lattice Dynamics of an Ahnarmonic Chain -a Fully-Self-Consistent Approach-
- Kink Dynamics in a Discrete Nonlinear System─The Exact Equations of Motion for Kinks─
- Hopping Diffusion in a One-Dimensional Random System
- Dynamical Correlation Functions of Classical Liquids. I
- Renormalized Kink and Peierls Potential in a Nonlinear Lattice─Statistical Mechanical Approach─
- Transition State Theory for Kink Diffusion in Discrete Nonlinear Systems
- Dynamical Correlation Functions of Classical Liquids. II : A Self-Consistent Approach
- Dynamical Aspects of Lattice Thermal Expansion.II.Effects of Interaction among the NLS Solitons
- Resonance Effects on the Lifetime of Nonequilibrium Steady States in a Forced Pendulum Driven by a Quasi-Monochromatic Noise
- Non-Markovian Brownian Motion in a Periodic Potential