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ON THE MODIFIED NONLINEAR SCHRDINGER EQUATION IN THE SEMICLASSICAL LIMIT:SUPERSONIC,SUBSONIC,AND TRANSSONIC BEHAVIOR
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作者 Jeffery C. DiFranco Peter D. Miller Benson K. Muite 《Acta Mathematica Scientia》 SCIE CSCD 2011年第6期2343-2377,共35页
The purpose of this paper is to present a comparison between the modified nonlinear SchrSdinger (MNLS) equation and the focusing and defocusing variants of the (unmodified) nonlinear SchrSdinger (NLS) equation i... The purpose of this paper is to present a comparison between the modified nonlinear SchrSdinger (MNLS) equation and the focusing and defocusing variants of the (unmodified) nonlinear SchrSdinger (NLS) equation in the semiclassical limit. We describe aspects of the limiting dynamics and discuss how the nature of the dynamics is evident theoretically through inverse-scattering and noncommutative steepest descent methods. The main message is that, depending on initial data, the MNLS equation can behave either like the defocusing NLS equation, like the focusing NLS equation (in both cases the analogy is asymptotically accurate in the semiclassical limit when the NLS equation is posed with appropriately modified initial data), or like an interesting mixture of the two. In the latter case, we identify a feature of the dynamics analogous to a sonic line in gas dynamics, a free boundary separating subsonic flow from supersonic flow. 展开更多
关键词 semiclassical limits dispersionless limits modulational instability focusing defocusing and modified nonlinear SchrSdinger equations
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