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Pseudodifferential operators for boundary value problemsTechnical University of DenmarkGeneral course objectives: Modern analysis of boundary value problems for partial differential equations (PDE) relies on the theory of pseudodifferential operators. In addition to establishing locally the existence, uniqueness and regularity of solutions of rather general elliptic PDE problems, this analysis can be linked with well-developed tools from topology, differential geometry and microlocal analysis to allow additional fundamental insight into the properties and behavior of solutions. In certain cases this additional insight can improve the mathematical modelling, the physical understanding, and the numerical solution efficiency and stability for the given boundary value problem. The purpose of this course is to teach the theory of standard pseudodifferential operators with smooth symbols, including the rigorous definition, continuity properties, symbol calculus and parametrix construction. This is then applied in the analysis of selected boundary value problems. Learning objectives: A student who has met the objectives of the course will be able to:
Contents: Smooth symbol classes: definition, results regarding compounds and adjoints. Fourier integral representation and Schwartz kernels of ps.d.o. Mapping properties of standard pseudodifferential operators. Parametrices of elliptic ps.d.o. Essential support, wavefront sets and microlocal regularity. Layer potentials. Transformation using local diffeomorphic charts and extension by zero. |
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