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WELL-POSEDNESS FOR THE CAUCHY PROBLEM TO THE HIROTA EQUATION IN SOBOLEV SPACES OF NEGATIVE INDICES

WELL-POSEDNESS FOR THE CAUCHY PROBLEM TO THE HIROTA EQUATION IN SOBOLEV SPACES OF NEGATIVE INDICES
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摘要 The local well-posedness of the Cauchy problem for the Hirota equation is established for low regularity data in Sobolev spaces Hs(s ≥ -1-4). Moreover, the global well-posedness for L2 data follows from the local well-posedness and the conserved quantity. For data in Hs(s > 0), the global well-posedness is also proved. The main idea is to use the generalized trilinear estimates, associated with the Fourier restriction norm method.
作者 HUOZHAOHUI JIAYUELING
机构地区 GraduateSchool AcademyofMathematicsandSystemSciences
出处 《Chinese Annals of Mathematics,Series B》 SCIE CSCD 2005年第1期75-88,共14页 数学年刊(B辑英文版)
关键词 Fourier restriction norm Trilinear estimates Hirota equation Low regularity Global well-posedness 傅里叶限制范数 三线估计 希罗塔方程 柯西问题 低正则 偏微分方程
分类号 O175.2 [理学—基础数学]
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参考文献8

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Chinese Annals of Mathematics,Series B
2005年 第1期

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