Transverse Front Instability in Bistable Systems with Long-Range Interactions(Condensed Matter and Statistical Physics)
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概要
- 論文の詳細を見る
Using the Ginzburg-Landau equation with a long-range interaction, we study the stability of a planar front with respect to transverse perturbations in bistable systems. It is well known that when a bistable system has competiting short-range and long-range interactions, the front connecting two stable states can exhibit transverse instability. We focus on the effects of the nonlocal nature of the interaction, using long-range interactions with exponential decay (weak nonlocality) and power-law decay (strong nonlocality). It is found that in the former case, the planar front can be stabilized by varying a parameter value, while in the latter case, the strong nonlocal nature of the interaction prevents stabilization of the front.
- 理論物理学刊行会の論文
- 2008-01-25
著者
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Ouchi Katsuya
Kobe Design University
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FUJISAKA Hirokazu
Department of Physics,Kyushu University
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TSUKAMOTO Naofumi
Department of Applied Analysis and Complex Dynamical Systems, Graduate School of Informatics, Kyoto
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Fujisaka Hirokazu
Department Of Applied Analysis And Complex Dynamical Systems Graduate School Of Informatics Kyoto Un
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Fujisaka Hirokazu
Department Of Physics Kyushu University
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Fujisaka Hirokazu
Kyushu University
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Fujisaka Hirokazu
Department Of Applied Analysis And Complex Dynamical Systems Graduate School Of Informatics Kyoto Un
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Fujisaka Hirokazu
Department Of Applied Analysis And Complex Dynamical Systems Graduate School Of Informatics Kyoto Un
-
Fujisaka Hirokazu
Department Of Applied Analysis And Complex Dynamical Systems Graduate School Of Informatics Kyoto Un
-
Fujisaka Hirokazu
Department Of Applied Analysis And Complex Dynamical Systems Graduate School Of Informatics Kyoto Un
-
Fujisaka Hirokazu
Department Of Applied Analysis And Complex Dynamical Systems Kyoto University
-
Fujisaka Hirokazu
Department Of Applied Analysis And Complex Dynamical Systems Graduate School Of Informatics Kyoto Un
-
Tsukamoto Naofumi
Department Of Applied Analysis And Complex Dynamical Systems Graduate School Of Informatics Kyoto Un
-
Ouchi Katsuya
Kobe Design Univ. Kobe Jpn
-
TSUKAMOTO Naofumi
Department of Applied Analysis and Complex Dynamical Systems, Graduate School of Informatics, Kyoto University
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FUJISAKA Hirokazu
Department of Applied Analysis and Complex Dynamical Systems, Kyoto University
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