| LDR | | 01822nmm uu200397 4500 |
| 001 | | 000000332229 |
| 005 | | 20240805170425 |
| 008 | | 181129s2018 |||||||||||||||||c||eng d |
| 020 | |
▼a 9780438171312 |
| 035 | |
▼a (MiAaPQ)AAI10750853 |
| 035 | |
▼a (MiAaPQ)nyu:13272 |
| 040 | |
▼a MiAaPQ
▼c MiAaPQ
▼d 248032 |
| 082 | 0 |
▼a 510 |
| 100 | 1 |
▼a Fennell, James. |
| 245 | 10 |
▼a Two Topics in the Theory of Nonlinear Schrodinger Equations. |
| 260 | |
▼a [S.l.] :
▼b New York University.,
▼c 2018 |
| 260 | 1 |
▼a Ann Arbor :
▼b ProQuest Dissertations & Theses,
▼c 2018 |
| 300 | |
▼a 185 p. |
| 500 | |
▼a Source: Dissertation Abstracts International, Volume: 79-12(E), Section: B. |
| 500 | |
▼a Adviser: Pierre Germain. |
| 502 | 1 |
▼a Thesis (Ph.D.)--New York University, 2018. |
| 520 | |
▼a This thesis is composed of two works that are both within the broad field of non-linear Schrodinger equations. |
| 520 | |
▼a The first work is a study of two non-local Hamiltonian PDEs set on the real line that arise naturally as approximating equations for the nonlinear Schrodinger equation with harmonic trapping (quintic and cubic respectively). We begin by proving |
| 520 | |
▼a The second work concerns the Schrodinger maps equation, which generalizes the linear Schrodinger equation to non-Euclidean domains. We are specifically concerned with the Schrodinger maps equation for equivariant maps from Euclidean space to com |
| 590 | |
▼a School code: 0146. |
| 650 | 4 |
▼a Mathematics. |
| 690 | |
▼a 0405 |
| 710 | 20 |
▼a New York University.
▼b Mathematics. |
| 773 | 0 |
▼t Dissertation Abstracts International
▼g 79-12B(E). |
| 773 | |
▼t Dissertation Abstract International |
| 790 | |
▼a 0146 |
| 791 | |
▼a Ph.D. |
| 792 | |
▼a 2018 |
| 793 | |
▼a English |
| 856 | 40 |
▼u http://www.riss.kr/pdu/ddodLink.do?id=T14997136
▼n KERIS |
| 980 | |
▼a 201812
▼f 2019 |
| 990 | |
▼a 관리자 |