ID | 52598 |
File | |
language |
eng
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Author | |
Description | We study the nonlinear Schrödinger equation (NLS)
∂tu+iΔu=iλ|u|p−1u in R1+n, where n≥3, p>1, and λ∈C. We prove that (NLS) is locally well-posed in Hs if 1<s<min{4;n/2} and max{1;s/2}<p<1+4/(n−2s). To obtain a good lower bound for p, we use fractional order Besov spaces for the time variable. The use of such spaces together with time cut-off makes it difficult to derive positive powers of time length from nonlinear estimates, so that it is difficult to apply the contraction mapping principle. For the proof we improve Pecher's inequality (1997), which is a modification of the Strichartz estimate, and apply this inequality to the nonlinear problem together with paraproduct formula. |
Subject | Nonlinear Schrödinger equations
well-posedness
Besov spaces
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Journal Title |
Communications on Pure & Applied Analysis
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Volume | 18
|
Issue | 3
|
Start Page | 1359
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End Page | 1374
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ISSN | 1534-0392
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ISSN(Online) | 1553-5258
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Published Date | 2019
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DOI | |
Publisher | American Institute of Mathematical Sciences
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NII Type |
Journal Article
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Format |
PDF
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Text Version |
出版社版
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OAI-PMH Set |
Faculty of Science and Engineering
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