Bejenaru, Ioan, 1974-
Near soliton evolution for equivariant Schr�odinger maps in two spatial dimensions / [electronic resource] Ioan Bejenaru, Daniel Tataru. - Providence, Rhode Island : American Mathematical Society, [2013] - 1 online resource (v, 108 pages : illustrations) - Memoirs of the American Mathematical Society, v. 1069 0065-9266 (print); 1947-6221 (online); .
"March 2014, volume 228, number 1069 (first of 5 numbers)."
Includes bibliographical references (pages 107-108).
Chapter 1. Introduction Chapter 2. An outline of the paper Chapter 3. The Coulomb gauge representation of the equation Chapter 4. Spectral analysis for the operators $H$, $\tilde H$; the $X,L X$ spaces Chapter 5. The linear $\tilde H$ Schr�odinger equation Chapter 6. The time dependent linear evolution Chapter 7. Analysis of the gauge elements in $X,LX$ Chapter 8. The nonlinear equation for $\psi $ Chapter 9. The bootstrap estimate for the $\lambda $ parameter. Chapter 10. The bootstrap argument Chapter 11. The $\dot H^1$ instability result
Access is restricted to licensed institutions
Electronic reproduction.
Providence, Rhode Island :
American Mathematical Society.
2014
Mode of access : World Wide Web
9781470414818 (online)
Heat equation.
Schr�odinger equation.
Differential equations, Parabolic.
QA377 / .B455 2013
530.1201/5153534
Near soliton evolution for equivariant Schr�odinger maps in two spatial dimensions / [electronic resource] Ioan Bejenaru, Daniel Tataru. - Providence, Rhode Island : American Mathematical Society, [2013] - 1 online resource (v, 108 pages : illustrations) - Memoirs of the American Mathematical Society, v. 1069 0065-9266 (print); 1947-6221 (online); .
"March 2014, volume 228, number 1069 (first of 5 numbers)."
Includes bibliographical references (pages 107-108).
Chapter 1. Introduction Chapter 2. An outline of the paper Chapter 3. The Coulomb gauge representation of the equation Chapter 4. Spectral analysis for the operators $H$, $\tilde H$; the $X,L X$ spaces Chapter 5. The linear $\tilde H$ Schr�odinger equation Chapter 6. The time dependent linear evolution Chapter 7. Analysis of the gauge elements in $X,LX$ Chapter 8. The nonlinear equation for $\psi $ Chapter 9. The bootstrap estimate for the $\lambda $ parameter. Chapter 10. The bootstrap argument Chapter 11. The $\dot H^1$ instability result
Access is restricted to licensed institutions
Electronic reproduction.
Providence, Rhode Island :
American Mathematical Society.
2014
Mode of access : World Wide Web
9781470414818 (online)
Heat equation.
Schr�odinger equation.
Differential equations, Parabolic.
QA377 / .B455 2013
530.1201/5153534