Wavelet Analysis of Anharmonic Self-Localized Modes
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概要
- 論文の詳細を見る
A wavelet analysis is made for one-dimensional anharmonic self-localized modes by decomposition of their time evolution signals. For a localized mode with eigenfrequency above the top of the harmonic frequency band, the finest-resolution wavelet coefficients are sufficient for analysis of the position of the center point of the mode, and the degree of mode localization.
- 社団法人日本物理学会の論文
- 1993-06-15
著者
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Hori K
Kyoto Inst. Technology Kyoto
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Hori Kazunari
Graduate School Major Of Materials Science Kyoto Institute Of Technology
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Hori Kazunari
Graduate School Major of Materials Science, Faculty of Engineering and Design, Kyoto Institute of Technology
関連論文
- Moving Self-Localized Modes for the Displacement Field in a One-Dimensional Lattice System with Quartic Anharmonicity
- Wavelet Analysis of Anharmonic Self-Localized Modes