TOPICS IN MATHEMATICAL PHYSICS
- Overview
- Assessment methods
- Learning objectives
- Contents
- Full programme
- Bibliography
- Teaching methods
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Lebesgue measure theory. Basic topology.
Take home exam, oral examination. The oral examination is intended to verify the acquired knowledge of the basis tenets of the theory, while the take-home exam requires to show the capability of applying them to a problem suggested by the instructor. Both parts contribute equally to the final evaluation of the exam.
A first introduction to singular measures and their properties. Students should learn the foundations of theory and develop the capability to apply them to abstract situations, as well as to problems arising in other fields of mathematics and physics.
Theory of the orthogonal polynomials of measures supported on the real line.
The course is organized in three chapters: orthogonal polynomials of positive measures supported on the real axis; iterated functions systems, their attractors and invariant measures; multi-fractal dimension, Fourier transforms and other properties of singular measures.
Scientific papers available online.
Classroom lectures. Take home exercises.
n.a.
Borrowed from
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