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Nonlinear Schrödinger equations - stationary aspects (Wintersemester 2010/11)

Course starts: October 28th


This course is a continuation of the lecture of Prof. Schnaubelt in the previous summer
semester on "Nonlinear Schrödinger Equations - dynamical aspects". However, the contents
and methods are independent.

In this course I will study solitary waves of the nonlinear Schrödinger equation (NLS). They
are solutions of

$-\Delta u + V(x) u = \Gamma(x) |u|^{p-1}u \mbox{ in } I\!\!R^n$

I will mainly discuss variational methods for proving existence of solutions. In the case of
constant coefficients we will also study qualitative properties of positive solutions.

Prerequisites

Familiarity with variational methods is helpful. Some of the basic facts of the calculus of
variations will be reviewed. Knowledge in Lebesgue integral, Sobolev spaces, and functional
analytical concepts like weak convergence is essential.

Termine
Vorlesung: Donnerstag 11:30-13:00 1C-04 Beginn: 28.10.2010
Lehrende
Dozent Prof. Dr. Wolfgang Reichel
Sprechstunde: Montag, 11:30-13:00 bevor Sie mailen:anrufen/vorbeikommen
Zimmer 3.035 Kollegiengebäude Mathematik (20.30)
Email: Wolfgang.Reichel@kit.edu

Contents

A preliminary list of topics:

  1. Motivation and examples
  2. Constant coefficient case
  3. Asymptotically constant coefficients
  4. Periodic coefficients

Literaturhinweise

  1. H. Berestycki, P.L. Lions: Nonlinear scalar fi eld equations I. Arch. Rational Mech. Anal. 82, 313-345 (1983).
  2. B. Gidas, Wei-Ming Ni, L. Nirenberg: Symmetry of positive solutions of nonlinear elliptic equations in Rn. Math. Anal. Appl., Part A, 369-402. Adv. in Math. Suppl. Stud. 7a (1981).
  3. A. Pankov: Periodic nonlinear Schroedinger equation with application to photonic crystals. Milan J. Math. 73, 259-287 (2005).
  4. W. Strauss: Existence of solitary waves in higher dimensions. Comm. Math. Phys. 55, 149-162 (1977).
  5. M. Struwe: Variational Methods. Springer Verlag.
  6. C. A. Stuart: A variational approach to bifurcation in LP on an unbounded symmetrical domain. Math. Ann. 263, 51-59 (1983).
  7. M. Willem: Minimax Theorems. Birkhäuser Verlag.