Topics in Complex analysis and geometry [ LMAT2260 ]
6.0 crédits ECTS
45.0 h
2q
Teacher(s) |
Claeys Tom ;
Haine Luc ;
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Language |
French
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Place of the course |
Louvain-la-Neuve
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Prerequisites |
LMAT1222 Analyse complexe and LMAT2110 Eléments de
géométrie différentielle.
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Main themes |
In complex analysis, Toeplitz determinants, orthogonal
polynomials, Riemann-Hilbert problems, the nonlinear steepest descent
method, asymptotic behavior and the Ising model will be studied. In
complex geometry, the principal theorems in the theory of compact
Riemann surfaces, the Riemann-Roch theorem, Abel's theorem and Jacobi's
inversion problem, and their applications to the Toda lattice will be
studied.
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Aims |
The course will in alternance treat subjects in complex analysis
and complex geometry, in relation to applications in the theory of
integrable systems, orthogonal polynomials and random matrices. The goal
of the course is to give an introduction to a modern topic related to
complex analysis or geometry, and to initiate them to research in this
domain.
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Evaluation methods |
oral exam or oral and written presentation of a project
made during the semester.
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Teaching methods |
Course : 3 h./week.
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Cycle et année d'étude |
> Master [120] in Mathematics
> Master [120] in Physics
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Faculty or entity in charge |
> MATH
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