| File | |
| language |
eng
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| Author |
KAMEI, RYOSUKE
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| Description | This paper studies the Cauchy problem for the nonlinear Schr¨odinger equation i∂tu − ∂2 xu = f(u) in one space dimension. The nonlinear interaction f(u) is a linear combination of (V ∗x u)u, (V ∗x ¯u)u, (V ∗x u)¯u and (V ∗x ¯u)¯u, where V (x) is a locally integrable function whose Fourier transform satisfies | ˆ V (ξ)| ≲ ⟨ξ⟩−m for some m ≥ 0. The Cauchy problem is well-posed in Hs for s > −(m/2+1/4); furthermore, if f(u) contains only the first and the last types of nonlinear terms, then the Cauchy problem is well-posed for s > −(m/2+3/4). The proof is based on bilinear estimates in Xs,b spaces.
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| Journal Title |
Memoirs of the Graduate School of Science and Engineering, Shimane University. Series B, Mathematics
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| Volume | 57
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| Start Page | 27
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| End Page | 38
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| ISSN | 1342-7121
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| Published Date | 2024
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| Publisher | 総合理工学部
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| Publisher Aalternative | The Interdisciplinary Graduate School of Science and Engineering
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| NII Type |
Departmental Bulletin Paper
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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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| 他の一覧 |
