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In the theory of integrable systems, a com … In the theory of integrable systems, a compacton, introduced in (Philip Rosenau & James M. Hyman ), is a soliton with compact support. An example of an equation with compacton solutions is the generalization of the Korteweg–de Vries equation (KdV equation) with m, n > 1. The case with m = n is the Rosenau–Hyman equation as used in their 1993 study; the case m = 2, n = 1 is essentially the KdV equation. 2, n = 1 is essentially the KdV equation.
, 压缩子是非线性微分方程的一个行波解 下列微分方程 有一个行波解: 这是一个压缩子
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Philip Rosenau
, James Hyman
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Philip
, James M.
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5
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http://dbpedia.org/resource/Physical_Review_Letters +
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Rosenau
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564
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American Physical Society
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Compactons: Solitons with finite wavelength
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70
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1993
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| rdfs:comment |
In the theory of integrable systems, a com … In the theory of integrable systems, a compacton, introduced in (Philip Rosenau & James M. Hyman ), is a soliton with compact support. An example of an equation with compacton solutions is the generalization of the Korteweg–de Vries equation (KdV equation) with m, n > 1. The case with m = n is the Rosenau–Hyman equation as used in their 1993 study; the case m = 2, n = 1 is essentially the KdV equation. 2, n = 1 is essentially the KdV equation.
, 压缩子是非线性微分方程的一个行波解 下列微分方程 有一个行波解: 这是一个压缩子
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| rdfs:label |
压缩子
, Compacton
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