TOPICS IN ADVANCED ANALYSIS A
- Overview
- Assessment methods
- Learning objectives
- Contents
- Full programme
- Bibliography
- Teaching methods
Core courses in Analysis.
Written and oral examination.
Achieve advanced tools in Nonlinear Analysis and PDE which are introductory to contemporary research.
Euler –Lagrange equations and solutions of partial differential equations via the Dirichlet principle of minimal Energy. Towards weak solutions. A few facts from Functional Analysis: weak derivatives and Sobolev spaces, embedding inequalities, the Rellich-Kondrachov theorem, extensions and traces. A direct method in the Calculus of Variations, minima of weakly lower semicontinuous functionals: applications to nonlinear Schroedinger’s equation. The Nehari manifold and ground states solutions, bootstrap argument in elliptic regularity theory. Introduction to topological methods in Nonlinear Analysis for indefinite functionals: deformation lemma and the mountain-pass theorem by Ambrosetti-Rabinowitz, applications to semilinear elliptic equations. The Ekeland Variational Principle. The effect of Symmetry, Critical growth problems, lack of compactness and Pohozaev identity. Quantization of energy and the Brezis-Nirenberg theorem.
Euler –Lagrange equations and solutions of partial differential equations via the Dirichlet principle of minimal Energy. Towards weak solutions. A few facts from Functional Analysis: weak derivatives and Sobolev spaces, embedding inequalities, the Rellich-Kondrachov theorem, extensions and traces. A direct method in the Calculus of Variations, minima of weakly lower semicontinuous functionals: applications to nonlinear Schroedinger’s equation. The Nehari manifold and ground states solutions, bootstrap argument in elliptic regularity theory. Introduction to topological methods in Nonlinear Analysis for indefinite functionals: deformation lemma and the mountain-pass theorem by Ambrosetti-Rabinowitz, applications to semilinear elliptic equations. The Ekeland Variational Principle. The effect of Symmetry, Critical growth problems, lack of compactness and Pohozaev identity. Quantization of energy and the Brezis-Nirenberg theorem.
H. Brezis, Functional Analysis; M. Willem, Minimax Theorems; M. Struwe, Variational Methods
Lectures.
Borrowed from
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